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fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) derived category; semiorthogonal decomposition; projective duality; noncommutative algebraic geometry | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) discrete logarithm problem; elliptic curve cryptography; key exchange using decomposition problem; non-commutative groups | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) candecomp; Parafac; tensor decomposition; tensor rank; identifiability; weakly defective Segre varieties L. Chiantini, G. Ottaviani, and N. Vannieuwenhoven, \textit{An algorithm for generic and low-rank specific identifiability of complex tensors}, SIAM J. Matrix Anal. Appl., 35 (2014), pp. 1265--1287, . | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) arrangements; finite Coxeter groups; finite complex reflection groups; decomposition classes; invariants; invariant polynomial functions; semisimple Lie algebras Douglass, J. Matthew; Röhrle, Gerhard, Invariants of reflection groups, arrangements, and normality of decomposition classes in Lie algebras, Compos. Math., 148, 3, 921-930, (2012) | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) stability; fundamental groups; differential forms; Kähler-Einstein metrics; Calabi-Yau varieties; Bochner principle; irreducible holomorphic symplectic varieties; singular Beauville-Bogmolov decomposition | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) sub-Pfaffian set; cell decomposition; complexity; Betti number | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) decomposition theorem; Hodge-structure; mixed Hodge structure M. A. de Cataldo, L. Migliorini, \textit{Hodge-theoretic aspects of the decomposition theorem}, in: \textit{Algebraic Geometry} (Seattle 2005), Proc. Sympos. Pure Math., Vol. 80, Part 2, Amer. Math. Soc., Providence, RI, 2009, pp. 489-504. | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) \(\bar{\partial}\)-operator; complete intersection; Hodge decomposition; homotopy formula; Riemann surface Henkin, GM; Polyakov, PL, Explicit Hodge-type decomposition on projective complete intersections, J. Geom. Anal., 26, 672-713, (2016) | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) fan; classification of complete smooth toric varieties; Fano variety P. Kleinschmidt, ''A Classification of Toric Varieties with Few Generators,'' Aequationes Math. 35, 254--266 (1988). | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) semisimple Lie groups; algebraic groups; affine and projective algebraic varieties; algebraic tori; Jordan decomposition; Borel groups; compact linear groups; complete reducibility; root systems; Dynkin diagrams; Cartan decomposition; Iwasawa decomposition; finite dimensional Lie algebra; weight lattices A. Onishchik and E. Vinberg \textit{Lie groups and algebraic groups. }Translated from the Russian and with a preface by D. A. Leites. Springer Series in Soviet Mathematics. Springer-Verlag, Berlin, 1990.Zbl 0722.22004 MR 1064110 | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) p-adic cohomology; p-adic Galois representations; p-adic Lie groups; Hodge-Tate-decomposition; p-adic representation theory Sen, S, Continuous cohomology and \(p\)-adic Galois representations, Invent. Math., 62, 89-116, (1980) | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) \(\log\) MMP; cone theorem; contraction theorem; rational curves; Zariski decomposition; Kähler manifolds; abundance Campana, F.; Höring, A.; Peternell, T., Abundance for Kähler threefolds, Ann. Sci. Éc. Norm. Supér. (4), 49, 971-1025, (2016) | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) algebraic surfaces over the algebraic closure of a finite field; Zariski decomposition of divisors; Kodaira-Iitaka dimension; numerical dimension; numerical type V. Maşek, Kodaira-Iitaka and numerical dimensions of algebraic surfaces over the algebraic closure of a finite field , Rev. Roumaine Math. Pures Appl. 38 (1993), 679-685. | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) connected component; compact semi-algebraic set; cylindrical algebraic decomposition; cell adjacency | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) reductive algebraic group; Weyl group; Deodhar's decomposition; chamber ansatz; Lusztig's decomposition Marsh, R.J., Rietsch, K.C.: Parametrizations of flag varieties. Represent. Theory \textbf{8}, 212-242 (2004) (electronic) | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) invariant divisors; toric variety; fan; Betti numbers Barthel, G.; Fieseler, K. -H.: Invariant divisors and homology of compact complex toric varieties. J. math. Sci. 82, 3615-3624 (1996) | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) \(p\)-adic Hodge theory; Hodge-Tate decomposition; comparison with the étale topology; Tate twist; intermediate cohomology Faltings, G, \(p\)-adic Hodge theory, J. Am. Math. Soc., 1, 255-299, (1988) | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) resolution