On Sobolev spaces and density theorems on Finsler manifolds

Abstract

Here, a natural extension of Sobolev spaces is defined for a Finsler structure F and it is shown that the set of all real C∞ functions with compact support on a forward geodesically complete Finsler manifold (M, F), is dense in the extended Sobolev space H1p (M). As a consequence, the weak solutions u of the Dirichlet equation u=f can be approximated by C∞ functions with compact support on M. Moreover, let W ⊂ M be a regular domain with the Cr boundary ∂ W, then the set of all real functions in Cr (W) C0 ( W) is dense in Hkp (W), where k≤ r. Finally, several examples are illustrated and sharpness of the inequality k≤ r is shown.