Power Set of Some Quasinilpotent Weighted shifts on lp

Abstract

For a quasinilpotent operator T on a Banach space X, Douglas and Yang defined kx=z→ 0\|(z-T)-1x\|\|(z-T)-1\| for each nonzero vector x∈ X, and call (T)=\kx: x 0\ the power set of T. They proved that the power set have a close link with T's lattice of hyperinvariant subspaces. This paper computes the power set of quasinilpotent weighted shifts on lp for 1≤ p< ∞. We obtain the following results: (1) If T is an injective quasinilpotent forward unilateral weighted shift on lp(N), then (T)=\1\ when ke0=1, where \en\n=0∞ be the canonical basis for lp(N); (2) There is a class of backward unilateral weighted shifts on lp(N) whose power set is [0,1]; (3) There exists a bilateral weighted shift on lp(Z) with power set [12,1].