of singularities; flag; Gauss decomposition of formal automorphisms; initial ideal Herwig Hauser, Three power series techniques, Proc. London Math. Soc. (3) 89 (2004), no. 1, 1 -- 24. | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) Bibliography; computer algebra systems; Gröbner bases; ideal membership; Hilbert function; elimination; Milnor numbers; Beilinson monads; \(D\)-modules; primary decomposition; normalization; Puiseux expansion; rational parametrization; deformations; invariant rings; special varieties; intersection theory; syzygy conjectures; Zariski's conjecture; visualisation; complexity | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) Gauss decomposition; quadratic groups; Thompson conjecture S.-K. Ye, S. Chen, and C.-S. Wang, ''Gauss Decomposition with Prescribed Semisimple Part in Quadratic Groups,'' Comm. Algebra 37, 3054--3063. | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) toric geometry; Semple-Nash modification; logarithmic Jacobian ideal; monomial valuation; uniformization González, P.D., Teissier, B.: Toric geometry and the Semple-Nash modification. Revista de la Real Academia de Ciencias Exactas, Físicas y Naturales, Serie A Matemáticas 108(1), 1-48 (2014) | 1 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) desingularization; blowing-up; marked ideal; standard basis; Hilbert-Samuel function Bierstone, E., Milman, P.: Desingularization of toric and binomial varieties. J. Alg. Geom. 15, 443-486 (2006) | 1 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) resolution of singularities; binomial ideals Bodnár, G., Schicho, J.: A A computer program for the resolution of singularities. In: Hauser, H., Lipman, J., Oort, F., Quirós A.: (eds.) Resolution of Singularities. A Research Book in Tribute of Oscar Zariski. Progr. Math., vol. 181, p.~231-238. Birkhäuser, Basel (2000) | 0 |
fan decomposition Pérez, PDG; Teissier, B, Embedded resolutions of non necessarily normal affine toric varieties, C. R. Math. Acad. Sci. Paris, 334, 379-382, (2002) Thompson, HM, Multiplier ideals of monomial space curves, Proc. Am. Math. Soc. Ser. B, 1, 33-41, (2014) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) toric varieties; graded minimal resolution; semigroup algebras; simplicial complexes; Tor; Koszul homology; Cohen-Macaulay; Gorenstein; monomial surfaces Emilio Briales, Pilar Pisón, Antonio Campillo, and Carlos Marijuán, Combinatorics of syzygies for semigroup algebras, Collect. Math. 49 (1998), no. 2-3, 239 -- 256. Dedicated to the memory of Fernando Serrano. | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) monomial curve; graded Betti numbers of the minimal free resolution; Cohen-Macaulay Campillo, A.; Giménez, Ph.: Graphes arithmétiques et syzygies. C. R. Acad. sci. Paris 324, 313-316 (1997) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) free resolutions; complete intersections; CI operators; Eisenbud operators; maximal Cohen-Macaulay modules | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Cohen-Macaulay ring; numerical semigroup; numerical semigroup ring; graded ring; pseudo-Frobenius number; minimal free resolution; symbolic Rees algebra | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) toric varieties; combinatorial commutative algebra; Cohen-Macaulay modules; vector space arrangements; hyperplane arrangements; free resolutions; local cohomology M. Perling, Resolutions and cohomologies of toric sheaves. The affine case, Internat. J. Math. 24 (2013), no. 9, 1350069, 47pp. arXiv: | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) variety of almost minimal degree; minimal free resolution; arithmetically Cohen-Macaulay; Betti numbers; minimal generators of the syzygy modules Hoa L.T. (1993). On minimal free resolutions of projective varieties of degree=codimension+2. J. Pure Appl. Algebra 87: 241--250 | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) finite representation type; locally free sheaves; existence of almost split sequences; maximal Cohen-Macaulay modules; dualizing module; Cohen- Macaulay graded; dualizing sheaf Auslander, M.; Reiten, I., Almost split sequences. II, Carleton Univ., Ottawa, Ont., 1974 | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Cohen-Macaulay modules; Sklyanin algebra; graded module; Hilbert series; Gelfand-Kirillov dimension Levasseur, Thierry; Smith, S. Paul, Modules over the \(4\)-dimensional Sklyanin algebra, Bull. Soc. Math. France, 121, 1, 35-90, (1993) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) divisor of a rational normal scroll; minimal free resolution; arithmetically Cohen-Macaulay E. Park, On syzygies of divisors on rational normal scrolls, Math. Nachr. 