text stringlengths 2 1.42k | label int64 0 1 |
|---|---|
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 real algebraic geometry; Gaussian field; harmonic polynomials; critical point theory; Hilbert's sixteenth problem Fyodorov, Yan V.; Lerario, Antonio; Lundberg, Erik, On the number of connected components of random algebraic hypersurfaces, J. Geom. Phys., 95, 1-20, (2015) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 killing cycles; lifting of vector bundles; syzygy theory; depth; maximal Cohen-Macaulay modules; syzygy theorem; factoriality of regular local rings; small multiplicities; local cohomology Evans, E. G.; Griffith, P.: Syzygies, London math. Soc. lecture note ser. 106 (1985) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 curves in projective spaces; limit linear series; maximal rank conjecture; curves with general moduli | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Double flag variety; Cox ring; complexity; linear representation; tensor product of representations; branching problem | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 real Schubert calculus; B. \& M. Shapiro conjecture; Bethe ansatz; Gaudin model \beginbarticle \bauthor\binitsE. \bsnmMukhin, \bauthor\binitsV. \bsnmTarasov and \bauthor\binitsA. \bsnmVarchenko, \batitleThe B. and M. Shapiro conjecture in real algebraic geometry and the Bethe ansatz, \bjtitleAnn. of Math. (2) \bvolume170 (\byear2009), no. \bissue2, page 863-\blpage881. \endbarticle \OrigBibText E. Mukhin, V. Tarasov and A. Varchenko, The B. and M. Shapiro conjecture in real algebraic geometry and the Bethe ansatz, Ann. of Math. (2) 170 (2009), no. 2, 863-881. \endOrigBibText \bptokstructpyb \endbibitem | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Commutative rings; Algebraic geometry; Proceedings; Symposium; RIMS; Kyoto/Japan; Ramification; singularities; local rings; seminormality | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Waring decomposition; complex identifiability; real identifiability; numerical algebraic geometry; Hessian criterion | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 abelian varieties; construction of singular divisors; Koszul rings; Newton-Okounkov bodies; syzygies of line bundles | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Chow ring; equivariant | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Differential graded Lie-algebras; functors of Artin rings | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 canonical ring; curves; surfaces of general type Franciosi, M, On the canonical ring of curves and surfaces, Manuscr. Math., 140, 573-596, (2013) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 rational regular map; real affine variety | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 o-minimal structure; Zariski closure; real analytic submanifold; abelian varieties Emmanuel Ullmo & Yafaev Andrei, ``o-minimal flows on abelian varieties'', Q. J. Math163 (2017) no. 2, p. 359-367{
}{\copyright} Annales de L'Institut Fourier - ISSN (électronique) : 1777-5310 | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 sectional genus; numerically effective canonical divisor; threefold with non-negative Kodaira dimension; very ample linear system | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 general presentation; representation of algebra; canonical decomposition; quiver with potential; cluster complex Derksen, H.; Fei, J., General presentations of algebras, Adv. Math., 278, 210-237, (2015) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 classification of complex projective smooth surface with an ample; line bundle; Chern classes of the Tschirnhaus bundle | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 real analytic space; analytic map; homeomorphism; complex projective varieties; algebraic isomorphism | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 canonical ring of a non-hyperelliptic; minimal free resolution; 2-linear projective dimension; genus; Clifford index Eisenbud, D.: Green's conjecture: an orientation for algebraists, (Sundance, UT, 1990). Research Notes Mathematics, vol. 2, pp. 51-78. Jones and Bartlett, Boston, MA (1992) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 first-order sentence; language of rings Poonen, B.: Uniform first-order definitions in finitely generated fields. Duke Math. J. \textbf{138}(1) (2007) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Clifford's theorem; curves with odd gonality Martens, G.: On curves of odd gonality. Arch. math. 67, 80-88 (1996) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Artin conjecture; Artin approximation; semilocal noetherian; complete ring; henselization | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Newton-Okounkov convex body; big divisor; finitely generated section ring D. Anderson, A. Küronya and V. Lozovanu, Okounkov bodies of finitely generated divisors, Int. Math. Res. Not. IMRN 