Independence numbers of Johnson-type graphs

Abstract

We consider a family of distance graphs in Rn and find its independent numbers in some cases. Define graph J(n,k,t) in the following way: the vertex set consists of all vectors from \-1,0,1\n with k nonzero coordinates; edges connect the pairs of vertices with scalar product t. We find the independence number of J(n,k,t) for n > n0 (k,t) in the cases t = 0 and t = -1; these cases for k = 3 are solved completely. Also the independence number is found for negative odd t and n > n0 (k,t).