Boundary multipliers of a family of M\"obius invariant function spaces

Abstract

For 1<p<∞ and 0<s<1, let Qp s (T) be the space of those functions f which belong to Lp(T) and satisfy \[ I⊂ T1|I|s∫I∫I|f(ζ)-f(η)|p|ζ-η|2-s|dζ||dη|<∞, \] where |I| is the length of an arc I of the unit circle T . In this paper, we give a complete description of multipliers between Qp s (T) spaces. The spectra of multiplication operators on Qp s (T) are also obtained.