Resonance equals reducibility for \(A\)-hypergeometric systems
From MaRDI portal
Publication:442438
DOI10.2140/ant.2012.6.527zbMath1251.13023arXiv1009.3569OpenAlexW3102875463MaRDI QIDQ442438
Publication date: 10 August 2012
Published in: Algebra \& Number Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1009.3569
Toric varieties, Newton polyhedra, Okounkov bodies (14M25) Other hypergeometric functions and integrals in several variables (33C70) Commutative rings of differential operators and their modules (13N10) Monodromy; relations with differential equations and (D)-modules (complex-analytic aspects) (32S40)
Related Items (18)
Perverse schobers and GKZ systems ⋮ Monodromy of \(A\)-hypergeometric functions ⋮ AN ALGORITHM OF COMPUTING COHOMOLOGY INTERSECTION NUMBER OF HYPERGEOMETRIC INTEGRALS ⋮ Torus equivariant \(D\)-modules and hypergeometric systems ⋮ On Transformations of <i>A</i>-Hypergeometric Functions ⋮ Counting the number of master integrals for sunrise diagrams via the Mellin-Barnes representation ⋮ The structure of a local system associated with a hypergeometric system of rank 9 ⋮ On the rank of an A$A$‐hypergeometric D$D$‐module versus the normalized volume of A$A$ ⋮ Euler-Mellin integrals and \(A\)-hypergeometric functions ⋮ A classification of the irreducible algebraic \(\mathcal A\)-hypergeometric functions associated to planar point configurations ⋮ Monodromies at infinity of confluent \(A\)-hypergeometric functions ⋮ Algebraic aspects of hypergeometric differential equations ⋮ Irreducibility of \(A\)-hypergeometric systems ⋮ Singularities and holonomicity of binomial \(D\)-modules ⋮ Composition series for GKZ-systems ⋮ The singular locus of Lauricella's \(F_C\) ⋮ On irregularities of Fourier transforms of regular holonomic \(\mathcal{D}\)-modules ⋮ On the local monodromy of \(A\)-hypergeometric functions and some monodromy invariant subspaces
This page was built for publication: Resonance equals reducibility for \(A\)-hypergeometric systems
