On the varieties of representations and characters of a family of one-relator subgroups. Their irreducible components

Abstract

Let us consider the group G = < x,y xm = yn> with m and n nonzero integers. In this paper, we study the variety of epresentations R(G) and the character variety X(G) in SL(2,) of the group G,obtaining by elementary methods an explicit primary decomposition of the ideal corresponding to X(G) in the coordinates X=tx, Y=ty and Z=txy. As an easy consequence, a formula for computing the number of irreducible components of X(G) as a function of m and n is given. We provide a combinatorial description of X(G) and we prove that in most cases it is possible to recover (m,n) from the combinatorial structure of X(G). Finally we compute the number of irreducible components of R(G) and study the behavior of the projection t:R(G) X(G).