Datasets:
AnkitSatpute
/
zbMath_mscref

Dataset card Data Studio Files
xet
Community
1
text
stringlengths
68
2.01k
label
int64
0
1
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Namikawa Y. Induced nilpotent orbits and birational geometry. Adv Math, 2009, 222: 547--564 Semisimple Lie groups and their representations, Singularities in algebraic geometry, Group actions on varieties or schemes (quotients), Deformations of complex singularities; vanishing cycles, Rational and birational maps, General properties and structure of complex Lie groups
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets T. Kimura and V. Pestun, \textit{Quiver elliptic W-algebras}, arXiv:1608.04651 [INSPIRE]. Supersymmetric field theories in quantum mechanics, Infinite-dimensional groups and algebras motivated by physics, including Virasoro, Kac-Moody, \(W\)-algebras and other current algebras and their representations, Applications of vector bundles and moduli spaces in mathematical physics (twistor theory, instantons, quantum field theory), Quantum groups and related algebraic methods applied to problems in quantum theory, Representations of quivers and partially ordered sets
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Representations of quivers and partially ordered sets, Algebraic moduli problems, moduli of vector bundles, Momentum maps; symplectic reduction, Special connections and metrics on vector bundles (Hermite-Einstein, Yang-Mills)
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Singularities in algebraic geometry, Local complex singularities
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Singularities in algebraic geometry, Local complex singularities
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Henry, J. P. G., & Merle, M. (1987). Complexity of computation of embedded resolution of algebraic curves. In J. H. Davenport (Ed.),\textit{Lecture notes in computer science 378}, \textit{EUROCAL '87} (pp. 381-390). New York: Springer. Software, source code, etc. for problems pertaining to algebraic geometry, Singularities of curves, local rings, Global theory and resolution of singularities (algebro-geometric aspects), Symbolic computation and algebraic computation
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Heier G.: Effective freeness of adjoint line bundles. Doc. Math. 7, 31--42 (2002) Divisors, linear systems, invertible sheaves, Vanishing theorems in algebraic geometry, Singularities in algebraic geometry
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Research exposition (monographs, survey articles) pertaining to algebraic geometry, Research exposition (monographs, survey articles) pertaining to several complex variables and analytic spaces, History of several complex variables and analytic spaces, History of mathematics in the 20th century, History of mathematics in the 21st century, Stratifications; constructible sheaves; intersection cohomology (complex-analytic aspects), Stratified sets, Germs of analytic sets, local parametrization, Characteristic classes and numbers in differential topology, Families, moduli of curves (analytic), Local complex singularities, Singularities in algebraic geometry, History of algebraic geometry
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Complex surface and hypersurface singularities, Singularities in algebraic geometry
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Plane and space curves, Linkage, Parametrization (Chow and Hilbert schemes)
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets DOI: 10.4134/JKMS.2007.44.1.035 Vector bundles on surfaces and higher-dimensional varieties, and their moduli, Algebraic moduli problems, moduli of vector bundles, Symplectic structures of moduli spaces, \(K3\) surfaces and Enriques surfaces, Global theory and resolution of singularities (algebro-geometric aspects)
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Parametrization (Chow and Hilbert schemes), Families, moduli of curves (algebraic)
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Characteristic \(p\) methods (Frobenius endomorphism) and reduction to characteristic \(p\); tight closure, Hilbert-Samuel and Hilbert-Kunz functions; Poincaré series, Multiplicity theory and related topics, Singularities in algebraic geometry, Deformations of singularities, Fibrations, degenerations in algebraic geometry
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets \(3\)-folds, Rational and ruled surfaces, Vector bundles on surfaces and higher-dimensional varieties, and their moduli, Parametrization (Chow and Hilbert schemes), Algebraic moduli problems, moduli of vector bundles, Varieties of low degree, Adjunction problems
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Introductory exposition (textbooks, tutorial papers, etc.) pertaining to algebraic geometry, Schemes and morphisms, Divisors, linear systems, invertible sheaves, Sheaves in algebraic geometry, Group schemes, Determinantal varieties, Group actions on varieties or schemes (quotients), Singularities in algebraic geometry
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Fernández de Bobadilla, J.; Luengo, I.; Melle-Hernández, A.; Némethi, A., On rational cuspidal projective plane curves, Proc. Lond. Math. Soc., 92, 1, 99-138, (2006) Singularities of curves, local rings, Plane and space curves, Singularities in algebraic geometry
