Entropy numbers in γ-Banach spaces

Abstract

Let X be a quasi-Banach space, Y a γ-Banach space (0<γ ≤ 1) and T a bounded linear operator from X into Y. In this paper, we prove that the first outer entropy number of T lies between 21-1/γ\|T\| and \|T\|; more precisely, 21-1/γ\|T\| ≤ e1(T) ≤ \|T\|, and the constant 21-1/γ is sharp. Moreover, we show that there exist a Banach space X0, a γ-Banach space Y0 and a bounded linear operator T0:X0 → Y0 such that 0 ≠ ek(T0) = 21-1/γ\|T0\| for all positive integers k. Finally, the paper also provides two-sided estimates for entropy numbers of embeddings between finite dimensional symmetric γ-Banach spaces.