Singular SRB measures for a non 1--1 map of the unit square

Abstract

We consider a map of the unit square which is not 1--1, such as the memory map studied in MwM1. Memory maps are defined as follows: xn+1=Mα(xn-1,xn)=τ (α · xn+(1-α )· xn-1), where τ is a one-dimensional map on I=[0,1] and 0<α <1 determines how much memory is being used. In this paper we let τ to be the symmetric tent map. To study the dynamics of Mα, we consider the two-dimensional map Gα :[xn-1,xn] [xn,τ (α · xn+(1-α )· xn-1)]\, . The map Gα for α∈(0,3/4] was studied in MwM1. In this paper we prove that for α∈(3/4,1) the map Gα admits a singular Sinai-Ruelle-Bowen measure. We do this by applying Rychlik's results for the Lozi map. However, unlike the Lozi map, the maps Gα are not invertible which creates complications that we are able to overcome.