The Thresholding Greedy Algorithm versus Approximations with Sizes Bounded by Certain Functions f

Abstract

Let X be a Banach space and (en)n=1∞ be a basis. For a function f in a large collection F (closed under composition), we define and characterize f-greedy and f-almost greedy bases. We study relations among these bases as f varies and show that while a basis is not almost greedy, it can be f-greedy for some f∈ F. Furthermore, we prove that for all non-identity function f∈ F, we have the surprising equivalence f-greedy\ \ f-almost greedy. We give various examples of Banach spaces to illustrate our results.