2014 (2014), no.9, 2343--2355. | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 equivariant theory; multiplicative structure of cohomology ring; toric varieties | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 linear matrix inequality; LMI; spectrahedron; semidefinite programming; SDP; quadratic module; infeasibility; duality theory; real radical; Farkas' lemma I. Klep and M. Schweighofer, \textit{An exact duality theory for semidefinite programming based on sums of squares}, Math. Oper. Res., 38 (2013), pp. 569--590. | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Sylvester resultants; elimination theory; Koszul complex; polynomial ring; multigraded resultant Sturmfels, B.; Zelevinsky, A., Multigraded resultants of Sylvester type, J. Algebra, 163, 115, (1994) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 points of finite order; best approximation in rings of algebraic functions; Jacobian | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 local ring; syzygy; intersection multiplicity; system of parameters; homological conjectures; Cohen-Macaulay modules | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 points in linear general position; property \((N_ p)\); minimal free resolution of the coordinate ring | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Cox ring; moduli space; stable pointed curves; permutohedral space P. Larsen, Permutohedral spaces and the Cox ring of the moduli space of stable pointed rational curves , Geom. Dedicata 162 (2013), 305-323. | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 semi-real ring; orderings; valuations DOI: 10.1216/RMJ-1989-19-3-973 | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 real closed fields; real algebraic geometry; Nash functions; orders on rings or field; semi-algebraic sets; real algebraic varieties; Nash varieties; theorem of Nash and Tognoli; Witt rings Bochnak, J.; Coste, M.; Roy, M.-F., Géométrie algébrique Réelle, (1987), Springer-Verlag Berlin | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 rings with many units; freeness of projective modules; Serre conjecture B. R. McDonald and William C. Waterhouse, Projective modules over rings with many units, Proc. Amer. Math. Soc. 83 (1981), no. 3, 455-458. | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 higher level reduced forms; reduced Witt rings; rings with many units; semi-local rings; space of signatures; local-global criterion for isotropy; representation theorem M. Marshall and L. Walter, Signatures of higher level on rings with many units, Math. Z. 204 (1990), no. 1, 129-143. | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Bröcker, Ludwig, Zur Theorie der quadratischen Formen über formal reellen Körpern, Math. Ann., 210, 233-256, (1974) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Witt ring; space of orderings; Pfister form; finite fans M. A. Marshall, The Witt ring of a space oforderings. Trans. Amer. Math. Soc. 258 (1980), 505--521 | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 reduced Witt ring; semilocal ring; bilinear form; quadratic form; space of orderings M. Knebusch, On the local theory of signatures and reduced quadratic forms. Abh. math. Sem. Univ. Hamburg51, 149--195 (1981). | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 integral closure; valuation rings Gräter, J.: Integral closure and valuation rings with zero divisors. Studia sci. Math. hungar., 457-458 (1982) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 real algebraic geometry; real holomorphy ring; function field over real closed field; semialgebraic components; real spectrum Schülting, H. W.: Real holomorphy rings in real algebraic geometry, Lect. notes math. 959, 433-442 (1982) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 commutative algebra Manis M.,Valuations on a commutative ring, Proc. Amer. Math. Soc.,20 (1969), 193--198. | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Griffin, M.: Valuations and Prüfer rings. Canad. J. Math. 26, 412-429 (1974) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 computation of set of values; computation of equivalence classes; Witt ring of field; additive semigroup; local-global criteria; isotropic multiple; preorders R. Brown and M. Marshall, ''The reduced theory of quadratic forms,'' Rocky Mount. J. Math.,11, No. 2, 161--175 (1981). | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 formal nullstellensatz; Hilbert 17th problem; level; semi-reality; Artin- Schreier theory; ordering; prime cone; real spectrum; Artin-Lang homomorphism theorem; real nullstellensatz; positivstellensatz; semi- algebraic sets; Tarski-Seidenberg principle T. Y. Lam, An introduction to real algebra, in \textit{Ordered Fields and real Algebraic Geometry (Boulder, Colo., 1983)}, Rocky Mountain J. Math., 14 (1984), 767-814. | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Orderings; Signature; Formally Real Field; Quadratic Form; Reduced Witt Rings Becker, E.; Bröcker, L.: On the description of the reduced Witt ring. J. algebra 52, 328-346 (1978) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 p-primes; completions; valuation; formally real; formally p-adic K. G. Valente, The \?