Boundary entropy spectra as finite subsums

Abstract

In this paper we provide a concrete construction of Furstenberg entropy values of τ-boundaries of the group Z[1p1,…,1pl] \p1n1·s plnl \, : \, ni∈Z\ by choosing an appropriate random walk τ. We show that the boundary entropy spectrum can be realized as the subsum-set for any given finite sequence of positive numbers.