Density of smooth functions in variable exponent Sobolev spaces

Abstract

We show that if p-≥ 2, then a sufficient condition for the density of smooth functions with compact support, in the variable exponent Sobolev space W1,p(·)( Rn), is that the Riesz potentials of compactly supported functions of Lp(·)( Rn), are also elements of Lp(·)( Rn). Using this result we then prove that the above density holds if (i) p-≥ n or if (ii) 2≤ p-< n and p+<np-n-p-. Moreover our result allows us to give an alternative proof, for the case p-≥ 2, that the local boundedness of the maximal operator and hence local log-H\"older continuity imply the density of smooth functions with compact support, in the variable exponent Sobolev space W1,p(·)( Rn).