Subspace-diskcyclic sequences of linear operators

Abstract

A sequence \Tn\n=1∞ of bounded linear operators between separable Banach spaces X, Y is called diskcyclic if there exists a vector x∈ X such that the disk-scaled orbit \α Tn x: n∈ N, α ∈C, | α | ≤ 1\ is dense in Y. In the first section of this paper we study some conditions that imply the diskcyclicity of \Tn\n=1∞. In particular, a sequence \Tn\n=1∞ of bounded linear operators on separable infinite dimensional Hilbert space H is called subspace-diskcyclic with respect to the closed subspace M⊂eq H, if there exists a vector x∈ H such that the disk-scaled orbit \α Tn x: n∈ N, α ∈C, | α | ≤ 1\ M is dense in M. In the second section we survey some conditions and subspace-diskcyclicity criterion (analogue the results obtained by the some mathematicians in MR2261697, MR2720700, MR1111569) which are sufficient for the sequence \Tn\n=1∞ to be subspace-diskcyclic.