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Parametrization (Chow and Hilbert schemes), Differential algebra, Varieties and morphisms, Model-theoretic algebra
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets R. Livne, \textit{Cubic exponential sums and Galois representations}, in \textit{Current Trends in Arithmetical Algebraic Geometry, Arcata 1985}, Contemporary Mathematics \textbf{67} (1987), 247-261. Estimates on exponential sums, Exponential sums, Singularities in algebraic geometry, Trigonometric and exponential sums (general theory)
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Homological methods in commutative ring theory, Polynomial rings and ideals; rings of integer-valued polynomials, Singularities in algebraic geometry
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Schrauwen ( R. ). - Topological series of isolated plane curves singularities , l'Enseignement Mathématique ( 36 ) ( 1990 ), 115 - 141 . MR 1071417 | Zbl 0708.57011 Singularities of differentiable mappings in differential topology, Milnor fibration; relations with knot theory, Differential topology, Singularities of curves, local rings, Singularities in algebraic geometry
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Puthenpurakal, T.J., On two dimensional mixed characteristic rings of finite Cohen Macaulay type, J. pure appl. algebra, 220, 1, 319-334, (2016) Cohen-Macaulay modules, Special types (Cohen-Macaulay, Gorenstein, Buchsbaum, etc.), Singularities in algebraic geometry
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Qian, C J, A homogeneous domination approach for global output feedback stabilization of a class of nonlinear systems, 4708-4715, (2005) Parametrization (Chow and Hilbert schemes), (Co)homology theory in algebraic geometry
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Singularities in algebraic geometry, Singularities of holomorphic vector fields and foliations, Dynamical aspects of holomorphic foliations and vector fields, Complex-analytic moduli problems
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Ito, Y., Nakamura, I.: McKay correspondence and Hilbert schemes. Proc. Japan Acad. Ser. A Math. Sci., 72, 135--138 (1996) Parametrization (Chow and Hilbert schemes), Homogeneous spaces and generalizations, Global theory and resolution of singularities (algebro-geometric aspects)
1
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Sekiya, Y.; Yamaura, K., \textit{tilting theoretical approach to moduli spaces over preprojective algebras}, Algebr. Represent. Theory, 16, 1733-1786, (2013) Fine and coarse moduli spaces, Representations of quivers and partially ordered sets, McKay correspondence, Homological functors on modules (Tor, Ext, etc.) in associative algebras, Families, moduli, classification: algebraic theory
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets T. Becker, \textit{An example of an} SL\_{}\{2\}-\textit{Hilbert scheme with multiplicities}, Transform. Groups \textbf{16} (2011), no. 4, 915-938. Formal groups, \(p\)-divisible groups, Birational geometry, Special varieties
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets R. Terpereau, \textit{Invariant Hilbert schemes and desingularizations of quotients by classical groups}, Transform. Groups \textbf{19} (2014), no. 1, 247-281. Algebraic cycles, Global theory and resolution of singularities (algebro-geometric aspects), Parametrization (Chow and Hilbert schemes)
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Scala, L, Some remarks on tautological sheaves on Hilbert schemes of points on a surface, Geom. Dedicata, 139, 313-329, (2009) Parametrization (Chow and Hilbert schemes)
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Fujii, Sh., Minabe, S.: A combinatorial study on quiver varieties. SIGMA Symmetry Integrability Geom. Methods Appl. \textbf{13}, Art. No. 052 (2017) Applications of vector bundles and moduli spaces in mathematical physics (twistor theory, instantons, quantum field theory), Parametrization (Chow and Hilbert schemes), Combinatorial identities, bijective combinatorics, Combinatorial aspects of representation theory, Hilbert-Samuel and Hilbert-Kunz functions; Poincaré series
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Ishii, A., Ueda, K.: The special McKay correspondence and exceptional collections. Tohoku Math. J. (2) \textbf{67}(4), 585-609 (2015) McKay correspondence
1
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets K.B. Alkalaev and V.A. Belavin, \textit{Conformal blocks of}\( {\mathcal{W}}_n \)\textit{Minimal Models and AGT correspondence}, arXiv:1404.7094 [INSPIRE]. Parametrization (Chow and Hilbert schemes), Symmetric functions and generalizations, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal)
1
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Lehn, C; Terpereau, R, Invariant deformation theory of affine schemes with reductive group action, J. Pure Appl. Algebra, 219, 4168-4202, (2015) Actions of groups on commutative rings; invariant theory, Representation theory for linear algebraic groups, Algebraic moduli of abelian varieties, classification, Group actions on varieties or schemes (quotients), Computational aspects in algebraic geometry, Local deformation theory, Artin approximation, etc.
