In this paper we consider an abstract Wiener space (X,γ,H) and an open subset O⊆X which satisfies suitable assumptions. For every p∈(1,+∞) we define the Sobolev space W01,p(O,γ) as the closure of Lipschitz continuous functions which have support with positive distance from ∂O with respect to the natural Sobolev norm, and we show that under the assumptions on O the space W01,p(O,γ) can be characterized as the space of functions in W1,p(O,γ) which have null trace at the boundary ∂O, or, equivalently, as the space of functions defined on O whose trivial extension belongs to W1,p(X,γ).
Characterizations of Sobolev spaces on sublevel sets in abstract Wiener spaces
Miranda M.
2023
Abstract
In this paper we consider an abstract Wiener space (X,γ,H) and an open subset O⊆X which satisfies suitable assumptions. For every p∈(1,+∞) we define the Sobolev space W01,p(O,γ) as the closure of Lipschitz continuous functions which have support with positive distance from ∂O with respect to the natural Sobolev norm, and we show that under the assumptions on O the space W01,p(O,γ) can be characterized as the space of functions in W1,p(O,γ) which have null trace at the boundary ∂O, or, equivalently, as the space of functions defined on O whose trivial extension belongs to W1,p(X,γ).File in questo prodotto:
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