Characterization of the variable exponent Bessel potential spaces via the Poisson semigroup

Abstract

Under the standard assumptions on the variable exponent p(x) (log- and decay conditions), we give a characterization of the variable exponent Bessel potential space Bα[Lp(·)( Rn)] in terms of the rate of convergence of the Poisson semigroup Pt. We show that the existence of the Riesz fractional derivative D f in the space Lp(·)() is equivalent to the existence of the limit 1(I-P) f. In the pre-limiting case x p(x)<n we show that the Bessel potential space is characterized by the condition \|(I-P) f\|p(·)≤q C ^