Strictly singular operators in Tsirelson like spaces

Abstract

For each n ∈ N a Banach space X0,1n is constructed is having the property that every normalized weakly null sequence generates either a c0 or 1 spreading models and every infinite dimensional subspace has weakly null sequences generating both c0 and 1 spreading models. The space X0,1n is also quasiminimal and for every infinite dimensional closed subspace Y of X0,1n, for every S1,S2,…,Sn+1 strictly singular operators on Y, the operator S1S2·s Sn+1 is compact. Moreover, for every subspace Y as above, there exist S1,S2,…,Sn strictly singular operators on Y, such that the operator S1S2·s Sn is non-compact.