AbstractWe compute the André–Quillen (or Harrison) cohomology of an affine toric variety. The best results are obtained either in the general case for the first three cohomology groups, or in the case of isolated singularities for all cohomology groups, respectively
From the recent work of Edidin and Satriano, given a good moduli space morphism between a smooth Art...
In the first part, we introduce a new condition, called toric-additivity, on a family of abelian var...
Archimedean cohomology provides a cohomological interpretation for the calculation of the local L-fa...
AbstractWe compute the André–Quillen (or Harrison) cohomology of an affine toric variety. The best r...
The cohomology theory for commutative monoids developed by P. A. Grillet is a case of a graded form ...
AbstractWe show that the André–Quillen cohomology of an E∞ simplicial algebra with arbitrary coeffic...
For an affine toric variety $\spec(A)$ we give a convex geometric description of the Hodge decomposi...
We introduce a simple calculus, extending a variant of the Steenbrink spectrum, for describing Hodge...
AbstractLet k be an arbitrary field and Γ a toric set in the affine space Akn given parametrically b...
AbstractFollowing a construction of Stanley we consider toric face rings associated to rational poin...
AbstractGiven a seminormal affine monoid M we consider several monoid properties of M and their conn...
We give conditions for the Mayer–Vietoris property to hold for the algebraic K-theory of blow-up squ...
AbstractWe use the equivariant cohomology of hyperplane complements and their toral counterparts to ...
We prove that many families of toric ideals stabilize up to symmetry. Our results imply Hillar-Sulli...
The traditional way to study algebraic cycles on an algebraic variety uses the Chow groups. However,...
From the recent work of Edidin and Satriano, given a good moduli space morphism between a smooth Art...
In the first part, we introduce a new condition, called toric-additivity, on a family of abelian var...
Archimedean cohomology provides a cohomological interpretation for the calculation of the local L-fa...
AbstractWe compute the André–Quillen (or Harrison) cohomology of an affine toric variety. The best r...
The cohomology theory for commutative monoids developed by P. A. Grillet is a case of a graded form ...
AbstractWe show that the André–Quillen cohomology of an E∞ simplicial algebra with arbitrary coeffic...
For an affine toric variety $\spec(A)$ we give a convex geometric description of the Hodge decomposi...
We introduce a simple calculus, extending a variant of the Steenbrink spectrum, for describing Hodge...
AbstractLet k be an arbitrary field and Γ a toric set in the affine space Akn given parametrically b...
AbstractFollowing a construction of Stanley we consider toric face rings associated to rational poin...
AbstractGiven a seminormal affine monoid M we consider several monoid properties of M and their conn...
We give conditions for the Mayer–Vietoris property to hold for the algebraic K-theory of blow-up squ...
AbstractWe use the equivariant cohomology of hyperplane complements and their toral counterparts to ...
We prove that many families of toric ideals stabilize up to symmetry. Our results imply Hillar-Sulli...
The traditional way to study algebraic cycles on an algebraic variety uses the Chow groups. However,...
From the recent work of Edidin and Satriano, given a good moduli space morphism between a smooth Art...
In the first part, we introduce a new condition, called toric-additivity, on a family of abelian var...
Archimedean cohomology provides a cohomological interpretation for the calculation of the local L-fa...
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