A uniqueness result for functions with zero fine gradient on quasiconnected and finely connected sets

Abstract

We show that every Sobolev function in W1,ploc(U) on a p-quasiopen set U ⊂ Rn with a.e.-vanishing p-fine gradient is a.e.-constant if and only if U is p-quasiconnected. To prove this we use the theory of Newtonian Sobolev spaces on metric measure spaces, and obtain the corresponding equivalence also for complete metric spaces equipped with a doubling measure supporting a p-Poincar\'e inequality. On unweighted Rn, we also obtain the corresponding result for p-finely open sets in terms of p-fine connectedness, using a deep result by Latvala.