Existence results for highly discontinuous implicit elliptic equations
DOI:
https://doi.org/10.1478/AAPP.1001A5Keywords:
Elliptic Boundary-Value Problems, Discontinuity, Elliptic Differential Inclusions, Discontinuous Selections, Lower SemicontinuityAbstract
Let n ∈ N, with n ≧ 3, let p ∈]n/2,+∞[, and let Ω ⊆ Rn be a bounded domain with smooth boundary. Let Y ⊆ Rn, and let φ : Ω x Rh → R and Ψ : Y → R be two given functions, with Ψ continuous. We study the existence of strong solutions u = (u1, ..., uh) ∈ W2,p (Ω,Rh) ∩ W01,p (Ω,Rh) of the implicit elliptic equation Ψ(-Δu) = φ(x, u), where Δu = (Δu1, Δu2, ..., Δuh). We prove existence results where φ is allowed to be highly discontinuous in both variables. In particular, a function φ(x,z) satisfying our assumptions could be discontinuous, with respect to the second variable, even at all points z ∈ Rh.Downloads
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2022-03-09
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