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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. algebraic cycles;Chow groups; motives; Voisin's conjecture; Calabi-Yau varieties of dimension at most 5
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. polarizations; isogenies; Euler characteristics; symplectic representations; \(\ell\)-adic representations; group of inertia type; isogeny classes of abelian varieties Silverberg, A.; Zarhin, Yu.G.: Polarizations on abelian varieties and self-dual \(\ell \)-adic representations of inertia groups. Compositio math. 126, 25-45 (2001)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. rank of tensors; salmon conjecture; secant varieties S. Friedland and E. Gross, \textit{A proof of the set-theoretic version of the salmon conjecture}, J. Algebra, 356 (2012), pp. 374--379.
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; projectively normal; Fano variety
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. unirationality; Fano varieties; geometry of hypersurfaces J. Harris, B. Mazur and R. Pandharipande, ''Hypersurfaces of low degree,'' Duke Math. J. 95(1), 125--160 (1998).
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. global dimension; rings of global sections; sheaves of twisted differential operators; spectral sequence; flag varieties; enveloping algebras of semisimple Lie algebras; Weyl group DOI: 10.1112/blms/24.2.148
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; affine extensions; Gorenstein local rings Şahin, M, Extensions of toric varieties, Electron. J. Combin., 18, p93, (2011)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. moduli of vector bundles; del Pezzo surfaces; birational geometry; Fano varieties
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. differential geometry; algebraic geometry; toric varieties Katzarkov, L., Lupercio, E., Meersseman, L., Verjovsky, A.: The definition of a non-commutative toric variety. In: Tillmann, U., Galatius, S., Sinha, D. (eds.) Algebraic Topology: Applications and New Directions. Contemporary Mathematics, vol. 620. AMS pp. 223-250 (2014)
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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. group of automorphisms; flexible varieties: extension problem
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. integrable highest weight modules; construction of enveloping algebra; Kac-Moody algebras; quiver varieties; Hecke correspondences H. Nakajima, ``Quiver varieties and Kac-Moody algebras'', Duke Math. J.91 (1998) no. 3, p. 515-560
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. metrized vector bundles; compactified representations; height of the flag varieties; heights on the projective space; height on the moduli space of vector bundles over an algebraic curve Gasbarri, C., Heights and geometric invariant theory, Forum Mathematicum, 12, 135-153, (2000)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. \(z\)-divisible local Anderson modules; Drinfeld modules; \(A\)-motives; Drinfeld modular varieties; tensor constructions; multilinear theory of Drinfeld displays
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. semisimple symmetric spaces of Chevalley groups; semisimple algebraic group; non-Riemannian symmetric space; Eisenstein series; functional equations; zeta functions for prehomogeneous vector spaces F. SATO, Eisenstein series on semisimple symmetric spaces of Chevalley groups, Advanced Studie in Pure Math. 7, Automorphic Forms and Number Theory, (I. Satake, ed.), Kinokuniya, Tokyo, 1985, 295-332.
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Young diagrams; intersection numbers; toric varieties; structure constants Abe, H., Young diagrams and intersection numbers for toric manifolds associated with Weyl chambers, Electron. J. Combin., 22, 24, (2015)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. resolutions; minimal contraction of a ruled surface; index of non-rational numerical Del Pezzo surfaces; Moishezon surface Fujisawa T.: On non-rational numerical del Pezzo surfaces. Osaka J. Math. 32, 613--636 (1995)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. crepant resolutions; Fujiki-Oka resolutions; higher dimension; finite groups; abelian groups; Hirzebruch-Jung continued fractions; invariant theory; multidimensional continued fractions; quotient singularities; toric varieties
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. dg categories of relative singularities; matrix factorizations; non commutative algebraic geometry
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. homotopy theory; motives; quadratic forms; homtopy groups of spheres
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; Hirzebruch surface; error-corecting codes Hansen J.P.: Toric variety, Hirzebruch surfaces and error-correcting codes. Appl. Algebra Eng. Commun. Comput. 13(4), 293--300 (2002)
| 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; toric variety; toric morphism; transversality Tevelev, J.: On a question of B. Teissier. Collect. math. 65, No. 1, 61-66 (2014)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Kummer hyperelliptic varieties; matrix variety; rationality; Jacobians of hyperelliptic curves
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Langlands conjecture on zeta functions of Shimura varieties; fixed points of twisted Hecke correspondences; Honda-Tate theory for abelian varieties with endomorphisms R.\ E. Kottwitz, Points on some Shimura varieties over finite fields, J. Amer. Math. Soc. 5 (1992), no. 2, 373-444.
