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
The cohomology theory for commutative monoids developed by P. A. Grillet is a case of a graded form ...
The goal of this article is to construct families of complete toric varieties over arbitrary bases, ...
Toric varieties are varieties equipped with a torus action and constructed from cones and fans. In t...
AbstractWe compute the André–Quillen (or Harrison) cohomology of an affine toric variety. The best r...
AbstractWe show that the André–Quillen cohomology of an E∞ simplicial algebra with arbitrary coeffic...
Let R be a reduced root system in a finite dimensional vector space V, N the associated weight latti...
Mu-Wan Huang, Mark Walker and I established an explicit formula for the equivariant K-groups of affi...
57 pagesIn this paper we study general hyperplane sections of adjoint and coadjoint varieties. We sh...
For an affine toric variety $\spec(A)$ we give a convex geometric description of the Hodge decomposi...
AbstractWe use the equivariant cohomology of hyperplane complements and their toral counterparts to ...
AbstractFollowing a construction of Stanley we consider toric face rings associated to rational poin...
Given a field F of arbitrary characteristic and an algebraic torus T/F we calculate degree 2 and 3 c...
Extending Eilenberg–Mac Lane’s cohomology of abelian groups, a cohomology theory is introduced for c...
AbstractWe define topological André–Quillen cohomology of commutative S-algebras and construct a spe...
AbstractLet k be an arbitrary field and Γ a toric set in the affine space Akn given parametrically b...
The cohomology theory for commutative monoids developed by P. A. Grillet is a case of a graded form ...
The goal of this article is to construct families of complete toric varieties over arbitrary bases, ...
Toric varieties are varieties equipped with a torus action and constructed from cones and fans. In t...
AbstractWe compute the André–Quillen (or Harrison) cohomology of an affine toric variety. The best r...
AbstractWe show that the André–Quillen cohomology of an E∞ simplicial algebra with arbitrary coeffic...
Let R be a reduced root system in a finite dimensional vector space V, N the associated weight latti...
Mu-Wan Huang, Mark Walker and I established an explicit formula for the equivariant K-groups of affi...
57 pagesIn this paper we study general hyperplane sections of adjoint and coadjoint varieties. We sh...
For an affine toric variety $\spec(A)$ we give a convex geometric description of the Hodge decomposi...
AbstractWe use the equivariant cohomology of hyperplane complements and their toral counterparts to ...
AbstractFollowing a construction of Stanley we consider toric face rings associated to rational poin...
Given a field F of arbitrary characteristic and an algebraic torus T/F we calculate degree 2 and 3 c...
Extending Eilenberg–Mac Lane’s cohomology of abelian groups, a cohomology theory is introduced for c...
AbstractWe define topological André–Quillen cohomology of commutative S-algebras and construct a spe...
AbstractLet k be an arbitrary field and Γ a toric set in the affine space Akn given parametrically b...
The cohomology theory for commutative monoids developed by P. A. Grillet is a case of a graded form ...
The goal of this article is to construct families of complete toric varieties over arbitrary bases, ...
Toric varieties are varieties equipped with a torus action and constructed from cones and fans. In t...
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