-primes of a commutative ring, Pacific J. Math. 126 (1987), no. 2, 385 -- 400. | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 saturation; local stability index; spaces of orderings; local structure; local-global result; system of quadratic forms M. A. Marshall, Spaces of orderings: systems of quadratic forms, local structure, and saturation. Communications in Algebra 12 (1984), 723--743 | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 functional analysis Kadison, R.V.: A representation theory for commutative topological algebra. Mem. Am. Math. Soc. \textbf{1951}(7), 39 (1951) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 partially ordered rings; compact Hausdorff space; associative rings Dubois D.W., Pac. J. Math 24 pp 57-- (1968) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 formally real field; abstract Witt ring; reduced Witt ring; isotropy; formally real fields; classification of spaces of orderings of finite chain length; orderings; real places; anisotropic form M. A. Marshall, Spaces oforderings IV. Canad. J. Math. 32(1980), 603--627 | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 associative rings Dubois, D.W., A note on david harrison's theory of preprimes, Pac. J. Math., 21, 15-19, (1967) | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 Bibliography; cone of ordering; reduced theory of quadratic forms; signature; reduced T-forms; Henselian valuation; fan; superpythagorean fields; superordered fields; representation theorem; Hasse-Minkowski families; preordering; chain lengths; real holomorphy ring; Pruefer ring; real spectrum; T- semiordering; anisotropic T-module; Pasch preordering; strong approximation property; weak approximation property; bibliography; formally real fields; valuation theory; reduced Witt ring T. Y. Lam, Orderings, \textit{Valuations and Quadratic Forms}, CBMS Regional Conference Series in Mathematics, Vol. 52, American Mathematical Society, Providence, RI, 1983. | 0 |
real place; holomorphy ring; rings with many units DOI: 10.1016/0021-8693(91)90169-9 real valuation; formally real fields; reduced Witt ring; real places of function field H. W. Schülting, Über reelle Stellen eines Körpers und ihren Holomorphiering, Dissertation, Universität Dortmund (1979). | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) determinantal variety; essentially isolated determinantal singularity; general hyperplane; strongly general hyperplane; generic section; Milnor number; essential smoothing Brasselet, J.-P.; Chachapoyas, N.; Ruas, M., Generic sections of essentially isolated determinantal singularities, Int. J. math., 28, (2015) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Morse point; isolated hyperplane singularity; transversal type; Milnor fibre | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) plane curve singularity; weighted homogeneous polynomial; classification theorem; isolated singularity Kang Chunghyuk: Analytic types of plane curve singularities defined by weighted homogeneous polynomials. Trans. AMS 352(9), 3995--4006 (2000) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) surface in projective 4-space; lifting theorem for surfaces; generalized trisecant lemma; general hyperplane section Mezzetti, E; Raspanti, I, A laudal-type theorem for surfaces in \({\mathbb{P}}^4\), Rend. Sem. Mat. Univ. Politec. Torino, 48, 529-537, (1993) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) smooth hyperplane section; Lefschetz hyperplane theorem | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Gromov-Witten invariants; mirror symmetry; Grothendieck-Riemann-Roch theorem; Lefschetz hyperplane section principle; Serre duality T. Coates, A. Givental, Quantum Riemann-Roch, Lefschetz and Serre. \textit{Ann. of Math}. (2) \textbf{165} (2007), 15-53. MR2276766 Zbl 1189.14063 | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Yau algebras; isolated hypersurface singularity; weak Torelli-type theorem | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) arc structure of singularities; smooth curves on a surface singularity; generic hyperplane section; infinitely near points G. Gonzalez-Sprinberg, M. Lejeune-Jalabert, Courbes lisses sur les singularités de surface, C. R. Acad. Sci. Paris, t. Sétie, I, 318 (1994), pp. 653-656 | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) graded isolated singularity; pertinency; group action; Auslander theorem; Gelfand-Kirillov dimension | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) stratified vector field; hyperplane section; radial vector field; index of a vector field; vector field on a complex space; complex analytic singularity; Whitney stratification; Euler obstruction Brasselet, J.