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Ishii, A., On the mckay correspondence for a finite small subgroup of \(\operatorname{GL}(2, \mathbb{C})\), J. Reine Angew. Math., 549, 221-233, (2002), MR 1916656 Group actions on varieties or schemes (quotients), Geometric invariant theory, Global theory and resolution of singularities (algebro-geometric aspects), Representation theory for linear algebraic groups, Complex surface and hypersurface singularities, Global theory of complex singularities; cohomological properties
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Scala L: Cohomology of the Hilbert scheme of points on a surface with values in representations of tautological bundles. Duke Math. J 2009,150(2):211--267. 10.1215/00127094-2009-050 Parametrization (Chow and Hilbert schemes), Representations of finite symmetric groups
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets P. Boddington and D. Rumynin, ''On Curtis' theorem about finite octonionic loops,'' Proc. Amer. Math. Soc. 135 (2007), 1651--1657. Alternative rings, Simple, semisimple, reductive (super)algebras
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Á. Nolla de Celis, Dihedral \({G}\)-Hilb via representations of the McKay quiver , Proc. Japan Acad. Ser. A 88 (2012), 78-83. McKay correspondence, Algebraic moduli problems, moduli of vector bundles, Parametrization (Chow and Hilbert schemes), Representations of quivers and partially ordered sets, Global theory and resolution of singularities (algebro-geometric aspects)
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Becker, T.; Terpereau, R., Moduli spaces of \((G, h)\)-constellations, Transform. Groups, 20, 2, 335-366, (2015) Parametrization (Chow and Hilbert schemes), Group actions on affine varieties, Group actions on varieties or schemes (quotients), Geometric invariant theory, Representation theory for linear algebraic groups
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Craw, A., An explicit construction of the McKay correspondence for \(A\)-Hilb \({\mathbb{C}^3}\), J. Algebra, 285, 682-705, (2005) Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), \(3\)-folds, Toric varieties, Newton polyhedra, Okounkov bodies, Classical real and complex (co)homology in algebraic geometry, Ordinary representations and characters
1
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Craw, A., Ito, Y., Karmazyn, J.: Multigraded linear series and recollement (2017). arXiv:1701.01679 (to appear in Math. Z.) Noncommutative algebraic geometry, McKay correspondence, Representations of quivers and partially ordered sets, Grothendieck groups (category-theoretic aspects)
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Kȩdzierski, O.: Danilov's resolution and representations of the mckay quiver. Tohoku math. J. (2) 66, No. 3, 355-375 (2014) McKay correspondence, Representations of quivers and partially ordered sets, Geometric invariant theory
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets Craw, A.; Maclagan, D.; Thomas, R.R., Moduli of mckay quiver representations II: Gröbner basis techniques, J. algebra, 316, 2, 514-535, (2007) Toric varieties, Newton polyhedra, Okounkov bodies, Gröbner bases; other bases for ideals and modules (e.g., Janet and border bases), Representations of quivers and partially ordered sets
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets DOI: 10.1016/j.jalgebra.2011.08.033 Stacks and moduli problems, Representations of quivers and partially ordered sets
0
Y. Ito, I. Nakamura, \textit{Hilbert schemes and simple singularities}, in: \textit{New Trends in Algebraic Geometry} (Warwick, 1996), London Math. Soc. Lecture Note Ser., Vol. 264, Cambridge Univ. Press, Cambridge, 1999, pp. 151-233. Singularities in algebraic geometry, Parametrization (Chow and Hilbert schemes), Global theory and resolution of singularities (algebro-geometric aspects), Representations of quivers and partially ordered sets doi:10.1007/s11512-007-0065-6 Singularities of surfaces or higher-dimensional varieties, Parametrization (Chow and Hilbert schemes), McKay correspondence
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves F. Izadi, K. Nabardi, A note on diophantine equation \(A^4+D^4=2(B^4+C^4)\) Rational points, \(K3\) surfaces and Enriques surfaces, Elliptic surfaces, elliptic or Calabi-Yau fibrations
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves [10]M. Hindry and J. H. Silverman, The canonical height and integral points on elliptic curves, Invent. Math. 93 (1988), 419--450. Arithmetic ground fields for curves, Elliptic curves, Global ground fields in algebraic geometry, Special algebraic curves and curves of low genus, Rational points