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. group actions; locally trivial action on a factorial variety; non-finitely generated ring of invariants Deveney J. K., Transformation Groups 2 pp 137-- (1997)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. varieties over a local field; Néron models; arithmetical graphs; discrete valuation ring; Jacobian; abelian variety; group of components Lorenzini, D., Reduction of points in the group of components of the Néron model of a Jacobian, J. Reine Angew. Math., 527, 117-150, (2000)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Diophantine sets; recursively enumerable sets; Arithmetic of algebraic varieties; Diophantine problems; Tate conjecture; isogenies of abelian varieties; Zeta-functions; L-functions; automorphic forms; automorphic representations; arithmetic scheme; Weil conjecture; modular forms; Galois representations
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. manifold of class \({\mathcal C}\); toric variety; Fano variety Hwang, A., Mabuchi, T.: A conjecture on the group of biholomorphisms of a nonsingular Fano variety. Int. J. Math. (to appear).
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. automorphic vector bundles; automorphic forms on Shimura varieties; rationality of the Fourier-Jacobi coefficients M. Harris, Arithmetic Vector Bundles and Automorphic Forms on Shimura Varieties II, Comp. Math.60 (1986), 323--378.
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. families of varieties; log canonical varieties; Shafarevich's conjecture
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. algebraic cycles; Bloch-Beilinson filtration; hyperkähler varieties; non-symplectic involution; splitting property; Calabi-Yau varieties Laterveer, R., On the Chow groups of some hyperkähler fourfolds with a non-symplectic involution, \textit{Int. J. Math.}, 28, 3, 1-19, (2017)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Normal surface singularity; Lipman semigroup; Hilbert basis of a semigroup; toric variety; intersection matrix.
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Ulrich bundles; Frobenius split varieties; abelian varieties; \(K3\) surfaces; surfaces of general type; threefolds; Fano varieties
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. metaplectic groups; algebraic theory of theta functions; representations of Heisenberg groups; sections of line bundles on complex abelian varieties; isogenies; tower of an abelian variety; theta relations; homogeneous coordinate ring of an abelian variety D. Mumford, \textit{Tata lectures on theta} (1988).
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. locally tame; non-degenerate; toric multiplicity condition
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. valued function fields; genus change; algebraic function field; reduction of constants; rigid analytic geometry; non-discrete valuation
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. non-degenerate complete intersection; full complete intersection; toric compactification Oka, M.: On the topology of full nondegenerate complete intersection variety. Nagoya Math. J. 121, 137--148 (1991)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. group actions on varieties and schemes; actions of groups on commutative rings; invariant theory; automorphisms of surfaces and higher-dimensional varieties 10.1090/mcom/3185
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Dynkin graphs; minimal resolution of a normal quartic surface; classification of singularities of plane sextics; classification of singular quartic surfaces Urabe, T.: Singularities in a certain class of quartic surfaces and sextic curves and Dynkin graphs. Proc. 1984 Vancouver Conf. Alg. Geom., CMS Conf. Proc.6, 477-497 (1986)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. positivity of vector bundles; algebraicity criterion of formal varieties Chen, H., \textit{algebraicity of formal varieties and positivity of vector bundles}, Math. Ann., 354, 171-192, (2012)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Hilbert schemes of points; quiver varieties; HIrzebruch surfaces; ADHM data; monads; Nakajima quivers; McKay quivers; quiver varieties, moduli spaces of quiver representations Bartocci, C.; Bruzzo, U.; Lanza, V.; Rava, C.L.S., Hilbert schemes of points of \(\mathcal{O}_{\mathbb{P}^1}(- n)\) as quiver varieties, J. pure appl. algebra, 221, 2132-2155, (2017)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Weyl groups; Coxeter groups; representations of Hecke algebras; Jordan-Hölder series of Verma modules; irreducible highest weight modules; Weyl character formula; primitive ideals in enveloping algebras; complex semisimple Lie algebras; local Poincaré duality; geometry of Schubert cells; flag varieties; intersection cohomology; Laurent polynomials; intertwining operators; finite Chevalley groups; affine Weyl groups; cohomology groups; simple reflections; highest weight representations; Cartan subalgebras D. Kazhdan and G. Lusztig, Representations of Coxeter groups and Hecke algebras, \textit{Invent.} \textit{Math.}, 53 (1979), no. 2, 165--184.Zbl 0499.20035 MR 560412
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Hilbert function; projective varieties of low degree Park, Euisung: On hypersurfaces containing projective varieties, Forum math. (2013)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. filiform Lie algebras; graded Lie algebras; projective varieties; topology; classification Barron, T.; Kerner, D.; Tvalavadze, M., On varieties of Lie algebras of maximal class, Canad J Math, 67, 55-89, (2015)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. dimension; conjugacy class of a matrix; rank variety; rank function; partition of a non-negative integer
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. rationally connected threefolds; bounded families; projecture threefolds; varieties of small codimension
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. stacks; toric varieties; good moduli spaces Geraschenko A. Satriano M. , 'A ''bottom up'' characterization of smooth Deligne--Mumford stacks', Preprint, 2015, http://arxiv.org/abs/1503.05478 .
