Affine Super Yangian and Weyl groupoid

Abstract

We define affine Super Yangian Y(sl(m|n), ) for affine special linear superalgebra sl(m|n) and arbitrary system of simple roots in terms of minimalistic system of generators. We also consider Drinfeld presentation for affine super Yangian in the case of arbitrary simple root system and prove that these two presentations (Drinfeld and minimalistic) of Y(sl(m|n), ) are isomorphic as associative superalgebras. We also construct isomorphism of affine super Yangians Y(sl(m|n), ) and Y(sl(m|n), ') for different simple root systems and '. After them we also define Weyl groupoid as a set of morphisms in category with objects, which are super Yanginas Y(sl(m|n), ), where is simple root system. We describe Weyl groupoid in terms of generators and describe action of these generators on super Yangians. We describe isomorphisms between Y(sl(m|n), ) and Y(sl(m|n), ') as elements of Weyl groupoid.