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Rational points, Arithmetic ground fields for curves, Families, moduli of curves (algebraic)
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves S. Kamienny,On the torsion subgroups of elliptic curves over totally real field. Invent. Math. 83 (1986), 545-551. Zbl0585.14023 MR827366 Special algebraic curves and curves of low genus, Rational points, Arithmetic ground fields for curves, Elliptic curves, Cubic and quartic Diophantine equations, Totally real fields
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Varieties over global fields
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Serre, J.P.; ; Lectures on the Mordell-Weil Theorem: Braunschweig, Germany 1989; . Rational points, Elliptic curves, Elliptic curves over global fields, Heights, Arithmetic ground fields for curves, Research exposition (monographs, survey articles) pertaining to algebraic geometry, Research exposition (monographs, survey articles) pertaining to number theory, Global ground fields in algebraic geometry, Special algebraic curves and curves of low genus, Arithmetic ground fields for abelian varieties, Units and factorization
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves --------, Mordell-Weil groups of extremal elliptic \(K3\) surfaces , in Problems in the theory of surfaces and their classification (Cortona 1988), Sympos. Math., vol. 32, Academic Press, London, 1991, 167-192. Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Hiro-o Tokunaga, A remark on E. Artal-Bartolo's paper: ''On Zariski pairs'' [J. Algebraic Geom. 3 (1994), no. 2, 223 -- 247; MR1257321 (94m:14033)], Kodai Math. J. 19 (1996), no. 2, 207 -- 217. Coverings in algebraic geometry, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Special algebraic curves and curves of low genus
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Oguiso K.: On Jacobian fibrations on the Kummer surfaces of the product of non-isogenous elliptic curves. J. Math. Soc. Jpn. 41, 651--680 (1989) \(K3\) surfaces and Enriques surfaces, Rational points, Elliptic curves, Automorphisms of surfaces and higher-dimensional varieties
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Rational points, Cubic and quartic Diophantine equations, Rational and unirational varieties, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Laska, M.; Lorenz, M., Rational points on elliptic curves over \(\mathbb{Q}\) in elementary abelian 2-extensions of \(\mathbb{Q}\), J. Reine Angew. Math., 355, 163-172, (1985) Rational points, Elliptic curves, Arithmetic ground fields for curves, Special algebraic curves and curves of low genus, Quadratic extensions, Global ground fields in algebraic geometry
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Rational points, Elliptic curves, Elliptic surfaces, elliptic or Calabi-Yau fibrations
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Tetsuji Shioda, ``On the Mordell-Weil lattices'', Comment. Math. Univ. St. Pauli39 (1990) no. 2, p. 211-240 Rational points, Elliptic curves, Elliptic surfaces, elliptic or Calabi-Yau fibrations, Elliptic curves over global fields, Arithmetic varieties and schemes; Arakelov theory; heights
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Leprévost, F.: Famille de courbes hyperelliptiques de genreg munies d'une classe de diviseurs rationnels d'ordre 2g 2 + 4g + 1, Séminaire de Théorie des Nombres de Paris, Progress in Math. Birkhäuser.116, 107--119 (1991--1992). Families, moduli of curves (algebraic), Elliptic curves, Jacobians, Prym varieties, Rational points
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves J.H. Silverman, \textit{The arithmetic of elliptic curves}, Graduate Texts in Mathematics \textbf{106}, Springer, Dordrecht, Netherlands (2009). Introductory exposition (textbooks, tutorial papers, etc.) pertaining to number theory, Elliptic curves over global fields, Introductory exposition (textbooks, tutorial papers, etc.) pertaining to algebraic geometry, Elliptic curves over local fields, Abelian varieties of dimension \(> 1\), Curves over finite and local fields, \(L\)-functions of varieties over global fields; Birch-Swinnerton-Dyer conjecture, Elliptic curves, Rational points, Arithmetic algebraic geometry (Diophantine geometry), Arithmetic ground fields for curves, Number-theoretic algorithms; complexity, Cohomology of groups
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Families, moduli of curves (algebraic), Elliptic curves, Applications of methods of algebraic \(K\)-theory in algebraic geometry, Positive characteristic ground fields in algebraic geometry, Elliptic surfaces, elliptic or Calabi-Yau fibrations
