On the center conjecture for the cyclotomic KLR algebras

Abstract

The center conjecture for the cyclotomic KLR algebras Rβ asserts that the center of Rβ consists of symmetric elements in its KLR x and e() generators. In this paper we show that this conjecture is equivalent to the injectivity of some natural map β,i from the cocenter of Rβ to the cocenter of Rβ+i for all i∈ I and ∈ P+. We prove that the map β,i is given by multiplication with a center element z(i,β)∈ Rβ+i and we explicitly calculate the element z(i,β) in terms of the KLR x and e() generators. We present an explicit monomial basis for certain bi-weight spaces of the defining ideal of Rβ and of Rβ. For β=Σj=1nαij with αi1,·s, αin pairwise distinct, we construct an explicit monomial basis of Rβ, prove the map β,i is injective and thus verify the center conjecture for these Rβ.