Approximation by regular functions in Sobolev spaces arising from doubly elliptic problems

Abstract

The paper deals with a nontrivial density result for Cm() functions, with m∈ N\∞\, in the space Wk,,p(;)= \u∈ Wk,p(): u|∈ W,p()\, endowed with the norm of (u,u|) in Wk,p()× W,p(), where is a bounded open subset of RN, N 2, with boundary of class Cm, k m and 1 p<∞. Such a result is of interest when dealing with doubly elliptic problems involving two elliptic operators, one in and the other on . Moreover we shall also consider the case when a Dirichlet homogeneous boundary condition is imposed on a relatively open part of and, as a preliminary step, we shall prove an analogous result when either = RN or = RN+ and =∂ RN+. Density results Sobolev spaces Smooth functions the Laplace--Beltrami operator.