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. real fields; sums of squares; topology of real algebraic varieties; Tarski-Seidenberg algorithm
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Poincaré polynomials of degenerate flag varieties Feigin, E, The Median Genocchi numbers, \(q\)-analogues and continued fractions, Eur. J. Comb., 33, 1913-1918, (2012)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. varieties; finite fields; small solutions of congruences; systems of forms; points in boxes M. Fujiwara,Distribution of rational points on varieties over finite fields, Mathematika35 (1988), 155--171.
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. finite field; family of varieties; monodromy; quadratic excess; genus-\(g\)-curves; degree-\(d\) hypersurfaces; geometric monodromy group; Frobenius-Schur indicator; family of higher-dimensional varieties; Deligne equidistribution theorem Katz, N.: Frobenius-Schur indicator and the ubiquity of Brock-Granville quadratic excess. Finite Fields Appl. \textbf{7}(1), 45-69 (2001). (Dedicated to Professor Chao Ko on the occasion of his 90th birthday)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. moduli space of rank \(r\) stable vector bundles; Grassmannian; flag varieties Ballico, E.; Ramella, L., The restricted tangent bundle of smooth curves in grassmanians and curves in flag varieties, Rocky Mountain J. Math., 30, 1207-1227, (2000)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. higher Hasse-Witt matrices; formal group laws; length of a jump; sequence for abelian varieties; unit root crystal; hyperelliptic; curves Ditters, E.J.: On the classification of commutative formal group laws overp-Hilbert domains and a finiteness theorem for higher Hasse-Witt matrices. Math. Z.202, 83--109 (1989)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; deformations; Minkowski sums Ilten, N.; Vollmert, R., Deformations of rational \(T\)-varieties, J. Algebraic Geom., 21, 531-562, (2012)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. total positivity; varieties of Borel subgroups; reductive linear algebraic groups; Weyl groups; flag varieties; real algebraic morphisms K. Rietsch, An algebraic cell decomposition of the nonnegative part of a ag variety, J. Algebra 213 (1999), 144--154.
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. embedded Nash problem; resolution of singularities; toric geometry
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. family of abelian varieties; large Mordell-Weil rank; elliptic curve F. Hazama, The Mordell-Weil group of certain abelian varieties defined over the rational function field,Tohoku Math. J. 44 (1992), 335--344.
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. non-normal quartic surface; classification Mukai, S.: On the moduli space of bundles on \(K3\) surfaces. I. In: Vector Bundles on Algebraic Varieties (Bombay, 1984), Tata Institute of Fundamental Research Studies in Mathematics, vol. 11, pp. 341-413. Tata Institute of Fundamental Research, Bombay (1987).
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. infinite field; variety of algebras; category of algebraic sets; category of algebraic varieties B. Plotkin, Ukr. Math. J. 54(6), 1019 (2002).
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Galois group; resolution of singularities; local fundamental groups of algebraic varieties Abhyankar S S, Local fundamental groups of algebraic varieties,Proc. Am. Math. Soc. 125 (1997) 1635--1641
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. number of components of Hilbert scheme; non-general-type surfaces; initial ideals; codimension-two subvariety Braun, R; Floystad, G, A bound for the degree of smooth surfaces in \({\mathbb{P}}^4\) not of general type, Compositio Math., 93, 211-229, (1994)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. homogeneous cover; ring of regular functions; simply connected semisimple complex Lie group; Lie algebra; nilpotent adjoint \(G\)-orbit; Poisson structure; semisimple Lie algebra; Heisenberg Lie algebra; minimal nilpotent orbit; flag varieties; group of holomorphic automorphisms R. Brylinski and B. Kostant, \textit{Nilpotent orbits, normality, and Hamiltonian group actions}, \textit{J. Am. Math. Soc.}\textbf{7} (1994) 269 [math/9204227].
