On the Class of Similar Square -1,0,1-Matrices Arising from Vertex maps on Trees

Abstract

Let n 2 be an integer. In this note, we show that the oriented transition matrices over the field R of all real numbers (over the finite field Z2 of two elements respectively) of all continuous vertex maps on all oriented trees with n+1 vertices are similar to one another over R (over Z2 respectively) and have characteristic polynomial Σk=0n xk. Consequently, the unoriented transition matrices over the field Z2 of all continuous vertex maps on all oriented trees with n+1 vertices are similar to one another over Z2 and have characteristic polynomial Σk=0n xk. Therefore, the coefficients of the characteristic polynomials of these unoriented transition matrices, when considered over the field R, are all odd integers (and hence nonzero).