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Arithmetic varieties and schemes; Arakelov theory; heights, Rational points, Elliptic curves, Elliptic curves over global fields, Finite ground fields in algebraic geometry, Elliptic surfaces, elliptic or Calabi-Yau fibrations
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves L.Caporaso, J.Harris, B.Mazur. Uniformity of rational points. Preliminary version of this paper, available by anonymous ftp from math.harvard.edu. Rational points, Arithmetic ground fields for curves, Families, moduli of curves (algebraic)
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves DOI: 10.2140/ant.2010.4.1 Varieties over global fields, Cubic and quartic Diophantine equations, Elliptic surfaces, elliptic or Calabi-Yau fibrations, Rational points, \(K3\) surfaces and Enriques surfaces
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves T. SHIODA, Existence of a rational elliptic surface with a given Mordell-Weil lattice, Proc. Japan Acad Ser. A, Math. Sci. 68 (1992), 251-255. Rational points, Elliptic curves, Elliptic surfaces, elliptic or Calabi-Yau fibrations, Rational and ruled surfaces, Arithmetic varieties and schemes; Arakelov theory; heights, Other nonalgebraically closed ground fields in algebraic geometry
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves \(L\)-functions of varieties over global fields; Birch-Swinnerton-Dyer conjecture, Elliptic curves over global fields, Arithmetic ground fields for curves, Rational points, Elliptic curves, Global ground fields in algebraic geometry, Special algebraic curves and curves of low genus
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Elliptic curves, Elliptic curves over global fields, Cubic and quartic Diophantine equations, Curves over finite and local fields, Arithmetic ground fields for curves, Rational points
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Curves over finite and local fields, Finite ground fields in algebraic geometry, Arithmetic ground fields for curves, Rational points, Finite fields (field-theoretic aspects), Elliptic curves
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Rational points, Other nonalgebraically closed ground fields in algebraic geometry, Families, moduli of curves (algebraic), Arithmetic ground fields for curves, Curves of arbitrary genus or genus \(\ne 1\) over global fields, Universal profinite groups (relationship to moduli spaces, projective and moduli towers, Galois theory), Fibrations, degenerations in algebraic geometry, Algebraic moduli problems, moduli of vector bundles, Maps between classifying spaces in algebraic topology, Stacks and moduli problems, Representation theory for linear algebraic groups
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Arithmetic aspects of modular and Shimura varieties, Curves of arbitrary genus or genus \(\ne 1\) over global fields, Rational points, Families, moduli of curves (algebraic), Arithmetic ground fields for curves
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves DOI: 10.1080/00927879508825337 Elliptic curves, Rational points, Arithmetic ground fields for curves
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Kolyvagin, V.A.: On the structure of Selmer groups. Math. Ann. 291(2) (1991) Elliptic curves over global fields, Elliptic curves, Families, moduli of curves (algebraic), Rational points, Class numbers, class groups, discriminants
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Elliptic curves, Rational points, Cubic and quartic Diophantine equations, Arithmetic ground fields for curves
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Hiroyuki Ito, The Mordell-Weil groups of unirational quasi-elliptic surfaces in characteristic 3, Math. Z. 211 (1992), no. 1, 1 -- 39. Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, Rational and ruled surfaces, \(K3\) surfaces and Enriques surfaces, Finite ground fields in algebraic geometry, Rational and unirational varieties
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Hain, Rational points of universal curves, J. Amer. Math. Soc. 24 pp 709-- (2011) Rational points, Other nonalgebraically closed ground fields in algebraic geometry, Families, moduli of curves (algebraic), Arithmetic ground fields for curves, Curves of arbitrary genus or genus \(\ne 1\) over global fields, Universal profinite groups (relationship to moduli spaces, projective and moduli towers, Galois theory)
