Fusion products, cohomology of GL(N) flag manifolds and Kostka polynomials
Abstract
This paper explains the relation between the fusion product of symmetric power sl(n) evaluation modules, as defined by Feigin and Loktev, and the graded coordinate ring R(mu), which describes the cohomology ring of the flag variety Fl(mu) of GL(N). The graded multiplicity spaces appearing in the decomposition of the fusion product into irreducible sl(n)-modules are identified with the multiplicity spaces of the Specht modules in R(mu). This proves that the Kostka polynomial gives the character of the fusion product in this case. In the case of the product of fundamental evaluation modules, we give the precise correspondence with the reduced wedge product, and thus the usual wedge space construction of irreducible level-1 sl(n)-modules in the limit N->infty. The multiplicity spaces are W(sl(n))-algebra modules in this limit.
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