-P.; Lê Dũng Tráng; Seade, J., Euler obstruction and indices of vector fields, Topology, 39, 6, 1193-1208, (2000) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Fano Q-folds; Leftschetz hyperplane section theorem; Calabi-Yau 3-folds | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Grassmannians; quantum hyperplane section conjecture; complete intersections; homogeneous spaces; mirror theorem; quantum cohomology ring B. Kim, Quantum hyperplane section theorem for homogeneous spaces. \textit{Acta Math}. \textbf{183} (1999), 71-99. MR1719555 Zbl 1023.14028 | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) hyperplane section; Lefschetz pencil; Bertini theorem; discrete valuation ring Jannsen, U.; Saito, S., Bertini theorems and Lefschetz pencils over discrete valuation rings, with applications to higher class field theory, J. Algebr. Geom., 21, 683-705, (2012) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) quantum hyperplane section principle; concavex decomposable vector bundles; Lefschetz hyperplane section theorem B. Kim, Quantum hyperplane section principle for concavex decomposable vector bundles, J. Korean Math. Soc. 37 (2000), no. 3, 455--461. | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Zariski hyperplane section theorem; fundamental group of the complement to an affine plane curve I. Shimada, Fundamental groups of complements to hypersurfaces. RIMS Kôkyûroku 1033, 27-33 (1998) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) hyperplane section; Lefschetz theorem; normal crossing divisor DOI: 10.2969/jmsj/05140887 | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) projective variety; close positive current; complete intersection; Lefschetz hyperplane section theorem | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) integral variety as hyperplane section; resolution of Buchsbaum varieties; codimension 2 submanifold; syzygy; filtered Bertini theorem Chang, On the Hyperplane Sections of Certain Codimension 2 Subvarieties in Pn, Arch. Math. 58 pp 547-- (1992) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Mather-Yau theorem; isolated hypersurface singularity Stephen S.-T. Yau, A remark on moduli of complex hypersurfaces, Amer. J. Math. 113 (1991), no. 2, 287 -- 292. | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Bertini theorem; graded ring; hyperplane section; normal scheme | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Lefschetz theorems; hyperplane section; vanishing theorem H. A. HAMM, Affme vaeties and Lefschetz theorems, Singularity Theory (Teste, 1991), World Sci. Publishing, River Edge, 1995, 248-262 | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Waring decomposition; Waring rank; projective hypersurface; isolated singularity; hyperplane arrangement | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) complete intersection; isolated singularity; zeta-function; monodromy; Milnor fibration; iterated hyperplane sections M. Oka, ''Principal Zeta-Function of Non-degenerate Complete Intersection Singularity,'' J. Fac. Sci. Univ. Tokyo, Sect. IA 37, 11--32 (1990). | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) fundamental group at infinity; quotient of complex 2-space; Lefschetz hyperplane section theorem; elliptic fibrations Gurjar R.V., Shastri A.R.: A topological characterization of C2/G. J. Math. Kyoto Univ.25 (no. 4), 767--773 (1985) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) decomposition of hypersurface singularities; generic hyperplane section; isolated critical point; Morse points | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) vanishing cycles; hyperplane section; linear pencils; second Lefschetz theorem; Van Kampen theorem | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) cohomological Hilbert-function; coherent sheaf; vanishing theorem; invariants of a sheaf; linear subdimension; hyperplane section Brodmann M, A priori bounds of Severi type for cohomological Hilbert function, J. Algebra 155 (1993) 298--324 | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) nonisolated hypersurface singularities; Milnor fibration; morsification; equisingularity; Zariski's multiplicity conjecture; topological triviality; Floer homology; lattice homology; low dimensional topology; plumbing 3-manifolds; simultaneous resolutions; \(\mu\)-constant families; isolated surface singularities; topological triviality; Lipschitz equisingularity; motivic integration; arc spaces; vanishing cycles; monodromy; vanishing folds; cobordism theorem; computer algebra system ``Singular'' | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) global residue theorem; complete intersections; isolated singularities T. Hatziafratis , A global residue theorem on analytic varieties , J. Math. Anal. Appl. , 149 ( 2 ) ( 1990 ), pp. 475 - 488 . MR 1057688 | Zbl 0712.32004 | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Bertini's