Noncommutative Abel-like identities

Abstract

We generalize the Abel--Hurwitz identities to an almost entirely noncommutative setting. Namely, let V be a finite set of size n, and let L be any noncommutative ring. For each s∈ V, let xs∈L. Set x( S) :=Σs∈ Sxs for any S⊂eq V. Let X and Y be two elements of L such that X+Y lies in the center of L. Then, we show that% align* & ΣS⊂eq V( X+x( S) ) S ( Y-x( S) ) n- S =Σi1,i2,…,ik∈ V distinct% ( X+Y) n-kxi1xi2·s xik;\\ & ΣS⊂eq VX( X+x( S) ) S -1( Y-x( S) ) n- S =( X+Y) n;\\ & ΣS⊂eq VX( X+x( S) ) S -1( Y-x( S) ) n- S -1( Y-x( V) ) =( X+Y-x( V) ) ( X+Y) n-1. align* (Negative powers are understood to be cancelled by other factors.)