The essential norms of Toeplitz operators with symbols in C+H∞ on weighted Hardy spaces are independent of the weights

Abstract

Let 1<p<∞, let Hp be the Hardy space on the unit circle, and let Hp(w) be the Hardy space with a Muckenhoupt weight w∈ Ap on the unit circle. In 1988, B\"ottcher, Krupnik and Silbermann proved that the essential norm of the Toeplitz operator T(a) with a∈ C on the weighted Hardy space H2() with a power weight ∈ A2 is equal to \|a\|L∞. This implies that the essential norm of T(a) on H2() does not depend on . We extend this result and show that if a∈ C+H∞, then, for 1<p<∞, the essential norms of the Toeplitz operator T(a) on Hp and on Hp(w) are the same for all w∈ Ap. In particular, if w∈ A2, then the essential norm of the Toeplitz operator T(a) with a∈ C+H∞ on the weighted Hardy space H2(w) is equal to \|a\|L∞.