Fuglede's theorem in generalized Orlicz--Sobolev spaces
Abstract
In this paper, we show that Orlicz--Sobolev spaces W1,φ() can be characterized with the ACL- and ACC-characterizations. ACL stands for absolutely continuous on lines and ACC for absolutely continuous on curves. Our results hold under the assumptions that C1() functions are dense in W1,φ(), and φ(x,β) ≥ 1 for some β > 0 and almost every x ∈ . The results are new even in the special cases of Orlicz and double phase growth.
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