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. finiteness of group of automorphisms; non-ruled algebraic surface; minimal model Jelonek, Z, The group of automorphisms of an affine non-uniruled surface, Univ. Iaegel. Acta Math., 32, 65-68, (1995)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. holomorphic disks; tropical curves; toric varieties; Gromov-Witten invariants; Lagrangian torus; pseudoholomorphic curves Nishinou, T.: Disc counting on toric varieties via tropical curves. Am. J. Math. \textbf{134}(6), 1423-1472 (2012)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. moving Seshadri constants; varieties of maximal Albanese dimension; separation of \(k\)-jets
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. families of canonically polarized manifolds; varieties of general type; Shafarevich's conjecture; Viehweg's conjecture; log Fano varieties Lohmann, D.: Families of canonically polarized manifolds over log Fano varieties (2011). arXiv:1107.4545v1
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. monodromy; families of algebraic varieties; moduli
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. symmetric power of a smooth projective curve; naive Grothendieck ring of varieties
| 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 of degree 7 and genus 4
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. classification of spherical subgroups Luna, D., Grosses cellules pour LES variétés sphériques, (Lehrer, G. I., Algebraic Groups and Lie Groups, Australian Math. Soc. Lecture Series, vol. 9, (1997)), 267-280
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Betti numbers; real algebraic set; semialgebraic set; topological classification of connected components
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. cyclic covering; Fano manifolds; varieties of minimal rational tangents
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. integrable systems; Jacobian varieties; integration of ellipsoidal billiards; Abel-Jacobi mapping; Euler top; asymptotic geodesic motion; ellipsoidal layer; theta-functions; KdV equation; solitons [InlineMediaObject not available: see fulltext.]\textbf{65}(2), 133-194 (2010) (Russian). English translation: Dragović, V., Radnović, M.: Integrable billiards and quadrics. \textit{Russ. Math. Surv}., \textbf{65}(2), 319-379 (2010)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. factorial ring of automorphic forms; Satake compactification; Picard group; theta constant; Schottky invariant; Mumford's conjecture; second Betti number; moduli space of non-hyperelliptic curves S. Tsuyumine: Factorial property of a ring of automorphic forms. Trans. Amer. Math. Soc. (to appear). JSTOR:
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. moduli space of complete smooth curves; principally polarized abelian varieties; Torelli theorem; Schottky problem; Kummer surface of the Jacobian; theta constants; K-P equation
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Mots; words; trees; permutations; toric variety; Weyl chambers; semigroups; Lie algebra; Burnside problem for semigroups; symmetric group; skew tableaux; hypermaps; combinatorial theory; representations; continued fractions; differential algebra; probability measures; grammars of zigzags; complexity; finite automaton M. Lothaire , Mots . Hermès Paris 1990 . MR 1252659 | Zbl 0862.05001
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. period matrices; moduli space of polarized abelian surfaces; bielliptic abelian surfaces; non-trivial involution; Humbert surfaces; ampleness of polarization Hulek, K., Weintraub, S.H.: Bielliptic abelian surfaces. Math. Ann. 283, 411--429 (1989)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. rationality of algebraic varieties; Grothendieck ring of varieties; motivic nearby fiber
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Bloch-Beilinson filtration; Chow group of zero-cycles; abelian varieties; (co)niveau filtration
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. reductive algebraic group schemes; tilting modules; good filtrations; support varieties; cells of affine Weyl groups; nilpotent orbits Cooper, B. J., On the support varieties of tilting modules, J. Pure Appl. Algebra, 214, 1907-1921, (2010)
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; lattice polytopes; dual varieties C. Casagrande and S. Di Rocco, \textit{Projective \(\mathbb{Q}\)-factorial toric varieties covered by lines}, Commun. Contemp. Math., 10 (2008), pp. 363--389, .
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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. positive polynomials; sums of non-negative circuit polynomials; arithmetic-geometric exponentials; dual cone; \(\mathcal{S}\)-cone; second-order cone
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. Schottky problem; moduli space of principally polarized abelian varieties; Prym varieties; Kummer variety A. Beauville and O. Debarre, Sur le problème de Schottky pour les variétés de Prym, Ann. Scuola Norm. Sup. Pisa Cl. Sci. (4) 14 (1987), no. 4, 613 -- 623 (1988) (French).