287 (2014), no. 11-12, 1383--1393. | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) log canonical singularities; Cohen-Macaulay; minimal model program; mixed Hodge structures; dual complexes Fujino, O.: On isolated log canonical singularities with index one. J. math. Sci. univ. Tokyo 18, No. 3, 299-323 (2011) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) quiver with relation; maximal modification algebra; noncommutative crepant resolution; toric geometry; graded rank 1 Cohen-Macaulay modules; dimer models; dimers; mutations R. Bocklandt, \textit{Generating toric noncommutative crepant resolutions}, arXiv:1104.1597 [INSPIRE]. | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) graded rings; complete intersection; regular sequences; Jacobian criterion; singularities; unmixedness theorem; Cohen-Macaulay rings and modules; homogeneous forms; rational points | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) graded isolated singularities; graded maximal Cohen-Macaulay modules; AS-Gorenstein algebras; Serre functors; cluster tilting objects; Veronese subalgebras Ueyama, Kenta, Graded maximal Cohen-Macaulay modules over noncommutative graded Gorenstein isolated singularities, J. Algebra, 383, 85-103, (2013) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) local cohomology; free resolution; syzygies; graded module over polynomial ring; Bertini classification; Linear parts of resolutions; Castelnuovo regularity; rings of minimal multiplicity; projective varieties of minimal degree \beginbarticle \bauthor\binitsD. \bsnmEisenbud and \bauthor\binitsS. \bsnmGoto, \batitleLinear free resolutions and minimal multiplicity, \bjtitleJ. Algebra \bvolume88 (\byear1984), page 89-\blpage133. \endbarticle \OrigBibText David Eisenbud and Shiro Goto, Linear free resolutions and minimal multiplicity . J. Algebra 88 (1984), 89-133. \endOrigBibText \bptokstructpyb \endbibitem | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Gorenstein ideals; graded Betti numbers; homological dimension; graded minimal free resolutions; structure theorems | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Frobenius categories; Iwanaga-Gorenstein algebras; Gorenstein-projective modules; Cohen-Macaulay modules; non-commutative resolutions; singularity categories; rational surface singularities M.~Kalck, O.~Iyama, M.~Wemyss, and D.~Yang. Frobenius categories, {G}orenstein algebras and rational surface singularities. {\em Compos. Math.}, 151(3):502--534, 2015. DOI 10.1112/S0010437X14007647; zbl 1327.14172; MR 3320570; arxiv 1209.4215 | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) arithmetically Cohen-Macaulay varieties; weak Lefschetz property; Togliatti systems; GT-systems; minimal free resolution; projections of Veronese varieties | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) maximal Cohen-Macaulay modules; vector bundles; projective curves; reflexive modules; minimal elliptic singularities; vector bundle tame curves; vector bundle wild curves Drozd, Yu.A., Cohen-Macaulay modules and vector bundles, (Proc. Euroconference in: Interactions Between Ring Theory and Representations of Algebras, Lect. Notes Pure Appl. Math., vol. 210, (2000), Marcel Dekker New York), 107-130 | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) singularities of mappings; Thom-Mather theory; nice dimensions; right-left equivalence; contact equivalence; stability; versal unfoldings; finite determinacy; vector fields and flows; local conical structure; Thom-Boardman singularities; topological stability; unstable map-germs; unipotent algebraic groups; critical space; discriminants; bifurcation sets; isosingular locus; logarithmic tangent space; logarithmic transversality; stable perturbations; disentanglement of a map; image Milnor numbers; discriminant Milnor numbers; free and almost free divisors; complete intersections; Fitting ideals; conductor ideals; multiple point spaces; knot theory; Reidemeister moves; rank condition; parameterised hypersurfaces; maximal Cohen-Macaulay modules; duality; Gorenstein rings; canonical module; triple points | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) minimal free resolution; tangent bundle; Betti numbers; maximal rank; set of points in \(\mathbb{P}^n\); minimal resolution conjecture; Cohen-Macaulay type conjecture Lauze F., Manuscripta Math 92 pp 525-- (1997) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) edge ideals; curve arrangements; sequentially Cohen-Macaulay rings; Buchsbaum rings; projective dimension; regularity; square free modules | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) dualizing complexes; rigid complexes; differential graded algebras; Cohen-Macaulay homomorphisms; dualizing sheaves Yekutieli, A., \textit{rigid dualizing complexes via differential graded algebras (survey)}, Triangulated categories, 452-463, (2010), Cambridge University Press, Cambridge | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Gorenstein rings; noncommutative orders; Macimal Cohen-Macaulay modules; noncommutative resolutions; symmetric orders; birational orders; non-singular orders; non-Gorenstein Stangle, J., Gorenstein and totally reflexive orders, J. Algebra, 477, 