Density of smooth functions in Musielak-Orlicz spaces

Abstract

We provide necessary and sufficient conditions for the space of smooth functions with compact supports C∞C() to be dense in Musielak-Orlicz spaces L() where is an open subset of Rd. In particular we prove that if satisfies condition 2, the closure of C∞C() L() is equal to L() if and only if the measure of singular points of is equal to zero. This extends the earlier density theorems proved under the assumption of local integrability of , which implies that the measure of the singular points of is zero. As a corollary we obtain analogous results for Musielak-Orlicz spaces generated by double phase functional and we recover the well known result for variable exponent Lebesgue spaces.