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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. polar varieties; equidimensional varieties; singularities; stratifications; Whitney stratifications; Whitney conditions; tubular neighborhoods; tangent cones; limits of tangent spaces; conormal spaces; projective duality, multiplicity; Nash modifications; Plücker-type formulas; Todd's formulas; characteristic classes; Chern classes
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. toric varieties; Hodge numbers; algebraic threefold; semiample hypersurfaces; Jacobi ring Mavlyutov A.: Semiample hypersurfaces in toric varieties. Duke Math. J. 101, 85--116 (2000)
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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. generalized Kummer varieties; Chow group of zero-cycles; Bloch-Beilinson filtration; Beauville conjecture; constant cycle subvarieties
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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. \(K\)-theory; zeta function; \(K\)-theory of varieties; Grothendieck group of varieties; motivic measure
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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. action of parabolic subgroups; connected reductive algebraic group; algebraic groups with involutions; symmetric varieties; Cartan involution; real reductive groups; orbits of symmetric varieties A. G. Helminck, On groups with a Cartan involution, Proceedings of the Hyderabad Conference on Algebraic Groups (Hyderabad, 1989) Manoj Prakashan, Madras, 1991, pp. 151 -- 192.
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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. Albanese varieties; irregularity of cyclic coverings of surfaces; JFM 35.0423.01; JFM 36.0491.01; JFM 39.0698.03; JFM 42.0448.01; Albanese dimension F. Catanese and C. Ciliberto, ''On the irregularity of cyclic coverings of algebraic surfaces,'' in Geometry of Complex Projective Varieties, Rende: Mediterranean, 1993, vol. 9, pp. 89-115.
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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. plane curve singularities; non-isolated singularity; topological series; topological types of isolated singularities; links; Milnor fibration Schrauwen ( R. ). - Topological series of isolated plane curves singularities , l'Enseignement Mathématique ( 36 ) ( 1990 ), 115 - 141 . MR 1071417 | Zbl 0708.57011
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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. motivic stable homotopy theory; stable homotopy groups of spheres; Adams-Novikov spectral sequence
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. homotopy limit; homotopy colimit; closed model category; toric varieties; spectral sequences T Hüttemann, Total cofibres of diagrams of spectra, New York J. Math. 11 (2005) 333
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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. lattice polytopes; Ehrhart polynomial; polytope ring; toric varieties; Todd classes; \(K\)-theory Brion, M.: Points entiers dans LES polytopes convexes. Astérisque, 145-169 (1995)
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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. free abelian cover; hypersurface complement; hyperplane arrangements; non-isolated singularities; Alexander varieties; characteristic varieties; Dwyer-Fried sets; resonance varieties
| 0 |
non-starshaped spheres; classification of toric varieties G. Ewald and C. Schulz: Nonstarshaped spheres , Arch. Math. (Basel) 59 (1992), 412-416. transcendence methods; lower bounds for cardinality of Galois; orbits; Baker method; Schneider method; abelian varieties; zero; estimates D. Bertrand : Galois orbits on abelian varieties and zero estimates . London Math. Soc. Lecture Note Series 109 (Proc. Australian Math. Soc. Convention, 1985), Cambridge Univ. Press (1986) pp. 21-35.
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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. arithmetic varieties; Hironaka; resolution of singularities; blowing up; local uniformization V. Cossart, O. Piltant, Resolution of Singularities of Arithmetical Threefolds II. ArXiv e-prints, Dec. 2014.
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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. toric variety; Stone-Weierstrass theorem; spaces of toric morphisms; simplicial resolution J. Mostovoy and E. Munguia-Villanueva, Spaces of morphisms from a projective space to a toric variety, preprint, arXiv: arXiv: arXiv:1210.2795
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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. log Calabi-Yau pair; geography of threefolds; projective varieties
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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. classification of isolated hypersurface singularities; coarse moduli space; Milnor number; Tjurina number; Tjurina algebra Greuel, G. -M.; Hertling, C.; Pfister, G.: Moduli spaces of semiquasihomogeneous singularities with fixed principal part, J. algebraic geom. 6, 169-199 (1997)
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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. topological invariants of algebraic varieties; homology groups; fundamental groups; Alexander polynomials; Hodge structures; Whitney stratifications; plane curve and normal surface singularities; Milnor fibration; lattice for an isolated hypersurface singularity; integral bilinear forms; weighted projective varieties; mixed Hodge structures; hypersurface complements; cohomology of complete intersections A. Dimca, ''Singularities and Topology of Hypersurfaces'', Universitext, Springer-Verlag, New York, 1992. DOI: 10.1007/978-1-4612-4404-2
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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. coherent sheaves; finite length modules; Grothendieck ring of varieties; Hilbert scheme of points; torus actions
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