56-68, (2017) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) graded countable Cohen-Macaulay representation type; maximal Cohen-Macaulay modules; module variety | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) number of generators of ideals; Cohen-Macaulay type; Hilbert function of the coordinate ring; minimal free resolution; least degree of a nonsingular curve Geramita, A. V.; Maroscia, P., The ideal of forms vanishing at a finite set of points in \(\mathbb{P}^n\), J. Algebra, 90, 528-555, (1984) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) symbolic powers; regular powers; star configurations; graded minimal free resolutions; Betti numbers | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) acyclic Cohen-Macaulay simplicial complexes; reduced monomial schemes | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) finitely generated modules; free resolutions; cohomology of a complex of locally free sheaves; cohomology of a four-term complexes; locally free sheaves; normal toric varieties; derived categories; consistent dimer model algebras; Cox ring; Cox irrelevant ideal; finitely generated modules; free resolutions; cohomology of a complex of locally free sheaves; cohomology of a four-term complexes; locally free sheaves; normal toric varieties; Macaulay2, circuits in complete graphs A. Craw and A. Quintero Vélez, Cohomology of wheels on toric varieties, Hokkaido Math. J., to appear. | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) reconstruction algebras; Cohen-Macaulay singularities; labelled Dynkin diagrams; endomorphism rings of Cohen-Macaulay modules; resolutions of singularities; moduli spaces of representations; tilting bundles; derived equivalences; global dimension Wemyss, M, Reconstruction algebras of type \(A\), Trans. Am. Math. Soc., 363, 3101-3132, (2011) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) \(f\)-vector theory; Stanley-Reisner rings; simplicial complex; singular homology; Betti numbers; zeta function; singular projective variety; Cohen-Macaulay complexes Anders Björner and Karanbir S. Sarkaria, The zeta function of a simplicial complex, Israel J. Math. 103 (1998), 29 -- 40. | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) reconstruction algebras; quivers with relations; noncommutative resolutions; CM-modules; surface singularities; Cohen-Macaulay singularities; labelled Dynkin diagrams; resolutions of singularities Wemyss, M., Reconstruction algebras of type \textit{D} (I), J. Algebra, 356, 158-194, (2012) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) graded minimal free resolutions of perfect homogeneous ideals; polynomial ring Lorenzini A.,Betti numbers of perfect homogeneous ideal, J. Pure Appl. Algebra60 (1989), 273--288. | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) vector bundle; bilinear form; derived category of bounded complexes of coherent sheaves; bounded complexes of free graded modules; Yang-Mills A. A. Beilinson, The derived category of coherent sheaves on P n. Selecta Math. Soviet. 3 (1984), 233-237. | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) singularity categories; noncommutative resolutions; derived quotients; recollements; Cohen-Macaulay modules; isolated hypersurface singularities | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Castelnuovo-Mumford regularity; local cohomology; graded modules; Cohen-Macaulay varieties U. Nagel and P. Schenzel, Degree bounds for generators of cohomology modules and Castelnuovo-Mumford regularity,Nagoya Math. J. 152 (1998), 153--174. | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) finite representation type; maximal Cohen-Macaulay modules; ascent; descent; separable closure Wiegand R.: Local rings of finite Cohen--Macaulay type. J. Algebra 203(1), 156--168 (1998) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) \(A\)-infinity algebras; Ext-algebras; Koszul dualities; projective complete intersections; derived categories; free resolutions; differential graded algebras; Clifford algebras; coherent sheaves Baranovsky, V.: BGG correspondence for projective complete intersections. Int. Math. Res. Not. \textbf{2005}(45), 2759-2774 | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) noncommutative regular rings; cyclic quotient singularities; rational double points; rings of invariants; local dualities; dualizing complexes; Gorenstein singularities; Cohen-Macaulay singularities Chan, D.: Noncommutative rational double points. J. algebra 232, 725-766 (2000) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) rational simplicial polytope; fixed-point free linear symmetry; Cohen- Macaulay complex; \(h\)-vector; toric variety Adin, R.M., On \textit{h}-vectors and symmetry, (Jerusalem combinatorics '93, Contemp. math., vol. 178, (1994), Amer. Math. Soc. Providence, RI), 1-20, MR 1310571 (96e:52029) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) zero-dimensional fat points schemes; smooth quadric; arithmetically