theorem; singularity locus; smooth reflexive sheaves; degeneracy loci of homomorphisms | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) polar curve; isolated singularity; complete intersection; Milnor lattice; parabolic; hyperbolic W. Ebeling, ''The monodromy groups of isolated singularities of complete intersection,''Lect. Notes Math.,1923 (1987). | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) non-isolated hyperplane singularities; topology of the Milnor fibre; homotopy type of the Milnor fibre | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Chern classes; local complete intersection; isolated singularity | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) sigma functions; Schur functions; \(C_{r,s}\) curve, Riemann singularity theorem Matsutani, S.; Previato, E., Jacobi inversion on strata of the Jacobian of the \(C_{rs}\) curve \(y^r=f(x)\) II, J. Math. Soc. Jpn., 66, 647-692, (2014) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) isolated singularity; Milnor number; Tjurina number; multiplicity | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Hochster's theta invariant; isolated hypersurface singularity; Hodge-Riemann bilinear relations; Tor-rigidity; Chern character; étale cohomology; singular cohomology; Hilbert series Moore, W. F.; Piepmeyer, G.; Spiroff, S.; Walker, M. E., \textit{hochster's theta invariant and the Hodge-Riemann bilinear relations}, Adv. Math., 226, 1692-1714, (2011) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) isolated hypersurface singularity; Lie algebra; moduli algebra | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) liftable derivation; moduli algebras; isolated hypersurface singularity Chen Hao. A remark on liftable derivation of moduli algebras of isolated hypersurface singularities. to appear in Proc. AMS | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) curves in a projective space; Rao module; linkage; hyperplane section:; degenerate hyperplane section; Gorenstein liaison; Gorenstein linkage | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) weakly normal varieties; birational morphism; general hyperplane section Cumino, C.; Greco, S.; Manaresi, M., Hyperplane sections of weakly normal varieties in positive characteristic, Proc. amer. math. soc., 106, 1, 37-42, (1989) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) hyperplane section of a local complete intersection variety; cone; normal bundle; Grassmannian | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) isolated singularity; hypersurface singularity; germ of analytic hypersurface; moduli algebra; quasihomogeneous singularities Chen, H.; Xu, Y. -J.; Yau, S.: Nonexistence of negative weight derivations of moduli algebras of weighted homogeneous singularities. J. algebra 172, 243-254 (1995) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Gromov-Witten invariants; orbifolds; quantum cohomology; hypersurfaces; complete intersections; quantum Lefschetz hyperplane theorem T. Coates, A. Gholampour, H. Iritani, Y. Jiang, P. Johnson, C. Manolache, The quantum Lefschetz hyperplane principle can fail for positive orbifold hypersurfaces. \textit{Math. Res. Lett}. \textbf{19} (2012), 997-1005. MR3039825 Zbl 1287.14027 | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) hyperplane arrangements; isolated hypersurface singularities; almost free divisors; Milnor fibration; Milnor number J. Damon, ''Higher multiplicities and almost free divisors and complete intersections,'' preprint (1992). | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Riemann-Roch theorem; solution of general elliptic equations; isolated singularities; compact manifold Gromov, M. and Shubin, M. A.: The Riemann--Roch theorem for general elliptic operators, C. R. Acad. Sci. Paris Sér. I Math. 314 (5) (1992), 363--367. MR MR1153716 (93b: 58138) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Hodge theory; isolated singularity; Kähler metric; de Rham cohomology | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Jacobian of a hyperplane section of a surface; endomorphisms of abelian varieties; Albanese variety; linear system Ciliberto, C., van~der Geer, G.: On the Jacobian of a hyperplane section of a surface. In: Classification of Irregular Varieties (Trento, 1990). Lecture Notes in Mathematics, vol. 1515, pp. 33-40, Springer, Berlin (1992) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Ext; holomorphic differential forms; isolated complete intersection singularity | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Zariski-Lefschetz theorem; normal Morse data; Lefschetz theorem for hyperplane sections; singularities; locally a complete intersection; Morse theory for manifolds with boundary; stratified Morse theory; rectified homotopical depth | 0 |
Subsets and Splits
No community queries yet
The top public SQL queries from the community will appear here once available.