AbstractLet M be an algebraic D-module defined on an affine space X and Y be a linear submanifold of X. We give an algorithm to determine if M is regular specializable along Y, and to find, if so, its regular b-function. (M has a regular b-function by definition if and only if M is regular specializable.) We also prove that the A-hypergeometric system of Gelfand–Kapranov–Zelevinsky is always regular specializable along the origin
This paper is devoted to the comparison ot the notions of regularity for algebraic connections and r...
AbstractWe show that the ideal of an arrangement of d linear subspaces of projective space is d-regu...
AbstractWe describe an algorithm deciding if the annihilating ideal of the meromorphic function 1f, ...
AbstractLet M be an algebraic D-module defined on an affine space X and Y be a linear submanifold of...
"Microlocal Analysis and Singular Perturbation Theory". October 5~9, 2015. edited by Yoshitsugu Take...
International audienceWe study how regularity along a submanifold of a differential or microdifferen...
The concept of (a,b)-module comes from the study the Gauss-Manin lattices of an isolated singularity...
AbstractLet f be an arbitrary polynomial of n variables defined over a field of characteristic zero....
We prove that a holonomic binomial D–module MA(I, β) is regular if and only if certain associated pr...
AbstractWe consider an algebraic D-module M on the affine space, i.e. a system of linear partial dif...
We study the irregularity of hypergeometric D-modules MA(β) via the explicit construction of Gevrey...
Abstract. We study the irregularity sheaves attached to the A-hypergeometric D-module MA(β) introduc...
AbstractLet M be a holonomic D-module on Cn. We give an algorithm to stratify Cn such that on all st...
AbstractIn this paper, we associate with any monogeneous module over the ring D of germs of linear d...
AbstractThe aim of this work is to describe some operations in the category of regular holonomicD-mo...
This paper is devoted to the comparison ot the notions of regularity for algebraic connections and r...
AbstractWe show that the ideal of an arrangement of d linear subspaces of projective space is d-regu...
AbstractWe describe an algorithm deciding if the annihilating ideal of the meromorphic function 1f, ...
AbstractLet M be an algebraic D-module defined on an affine space X and Y be a linear submanifold of...
"Microlocal Analysis and Singular Perturbation Theory". October 5~9, 2015. edited by Yoshitsugu Take...
International audienceWe study how regularity along a submanifold of a differential or microdifferen...
The concept of (a,b)-module comes from the study the Gauss-Manin lattices of an isolated singularity...
AbstractLet f be an arbitrary polynomial of n variables defined over a field of characteristic zero....
We prove that a holonomic binomial D–module MA(I, β) is regular if and only if certain associated pr...
AbstractWe consider an algebraic D-module M on the affine space, i.e. a system of linear partial dif...
We study the irregularity of hypergeometric D-modules MA(β) via the explicit construction of Gevrey...
Abstract. We study the irregularity sheaves attached to the A-hypergeometric D-module MA(β) introduc...
AbstractLet M be a holonomic D-module on Cn. We give an algorithm to stratify Cn such that on all st...
AbstractIn this paper, we associate with any monogeneous module over the ring D of germs of linear d...
AbstractThe aim of this work is to describe some operations in the category of regular holonomicD-mo...
This paper is devoted to the comparison ot the notions of regularity for algebraic connections and r...
AbstractWe show that the ideal of an arrangement of d linear subspaces of projective space is d-regu...
AbstractWe describe an algorithm deciding if the annihilating ideal of the meromorphic function 1f, ...
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