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non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. projective toric variety; degrees of defining equations; syzygies of toric varieties Briales, E., Campillo, A., Pisón, P.: On the equations defining toric projective varietie... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. higher-dimensional algebraic varieties; birational geometry; birational classification theory; minimal model program; Mori theory; cohomological vanishing theorems; cohomolog... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. noncommutative algebraic geometry; elliptic curves; quotients of Stein varieties; category of coherent sheaves; Rieffel's theorem; non-Archimedean quantum tori Yan Soibelman ... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. adjunction classification of polarized algebra varieties; Del Pezzo variety; 5-folds BELTRAMETTI M. C. and SOMMESE A. J., ''On the adjunction theoretic classification of pola... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. \(L\)-classes of hypersurfaces; Todd classes of toric varieties; homotopy stratified spaces Cappell, Sylvain E.; Shaneson, Julius L.: The mapping cone and cylinder of a strat... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. quotient varieties; quotient singularities; resolution of singularities; toric varieties I. Nakamura, \textit{Hilbert schemes of abelian group orbits}, J. Algebraic Geom. \te... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Bibliography; birational equivalence; classification of higher-dimensional varieties; Kodaira dimension; existence of good minimal models; extremal rays S. Mori , Classificat... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. projectively toric varieties; equations of a toric variety | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. set of isomorphism classes of g-dimensional Abelian varieties is; finite; non-Archimedean places Zarhin, Yu. G., \textit{A finiteness theorem for unpolarized abelian varietie... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. algebraic geometry; Gromov-Witten invariants; toric varieties; moduli spaces of stable (quasi) maps | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Kodaira energy; classification of polarized varieties; Mori theory; growth of the number of rational points ------,On Kodaira energy and classification of polarized varieties... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. rational points of bounded height; Fano variety; toric varieties V.\ V. Batyrev and Y. Tschinkel, Rational points on some Fano cubic bundles, C. R. Acad. Sci. Paris Sér. I Ma... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. pseudonorm project; birational classification; varieties of general type; pluricanonical forms; log canonical threshold; log canonical multiplicity | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. extremal rays; toric varieties; resolution of a normal surface; minimal model Reid, M., Decomposition of toric morphisms, (Arithmetic and geometry, vol. II, Prog. math., vol.... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. characteristic \(p\); conormal cones; classification of non-reflexive curves of low degree DOI: 10.1007/BF02568386 | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. totally non-negative Grassmannians; amalgamation of positroid varieties; M-curves; KP hierarchy; real soliton and finite-gap solutions; positroid cells; planar bicolored netw... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. finiteness of étale morphism; Jacobian conjecture; non-complete algebraic varieties; affine surfaces Miyanishi, M., Étale endomorphisms of algebraic varieties, Osaka J. Math.... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. moduli spaces of supersingular abelian varieties; non-principal genus; flag type quotients; polarized flag type quotient K. Z.LIand F.OORT,\textit{Moduli of Supersingular Abe... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. \({\mathcal A}\)-resultant; sparse systems of polynomials equations; Gröbner bases of toric varieties; Cayley-Koszul complexes Sturmfels B, \textit{Sparse elimination theory,... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; hard Lefschetz properties; spectrum of regular functions and polytopes; mirror theorem; orbifold cohomology; distribution of spectral numbers | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. rational surfaces; fine classification of non-special rational surfaces; quotient of a rational variety F.Catanese - K.Hulek,Rational surfaces in \(\mathbb{P}\)4 containing p... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. varieties of general type; vanishing theorems; volume of a divisor; restricted volume; canonical divisor; multiplier ideals; klt pairs; non-klt locus; fujita's conjecture; au... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. principally polarized abelian variety; theta function; Jacobian varieties of hyperelliptic curves and non-hyperelliptic curves; module over of ring of differential operators ... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. birational geometry of linear algebraic groups; Galois cohomology; Picard group; Brauer group; birational properties of algebraic tori; projective toric varieties; invariants... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. height zeta function; twisted product; toric varieties; flag varieties; rational points of bounded height DOI: 10.4310/MRL.1997.v4.n2.a8 | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; freeness of cohomology groups; McKay correspondence; three-dimensional abelian quotient singularities | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. module varieties; directing modules; tame algebras; toric varieties; isomorphism classes of finite-dimensional left modules; orbits; Cohen-Macaulay varieties; quiver represen... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. mirror pairs; conformal quantum field theory; superstring models; Calabi-Yau manifolds; Calabi-Yau threefolds; bosonic sigma-model; Gepner conjecture; Yukawa couplings; varia... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. geometric quotients of a fan; projective toric varieties; Stanley-Reisner ring; automorphism group Cox, D., The homogeneous coordinate ring of a toric variety, \textit{J. Alg... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. sum of four monomials; Delsarte surface; toric varieties; geometric genus; number of lattice points | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; Fano varieties; equivariant geometry; automorphisms of Fano varieties; minimal model program | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. distributive lattices; Hibi toric varieties; Schubert varieties; minuscule homogeneous varieties; singular loci of Hibi varieties Lakshmibai, V. and Mukherjee, H., Singular l... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. algebraic cycles; Chow groups; motives; Bloch's conjecture; Bloch-Beilinson filtration; hyperkähler varieties; \(K3\) surfaces; Hilbert schemes; non-symplectic involution; mu... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Mori dream space; Cox ring; class group; toric varieties; gale duality; the secondary fan; GKZ decomposition; good and geometric quotient; fan matrix; weight matrix; nef cone... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Cohen-Macaulay rings; CM varieties; \(\Delta\)-genus; classification of polarized varieties | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Bertini's images; Bertini's series; 3-dimensional varieties; 4-dimensional varieties; classification of varieties; degenerate dual variety | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. normal varieties; singularities of pairs; positivity; toric varieties Urbinati, S., Divisorial models of normal varieties, \textit{Proc. Edinburgh Math. Soc.}, 60, 1-12, (201... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. \(f\)-vectors of simplicial polytopes; toric varieties Jorge, H. A.: Smith-type inequalities for a polytope with a solvable group of symmetries. Adv. math 152, 134-158 (2000)... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. biregular classification of algebraic varieties; complexity of group action Timashev, DA, Classification of \(G\)-varieties of complexity 1, Izv. Math., 61, 363-397, (1997) | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. non-finiteness of fundamental group; anti-canonical divisor; classification of surfaces D.-Q. Zhang, Normal algebraic surfaces of anti-Kodaira dimension one or two, Intern. J... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Gaussian maps; classification of projective varieties; characteristic \(p\) Ballico, E., and C. Ciliberto. 1990--1993. On gaussian maps for projective varieties. In Proceedin... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. classification of algebraic varieties | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Kodaira dimension. Bibliography; classification of n-dimensional algebraic varieties; extremal rays; minimal model problem | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. rigid isotopies; classification of non-amphicheiral nonsingular surfaces | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. adjunction; classification of projective varieties BELTRAMETTI M.C., FANIA M.L. and SOMMESE A.J., ''On the projective theoretic classification of projective varieties'', Math... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. non-archimedean valued fields; analytic functions; \(p\)-adic cohomology; Weil conjectures; \(p\)-adic analytic varieties; action of Frobenius; rigid cohomology; \(p\)-adic a... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. classification of the non-singular surfaces of degree 4; Torelli theorem; homological type; isotopic classification V.M. Kharlamov, On the classification of nonsingular surfa... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. equivariant cohomology; localization theorem; equivariantly formal; arrangement of linear subspaces; toric varieties; Schubert varieties; Springer fibers M. Goresky, R. MacPh... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Hodge groups; Hodge cycles; non-simple abelian varieties; \(\ell -adic\) Tate modules of abelian varieties over \(\ell \)-adic local fields Takashi Ichikawa, ''Algebraic grou... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. varieties of codimension 2; adjunction map; irregularity; sectional genus; non-special surfaces [IM] Idá M., Mezzetti E.: Smooth non-special surfaces ofP 4. Man. Math.68, 57-... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Clifford algebras; Euler characteristics; Quadratic fibrations; mirror symmetry; string theory; Calabi-Yau manifolds; nonlinear sigma models; Calabi-Yau manifolds; superstrin... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; Nash blowups; resolution of singularities Atanasov, A.; Lopez, C.; Perry, A.; Proudfoot, N.; Thaddeus, M., Resolving toric varieties with Nash blow-ups, \tex... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; codes over finite fields; varieties of minimal degree Umana, V. Gauthier; Velasco, M.: Dual toric codes and polytopes of degree one. SIAM J. Discrete math. 2... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. almost versal families of modules; finite representation type; finite dimensional algebras; Cohen-Macaulay rings of Krull dimension 1; non-commutative Cohen-Macaulay algebras... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. characteristic classes of singular varieties; Hirzebruch class; equivariant cohomology; toric varieties; Schubert varieties A. Weber, \textit{Equivariant Hirzebruch class for... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. classification of non-rigid families of K3 surfaces; variation of Hodge structure; finiteness theorem of Arakelov type M. H. SAITO AND S. ZUCKER, Classification of non-rigid ... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Fano toric varieties; Calabi-Yau manifolds; deformations of subvarieties | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. rational points of bounded height; Fano variety; toric varieties; number of rational points; Tamagawa number; Brauer group V.\ V. Batyrev and Y. Tschinkel, Manin's conjecture... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. mirror pairs; mirror symmetry; Calabi-Yau models; enumerative geometry of rational curves; quintic threefold; Gromov-Witten invariants; stable maps; duality theory for toric ... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. resolution of singularities; affine toric 3-varieties; dual cone; lattice cone; fan; quotient singularities | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. special values of zeta functions; generalized Dedekind sums; invariants of toric varieties; Todd class Garoufalidis, Values of zeta functions at negative integers, Dedekind s... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. moduli of pairs; Fano varieties; cubic surfaces; geometric invariant theory; classification of singularities | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. higher direct images of dualizing sheaves; degeneration; surjective morphism; Hodge theory; vanishing theorem; classification theory of higher dimensional varieties J. Kollár... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. real projective varieties; degree of non-roughness; stability; semi- algebraic stratification | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Mori's minimal model program; classification of projective n-folds; numerical positivity; canonical bundle; nef; extremal ray; terminal singularities; flips; vanishing; base-... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. rationality; classification of toroidal Fano varieties; toroidal del Pezzo variety; Grassmannians; p\(\equiv 1(mod\,q)\) Voskresenskiĭ, V. E.; Klyachko, A. A.: Toroidal Fano ... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Mori theory; minimal model program; classification of varieties; Fano 3-folds; birational geometry | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. analytic moduli problems; deformation of complex structures; Kodaira-Spencer map; Kuranishi spaces; period mappings; Hodge theory; mixed Hodge structures; Jacobian varieties;... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. finite ground field; classification of isogeny classes; Abelian varieties | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Pfaffian; Calabi-Yau varieties; mirror symmetry; quantum cohomology; Calabi-Yau threefold; non-complete intersection; mirror family; maximal unipotent monodromy; Picard-Fuchs... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. embedding smooth toric varieties; complete intersection; zero locus of finitely many homogeneous monomial equations | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. commutative algebra; algebraic combinatorics; convex polytopes; Cohen- Macaulay rings; algebraic geometry of toric varieties L. J.Billera, Polyhedral theory and commutative a... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. first order infinitesimal deformations of affine toric varieties; threefold Klaus Altmann, Computation of the vector space \?\textonesuperior for affine toric varieties, J. P... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. cohomological classification of Kähler threefold; Del Pezzo surfaces; Fano varieties; linear system T. Fujita, On the structure of polarized manifolds with total deficiency o... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. torus embeddings; convex figures in real affine spaces; complex analytic spaces; holomorphic maps; birational geometry; subdivisions of fans; Integral convex polytopes; toric... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. finitely many non-isomorphic endomorphism rings of d-dimensional abelian varieties; hyperelliptic curves; generalized Weil-Taniyama conjecture; abelian varieties with real mu... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. spinor variety; linear sections; Chow motives; birational transformations; classification of algebraic varieties; Hilbert schemes | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. biholomorphic classification of ruled non-rational smooth complex projective surfaces; hyperplane section Livorni, E. L., \textit{classification of algebraic surfaces with se... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. birational maps; toric varieties; toroidal embeddings; toroidal varieties; weak factorization conjecture; resolution of singularities; birational cobordisms Włodarczyk, J., T... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. moduli of rational curves; Mori dream spaces; toric varieties; weighted projective planes; symbolic Rees algebras; elementary transformations Castravet, Ana-Maria; Tevelev, J... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Tate conjecture; Hodge conjecture; Beilinson-Bloch-Deligne conjectures; special values of L-functions; Shimura varieties; Baily-Borel-Satake compactification; motivic decompo... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. automorphism groups of quasi-affine varieties; quasi-affine spherical varieties; root subgroups; quasi-affine toric varieties | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. projectivity of toric varieties; convex polytopes; Picard group; Picard number KLEINSCHMIDT (P.) , STURMFELS (B.) . - Smooth toric varieties with small Picard number are proj... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. asymptotics of eigensections; toric varieties; plurisubharmonic function A. Huckleberry and H. Sebert, Asymptotics of eigensections on toric varieties, Appendix by Daniel Bar... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. meet-semilattice; resolution of singularities; building set; blowup; arrangement models; toric varieties Feichtner, E. M., \& Kozlov, D. N. (2004). Incidence combinatorics of... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. singularities of the Bergman kernel; pseudoconvex domains of finite type; Newton polyhedra; Szegö kernel; Laplace integral; asymptotic expansion; Fourier analysis; toric vari... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. finitely generated modules; free resolutions; cohomology of a complex of locally free sheaves; cohomology of a four-term complexes; locally free sheaves; normal toric varieti... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. systems of multivariate polynomial equations; Bernstein's Theorem; Kushnirenko's Theorem; A-discriminant; resultant; mixed subdivision; mixed volume; toric varieties; amoeba ... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. algebraic-geometric code; finite fields; toric and cyclic codes; non-split algebraic tori; toric varieties; del Pezzo surfaces; elliptic curves | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric geometric; local heights; Berkovich spaces; Chambert-Loir measure; heights of varieties over finitely generated fields | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. sheaf of non-commutative noetherian algebras; sheaf of algebraic differential operators; generalized flag varieties Hodges T J, Smith S P. Sheaves of non-commutative algebras... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. combinatorial types of complete fans of cones; Betti numbers of smooth complete toric varieties Gretenkort J., Kleinschmidt P., Sturmfels B.: On the existence of certain smoo... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. non-singular curves; gap sequences; toric varieties; trigonal curves Komeda, J, Existence of the primitive weiestrass gap sequences on curve of genus 9, Boll. Soc. Brasil. Ma... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. \(p\)-adic \(L\)-functions; \(p\)-adic heights; global Zeta-module of \(p\)-adic \(L\)-functions; \(p\)-adic Birch and Swinnerton-Dyer formulas; Iwasawa theory of abelian var... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. effectivity; \(l\)-torsion points; non CM elliptic curve; Galois group; field of rationality; periods of abelian varieties; Faltings height; minimal isogeny; Kummer theory Ma... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; number of rational points of bounded height; effective divisors; height zeta function ____, Height zeta functions of toric varieties . J. Math. Sci. 82 ( 199... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Milnor fiber; non-isolated singularity; bouquet of spheres | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. moduli theory of \(p\)-divisible groups; \(p\)-adic groups; characteristic \(p\); Tate modules; Shimura varieties; rigid-analytic period morphisms; non-archimedean uniformiza... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. compactification of \(F\)-theory; elliptic Calabi-Yau threefolds; toric varieties; algorithm P. Candelas, E. Perevalov and G. Rajesh, \textit{Matter from toric geometry}, \te... | 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. non-rational Hilbert modular threefold; defects of cusp singularities; totally real cubic number field; plurigenera of Hilbert modular varieties; arithmetic genus | 0 |
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