Cohen-Macaulay; complete intersection; minimal set of generators Guardo E.: Fat points schemes on a smooth quadric. J. Pure Appl. Algebra 162, 183--208 (2001) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) balanced big Cohen-Macaulay modules; Cohen-Macaulay modules; local cohomology modules Bahmanpour, K, Cohen-Macaulay modules over Noetherian local rings, Bull. Korean Math. Soc., 51, 373-386, (2014) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Cohen-Macaulay modules; algebra of planar quasi-invariants; Calogero-Moser systems | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) bigraded rings; bigraded modules; complete intersection; Hilbert function; minimal free resolution; scheme-theoretic complete intersection | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) graded ring; modules of differentials; minimal cotangent complex; Euler homomorphism; complete intersection; Poincaré series Avramov, L.L.; Herzog, J., Jacobian criteria for complete intersections, Invent. math., 117, 75-88, (1984) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) filtered algebra; graded algebra; resolutions; enveloping algebra; homological perturbation; differential homological algebra; augmented algebra; chain complex; contraction; reduced bar construction; Hochschild cohomology; cohomology of finitely generated torsion free nilpotent groups; formal groups Lambe, L.A.: Homological perturbation theory, Hochschild homology, and formal groups. In: Deformation theory and quantum groups with applications to mathematical physics (Amherst, MA, 1990), vol. 134 of Contemp. Math., pp. 183-218. Am. Math. Soc., Providence, RI (1992) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Cohen-Macaulay modules; matrix factorizations; bimodule problems; bunches of chains | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) bibliography; Hilbert's basis theorem; dictionary: commutative algebra-projective algebraic geometry; Hilbert's syzygy theorem; Hilbert's Nullstellensatz; Hilbert polynomials; dimension theory; Dedekind domains; Hilbert-Samuel functions; elimination theory; computer algebra; modules of differentials; homological methods; Koszul complex; Cohen-Macaulay property; duality theory; linkage Eisenbud D, \textit{Commutative Algebra: With a View Toward Algebraic Geometry}, 150, Springer New York, 1995. | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Gorenstein rings; minimal free resolutions; Godeaux surfaces | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Castelnuovo-Mumford regularity; generalized Cohen-Macaulay modules; standard system of parameters; Buchsbaum ring Hoa, Lê Tuân; Miyazaki, Chikashi, Bounds on Castelnuovo--Mumford regularity for generalized Cohen--Macaulay graded rings, Math. Ann., 301, 3, 587-598, (1995) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) syzygies; representation stability; Segre varieties; Veronese varieties; chessboard complexes; matching complexes; packing complexes; asymptotic vanishing C. Raicu, Representation stability for syzygies of line bundles on Segre-Veronese varieties, arXiv:1209.1183 (2012). | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) depth; Cohen-Macaulay ring; Gorenstein ring; local cohomology modules; torsion modules; grade-theoretic analogue of the Cousin complex; Noetherian ring Hughes, Quaestiones Math. 9 pp 293-- (1986) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) maximal Cohen-Macaulay modules; matrix factorizations | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Auslander-Reiten sequences; Cohen-Macaulay modules | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Graded rings; Filtrations; Commutative rings; Proceedings; Symposium; Kyoto/Japan; filtrations; Buchsbaum modules; Sharp's conjecture; derivations; Cohen- Macaulay; graded rings | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) 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 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) graded Cohen-Macaulay singularity; syzygy; Kähler differentials; hypersurface singularities Martsinkovsky, A, Maximal Cohen-Macaulay modules and the quasihomogeneity of isolated Cohen-Macaulay singularities, Proc. Am. Math. Soc., 112, 9-18, (1991) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) local ring; syzygy; intersection multiplicity; system of parameters; homological conjectures; Cohen-Macaulay modules | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Cohen-Macaulay property; associated graded ring S. Molinelli, D.P. Patil and G. Tamone, On the Cohen-Macaulayness of the associated graded ring of certain monomial curves , Beiträge zur Algebra und Geometrie \emdash/ Contributions to Algebra and Geometry 39 (1998), 433-446. | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) multiplicity; Cohen-Macaulay property; Gorenstein property; associated graded ring; elliptic curve; Gorenstein local ring; reduction number; quadratic hypersurface; quartic hypersurface