Lowest positive almost central elements of Uq(sl(1)(n|n)) (n≥ 2), Uq(sl(2)(2n|2n)) (n≥ 2) and Uq(sl(4)(2n+1|2n+1)) (n≥ 1) and their multi-parameter quantum affine superalgebras

Abstract

Let π:sl(n|n) A(n-1,n-1) be the natural epimorphism of Lie superalgebra. Then π=1. Let π(t):sl(t)(n|n) A(t)(n-1,n-1) be the natural epimorphism, where t=1,2,4. Let \ek|k∈Z\ be the basis of π(t) with ek∈ sl(t)(n|n)(atk+bt)δ, where (a1,b1)=(1,0), (a2,b2)=(2,-1) and (a4,b4)=(4,-2). The main result of this paper is to explicitly describe an element of Uq(sl(t)(n|n)) (and its multi-parameter version) corresponding to e1 (i.e., k=1). As for Uq(sl(1)(n|n)) (i.e., t=1), the author had already had explicit description for every k in 1999.