Maximal L p -regularity for the Laplacian on Lipschitz domains

Abstract: Abstract. We consider the Laplacian with Dirichlet or Neumann boundary conditions on bounded Lipschitz domains Ω, both with the following two domains of definition:, where B is the boundary operator. We prove that, under certain restrictions on the range of p, these operators generate positve analytic contraction semigroups on L p (Ω) which implies maximal regularity for the corresponding Cauchy problems. In particular, if Ω is bounded and convex and 1 < p ≤ 2, the Laplacian with domain D 2 (∆) has the maximal… Show more

“…In [16], Wood applied the semigroup theory to derive the maximal L p regularity for the Laplacian operator on Lipschitz domains, some counterexamples were constructed to support his results. As an application of a special variational argument based on Nirenberg difference quotient technique, Savaré [13] got the regularity of problem (1.…”

Global regularity for divergence form elliptic equations on quasiconvex domains

“…In [16], Wood applied the semigroup theory to derive the maximal L p regularity for the Laplacian operator on Lipschitz domains, some counterexamples were constructed to support his results. As an application of a special variational argument based on Nirenberg difference quotient technique, Savaré [13] got the regularity of problem (1.…”

Global regularity for divergence form elliptic equations on quasiconvex domains

“…Existence and uniqueness of I ∈ B(T ) solving (A.1) was proved in [21]. The estimate (A.2) can be verified projecting (A.1) on the span of {ψ k := λ (Ω) with respect to the inner product u, v 1 := ∇u, ∇v L 2 (Ω) , and estimating the projection coefficients by applying the CauchySchwatrz-Bunyakovsky inequality.…”

Data Assimilation for Linear Parabolic Equations: Minimax Projection Method

“…We need the following lemma concerning the maximal L p regularity of parabolic equations in a Lipscthiz domain [27].…”

Mathematical and numerical analysis of the time-dependent Ginzburg–Landau equations in nonconvex polygons based on Hodge decomposition