In this paper, we establish the higher differentiability of the gradient of solutions to variational obstacle problems of the type min (Formula presented). Here ω c ℝ n is a bounded open set, ψ in W 1,q0(Ω) is a fixed function called obstacle, and ψ (ω) Kψ(Ω) is the class of admissible functions. The main feature of the energy densities under consideration here is that they satisfy non-standard growth conditions with respect to the gradient variable and that they explicitly depend on the pair (x,u). Assuming that ψ L loc ∞ (ω) W loc 2, 2q - p (ω) ψ L∞ loc(Ω), we are able to prove a second order regularity result for the solution.
On a class of obstacle problems with (p, q)-growth and explicit u-dependence / Gentile, Andrea; Isernia, Teresa; Passarelli Di Napoli, Antonia. - In: ADVANCES IN CALCULUS OF VARIATIONS. - ISSN 1864-8258. - 18:3(2025), pp. 943-962. [10.1515/acv-2024-0111]
On a class of obstacle problems with (p, q)-growth and explicit u-dependence
Passarelli di Napoli, Antonia
2025
Abstract
In this paper, we establish the higher differentiability of the gradient of solutions to variational obstacle problems of the type min (Formula presented). Here ω c ℝ n is a bounded open set, ψ in W 1,q0(Ω) is a fixed function called obstacle, and ψ (ω) Kψ(Ω) is the class of admissible functions. The main feature of the energy densities under consideration here is that they satisfy non-standard growth conditions with respect to the gradient variable and that they explicitly depend on the pair (x,u). Assuming that ψ L loc ∞ (ω) W loc 2, 2q - p (ω) ψ L∞ loc(Ω), we are able to prove a second order regularity result for the solution.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