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Quadratic and bilinear Diophantine equations, Elliptic curves over global fields, Curves of arbitrary genus or genus \(\ne 1\) over global fields, Rational points, Jacobians, Prym varieties, Computer solution of Diophantine equations, Global ground fields in algebraic geometry, Other nonalgebraically closed ground fields in algebraic geometry, Arithmetic ground fields for curves, Elliptic curves
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Skorobogatov, A., Descent obstruction is equivalent to étale Brauer-Manin obstruction, Math. Ann., 344, 501-510, (2009) Rational points, Global ground fields in algebraic geometry, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Group actions on varieties or schemes (quotients)
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Special algebraic curves and curves of low genus, Arithmetic ground fields for curves, Elliptic curves, Rational points
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Silverman, J.: A bound for the Mordell-Weil rank of an elliptic curve after a cyclic base extension. J. Alg. Geom. 9, 301--308 (2000) Elliptic surfaces, elliptic or Calabi-Yau fibrations, Elliptic curves, Rational points, Algebraic functions and function fields in algebraic geometry
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Josef Gebel and Horst G. Zimmer, Computing the Mordell-Weil group of an elliptic curve over \?, Elliptic curves and related topics, CRM Proc. Lecture Notes, vol. 4, Amer. Math. Soc., Providence, RI, 1994, pp. 61 -- 83. Elliptic curves, Arithmetic ground fields for curves, Computational aspects of algebraic curves, Elliptic curves over global fields, \(L\)-functions of varieties over global fields; Birch-Swinnerton-Dyer conjecture, Rational points, Zeta functions and related questions in algebraic geometry (e.g., Birch-Swinnerton-Dyer conjecture)
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Ishii, H.: The non-existence of elliptic curves with everywhere good reduction over certain quadratic fields. Japan J. Math. 12, 45-52 (1986) Arithmetic ground fields for curves, Quadratic extensions, Linear Diophantine equations, Elliptic curves, Special algebraic curves and curves of low genus, Rational points
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Борисов, А. В.; Мамаев, И. С., Странные аттракторы в динамике кельтских камней, УФН, 173, 4, 407-418, (2003) Arithmetic ground fields for curves, Zeta functions and related questions in algebraic geometry (e.g., Birch-Swinnerton-Dyer conjecture), Rational points, Quadratic extensions, Elliptic curves, Special algebraic curves and curves of low genus
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Cox, David A.; Parry, Walter R., Torsion in elliptic curves over \(k(t)\), Compos. Math., 41, 3, 337-354, (1980) Elliptic curves, Elliptic curves over global fields, Special algebraic curves and curves of low genus, Arithmetic ground fields for curves, Families, moduli of curves (algebraic), Fine and coarse moduli spaces, Algebraic moduli problems, moduli of vector bundles, Enumerative problems (combinatorial problems) in algebraic geometry
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Rational points, Heights, Families, moduli of curves (algebraic), Diophantine equations, Arithmetic ground fields for curves
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Ito, H., The Mordell--Weil groups of unirational quasi-elliptic surfaces in characteristic 3, Math. Z. 211 (1992), 1--39. Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, Rational and ruled surfaces, \(K3\) surfaces and Enriques surfaces, Finite ground fields in algebraic geometry, Rational and unirational varieties
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves De Diego, Teresa: Théorème de faltings (conjecture de Mordell) pour LES familles algébriques de courbes, C. R. Acad. sci. Paris sér. I math. 323, No. 2, 175-178 (1996) Curves of arbitrary genus or genus \(\ne 1\) over global fields, Families, moduli of curves (algebraic), Rational points, Arithmetic ground fields for curves
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Leprévost, Familles de courbes de genre 2 munies d'une classe de diviseurs rationnels d'ordre 15,17,19 ou 21, C. R. Acad. Sci. Paris Sér. I Math. 313 pp 771-- (1991) Jacobians, Prym varieties, Families, moduli of curves (algebraic), Rational points, Elliptic curves
