The comultiplication of modified quantum affine sln

Abstract

Let U(sln) be the modified quantum affine sln and let U(slN)+ be the positive part of quantum affine slN. Let B(n) be the canonical basis of U(sln) and let B(N)ap be the canonical basis of U(slN)+. It is proved in FS that each structure constant for the multiplication with respect to B(n) coincide with a certain structure constant for the multiplication with respect to B(N)ap for n<N. In this paper we use the theory of affine quantum Schur algebras to prove that the structure constants for the comultiplication with respect to B(n) are determined by the structure constants for the comultiplication with respect to B(N)ap for n<N. In particular, the positivity property for the comultiplication of U(sln) follows from the positivity property for the comultiplication of U(slN)+.