Set-theoretical entropies of weighted generalized shifts

Abstract

In this paper for a finite field F, a nonempty set , a self--map : and a weight vector w∈ F, we show that the set--theoretical entropy of the weighted generalized shift σ,w:F F is either zero or +∞, moreover it is equal to zero if and only if σ,w is quasi--periodic. On the other hand after characterizing all conditions under which σ,w:F F is of finite fibre, we show that the contravariant set--theoretical entropy of a finite fibre σ,w:F F depends only on and supp(w). In final sections we study the restriction of σ,w to the direct sum F.