Add to ORKGIn this thesis we use Young's raising operators to define and study polynomials which represent the Schubert classes in the equivariant cohomology ring of Grassmannians. For the type A and maximal isotropic Grassmannians, we show that our expressions coincide with the factorial Schur S, P, and Q functions. We define factorial theta polynomials, and conjecture that these represent the Schubert classes in the equivariant cohomology of non-maximal symplectic Grassmannians. We prove that the factorial theta polynomials satisfy the equivariant Chevalley formula, and that they agree with the type C double Schubert polynomials of [IMN] in some cases
Abstract. We describe the torus-equivariant cohomology ring of isotropic Grassman-nians by using a l...
AbstractWe give a description of equivariant cohomology of grassmannians that places the theory into...
Let X be an orthogonal Grassmannian parametrizing isotropic subspaces in an even dimensional vector ...
In this thesis we use Young’s raising operators to define and study polyno-mials which represent the...
Let $X$ be a symplectic or odd orthogonal Grassmannian. We prove a Giambelli formula which expresses...
Let V be an n-dimensional complex vector space and Gd,n the Grassmannian of d-dimensional linear sub...
Regular semisimple Hessenberg varieties are a family of subvarieties of the flag variety that arise ...
Let $X$ be a symplectic or odd orthogonal Grassmannian. We prove a Giambelli formula which expresses...
Let X be an orthogonal Grassmannian parametrizing isotropic subspaces in an even dimensional vector ...
International audienceWe prove an explicit closed formula, written as a sum of Pfaffians, whic...
Let X be a symplectic or odd orthogonal Grassmannian which parametrizes isotropic subspaces in a vec...
A central result in algebraic combinatorics is the Littlewood-Richardson rule that governs products ...
Let X be a symplectic or odd orthogonal Grassmannian which parametrizes isotropic subspaces in a vec...
Peterson varieties are a special class of Hessenberg varieties that have been extensively studied e....
Abstract. We find presentations by generators and relations for the equivariant quantum cohomology o...
Abstract. We describe the torus-equivariant cohomology ring of isotropic Grassman-nians by using a l...
AbstractWe give a description of equivariant cohomology of grassmannians that places the theory into...
Let X be an orthogonal Grassmannian parametrizing isotropic subspaces in an even dimensional vector ...
In this thesis we use Young’s raising operators to define and study polyno-mials which represent the...
Let $X$ be a symplectic or odd orthogonal Grassmannian. We prove a Giambelli formula which expresses...
Let V be an n-dimensional complex vector space and Gd,n the Grassmannian of d-dimensional linear sub...
Regular semisimple Hessenberg varieties are a family of subvarieties of the flag variety that arise ...
Let $X$ be a symplectic or odd orthogonal Grassmannian. We prove a Giambelli formula which expresses...
Let X be an orthogonal Grassmannian parametrizing isotropic subspaces in an even dimensional vector ...
International audienceWe prove an explicit closed formula, written as a sum of Pfaffians, whic...
Let X be a symplectic or odd orthogonal Grassmannian which parametrizes isotropic subspaces in a vec...
A central result in algebraic combinatorics is the Littlewood-Richardson rule that governs products ...
Let X be a symplectic or odd orthogonal Grassmannian which parametrizes isotropic subspaces in a vec...
Peterson varieties are a special class of Hessenberg varieties that have been extensively studied e....
Abstract. We find presentations by generators and relations for the equivariant quantum cohomology o...
Abstract. We describe the torus-equivariant cohomology ring of isotropic Grassman-nians by using a l...
AbstractWe give a description of equivariant cohomology of grassmannians that places the theory into...
Let X be an orthogonal Grassmannian parametrizing isotropic subspaces in an even dimensional vector ...