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Schütt, M.: Two lectures on the arithmetic of K3 surfaces. In: Arithmetic and Geometry of K3 Surfaces and Calabi-Yau Threefolds. Fields Institute Communications, vol. 67, pp. 71--99. Springer, New York (2013) Research exposition (monographs, survey articles) pertaining to algebraic geometry, \(K3\) surfaces and Enriques surfaces, Modular and automorphic functions, Elliptic curves over global fields, Complex multiplication and moduli of abelian varieties, Varieties over finite and local fields, Varieties over global fields, Rational points, Finite ground fields in algebraic geometry, Global ground fields in algebraic geometry, Families, moduli, classification: algebraic theory, Elliptic surfaces, elliptic or Calabi-Yau fibrations
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Arithmetic ground fields for curves, Quadratic extensions, Iwasawa theory, Elliptic curves, Rational points
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Rational points, Special algebraic curves and curves of low genus, Cubic and quartic extensions, Elliptic curves, Families, moduli of curves (algebraic)
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Elliptic curves, Relationships between algebraic curves and integrable systems, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Free motion of a rigid body
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Andreas Schweizer, On the \?^{\?}-torsion of elliptic curves and elliptic surfaces in characteristic \?, Trans. Amer. Math. Soc. 357 (2005), no. 3, 1047 -- 1059. Elliptic curves over global fields, Elliptic surfaces, elliptic or Calabi-Yau fibrations, Elliptic curves, Algebraic functions and function fields in algebraic geometry, Arithmetic theory of algebraic function fields, Curves over finite and local fields, Global ground fields in algebraic geometry, \(K3\) surfaces and Enriques surfaces
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Keilen T., Trans. Amer. Math. Soc. 355 pp 3485-- (2003) Families, moduli of curves (algebraic), Families, moduli of curves (analytic), Divisors, linear systems, invertible sheaves, Singularities of curves, local rings, Rational and ruled surfaces, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Proceedings, conferences, collections, etc. pertaining to algebraic geometry, Elliptic curves, Riemann surfaces; Weierstrass points; gap sequences, Special algebraic curves and curves of low genus, Jacobians, Prym varieties, Arithmetic ground fields for curves, Rational points, Arithmetic varieties and schemes; Arakelov theory; heights, Arithmetic algebraic geometry (Diophantine geometry), Algebraic coding theory; cryptography (number-theoretic aspects), Proceedings of conferences of miscellaneous specific interest
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Arithmetic ground fields for curves, Elliptic curves, Other abelian and metabelian extensions, Elliptic curves over global fields, Rational points
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Elliptic curves, Rational points, Computational aspects of algebraic curves, Elliptic curves over global fields, Arithmetic ground fields for curves
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Shimada, I, Rational double points on supersingular \(K\)3 surfaces, Math Comp, 73, 1989-2017, (2004) \(K3\) surfaces and Enriques surfaces, Singularities of surfaces or higher-dimensional varieties, Elliptic surfaces, elliptic or Calabi-Yau fibrations, Computational aspects of algebraic surfaces, Rational points
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves J. H. Silverman, Computing heights on elliptic curves. Math. Comp. 51 (1988), 339-358. Zbl0656.14016 MR942161 Arithmetic ground fields for curves, Rational points, Software, source code, etc. for problems pertaining to algebraic geometry, Cubic and quartic Diophantine equations, Elliptic curves
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Elliptic curves, Elliptic curves over global fields
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves M.A. Kenku , Rational torsion points on elliptic curves defined over quadratic fields , to appear. Rational points, Special algebraic curves and curves of low genus, Quadratic extensions, Elliptic curves, Arithmetic ground fields for curves, Global ground fields in algebraic geometry
0
Elliptic curves, Rational points, Elliptic surfaces, elliptic or Calabi-Yau fibrations, \(K3\) surfaces and Enriques surfaces, Families, moduli of curves (algebraic), Arithmetic ground fields for curves --. --. --. --., \(p\)-torsion in elliptic curves over subfields of \(\mathbf{Q}(\mu_p)\) , Math. Ann. 280 (1988), 513--519. Arithmetic ground fields for curves, Rational points, Elliptic curves, Special algebraic curves and curves of low genus, Cyclotomic extensions
0