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Cohomology classes of conormal bundles of Schubert varieties and Yangian weight functions

We consider the conormal bundle of a Schubert variety $S_I$ in the cotangent bundle $T^* Gr$ of the Grassmannian $Gr$ of $k$-planes in $C^n$. This conormal bundle has a fundamental class ${κ_I}$ in the equivariant cohomology $H^*_{T}(T^* Gr)$. Here $T=(C^*)^n\times C^*$. The torus $(C^*)^n$ acts on $T^* Gr$ in the standard way and the last factor $C^*$ acts by multiplication on fibers of the bundle. We express this fundamental class as a sum $Y_I$ of the Yangian $Y(gl_2)$ weight functions $(W_J)_J$. We describe a relation of $Y_I$ with the double Schur polynomial $[S_I]$. A modified version of the $κ_I$ classes, named $κ'_I$, satisfy an orthogonality relation with respect to an inner product induced by integration on the non-compact manifold $T^* Gr$. This orthogonality is analogous to the well known orthogonality satisfied by the classes of Schubert varieties with respect to integration on $Gr$. The classes $(κ'_I)_I$ form a basis in the suitably localized equivariant cohomology $H^*_{T}(T^* Gr)$. This basis depends on the choice of the coordinate flag in $C^n$. We show that the bases corresponding to different coordinate flags are related by the Yangian R-matrix.