Ooishi, A.: Tangent cones at curve and surface singularities. J. pure appl. Algebra 95, 189-201 (1994) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) postulation; minimal free resolutions of general curves | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) ideal of points in projective space; Cohen-Macaulay; minimal resolution conjecture Ballico, E., Geramita, A.V.: The minimal free resolution of the ideal of s general points in \(\(\mathbb {P}^3\)\). In: Proceedings of the 1984 Vancouver Conference in Algebraic Geometry, pp. 1-10. CMS Conference Proceeding, vol. 6. American Mathematical Society, Providence (1986) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Ulrich modules; special Cohen-Macaulay modules; McKay correspondence; cyclic quotient surface singularities | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Cohen-Macaulay modules over curve singularities; Gorenstein modules; deformation theory; complete intersection; hypersurface singularity; singular; signature pairing; Euler numbers; Betti numbers; Jacobians | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) finite CM-representation; maximal Cohen-Macaulay modules; hypersurface singularity; Auslander-Reiten-sequences Schreyer, Frank-Olaf: Finite and countable CM-representation type. Lecture notes in math. 1273, 9-34 (1987) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Chevalley group; buildings; discrete series representations; homology; simplicial complex; duality; fixed point sheaf; parabolic subgroup; minimal weight modules; roots; apartments Ronan, M.A., Smith, S.D.: Sheaves on buildings and modular representations of Chevalley groups. J. Algebra 96, 319--346 (1985) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) highest weight modules; minimal resolutions; Hilbert series Enright, T.J., Hunziker, M.: Resolutions and Hilbert series of the unitary highest weight modules of the exceptional groups. Representat. Theory 8, 15--51 (2004) (electronic). MR MR2048586 (2004m:17007) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Cohen-Macaulay module; derived category; differential graded module; Gorenstein module; local ring; semidualizing module; Yoneda Ext group Nasseh S., Geometric Aspects of Representation Theory for DG Algebras: Answering a Question of Vasconcelos (2012) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) hypersurface ring; maximal Cohen-Macaulay modules; non-isolated singularity Baciu, C.: Maximal Cohen -- Macaulay modules over the affine cone of the simple node | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) modules of finite length; finite projective dimension; vanishing theorem; Cohen-Macaulay local ring Roberts, P.C., Srinivas, V.: Modules of finite length and finite projective dimension. Invent. Math. 151, 1--27 (2003) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Hilbert function of reduced irreducible arithmetically Cohen-Macaulay curve; linkage; minimal generators; liaison; Hilbert-function of a complete intersection Maggioni, R.; Ragusa, A.: Construction of smooth curves of P3 with assigned Hilbert function and generators' degrees. Le matematiche 42 (1987) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) variety of almost minimal degree; divisor; Betti diagram; low codimension; arithmetically Cohen-Macaulay; Veronese surface Brodmann, M., Schenzel, P.: On varieties of almost minimal degree in small codimension. J.\(\sim\)Algebra. Math. AC/0506279 (2006) (to appear) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) isomorphism classes of finitely generated modules; isomorphism classes of maximal Cohen-Macaulay modules; isolated singularity; Grassmannian variety Popescu, D.: Maximal Cohen--Macaulay modules over isolated singularities. J. algebra 178, 710-732 (1995) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) integrable connections; simple singularity; threefold; maximal Cohen-Macaulay modules; canonical module Eriksen, Eivind; Gustavsen, Trond Stølen: Connections on modules over singularities of finite CM representation type, J. pure appl. Algebra 212, No. 7, 1561-1574 (2008) | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) free resolutions; virtual resolutions; chain complexes; toric varieties; Fitting ideals; saturations; irrelevant ideal | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Gorenstein graded algebra; Hilbert scheme; deformation; parametrization; Cohen-Macaulay module Kleppe J.\ O., Unobstructedness and dimension of families of Gorenstein algebras, Collect. Math. 58 (2007), 199-238. | 0 |
Cohen-Macaulay modules; graded minimal free resolutions; simplicial complexes; chessboard complexes; matching complexes Reiner V., Roberts J.: Minimal resolutions and the homology of matching and chessboard complexes. J. Algebraic Combin. 11(2), 135--154 (2000) Betti numbers; Gorenstein ring; Koszul duality; maximal Cohen-Macaulay modules | 0 |
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