Topologically conjugate classification of diagonal operators

Abstract

Let p, 1≤ p<∞, be the Banach space of absolutely p-th power summable sequences and let πn be the natural projection to the n-th coordinate for n∈N. Let W=\wn\n=1∞ be a bounded sequence of complex numbers. Define the operator DW: p→p by, for any x=(x1,x2,…)∈ p, πn DW(x)=wnxn for all n≥1. We call DW a diagonal operator on p. In this article, we study the topological conjugate classification of the diagonal operators on p. More precisely, we obtained the following results. DW and DW are topologically conjugate, where W=\ wn\n=1∞. If ∈fn wn>1, then DW is topologically conjugate to 2I, where I means the identity operator. Similarly, if ∈fn wn>0 and n wn<1, then DW is topologically conjugate to 12I. In addition, if ∈fn wn=1 and ∈fn tn>1, then DW and DT are not topologically conjugate.