In this paper, we investigate the fine properties of functions under suitable geometric conditions on the jump set. Precisely, given an open set ω ⊂ ℝn and given p > 1, we study the blow-up of functions u ϵ GSBV (ω), whose jump sets belong to an appropriate class Jp and whose approximate gradients are p-th power summable. In analogy with the theory of p-capacity in the context of Sobolev spaces, we prove that the blow-up of u converges up to a set of Hausdorff dimension less than or equal to n - p. Moreover, we are able to prove the following result which in the case of W1, p (ω) functions can be stated as follows: whenever u k strongly converges to u, then, up to subsequences, u k pointwise converges to u except on a set whose Hausdorff dimension is at most n - p {n-p}.
On the blow-up of GSBV functions under suitable geometric properties of the jump set / Tasso, E.. - In: ADVANCES IN CALCULUS OF VARIATIONS. - ISSN 1864-8258. - 15:1(2022), pp. 59-108. [10.1515/acv-2019-0068]
On the blow-up of GSBV functions under suitable geometric properties of the jump set
Tasso E.
2022-01-01
Abstract
In this paper, we investigate the fine properties of functions under suitable geometric conditions on the jump set. Precisely, given an open set ω ⊂ ℝn and given p > 1, we study the blow-up of functions u ϵ GSBV (ω), whose jump sets belong to an appropriate class Jp and whose approximate gradients are p-th power summable. In analogy with the theory of p-capacity in the context of Sobolev spaces, we prove that the blow-up of u converges up to a set of Hausdorff dimension less than or equal to n - p. Moreover, we are able to prove the following result which in the case of W1, p (ω) functions can be stated as follows: whenever u k strongly converges to u, then, up to subsequences, u k pointwise converges to u except on a set whose Hausdorff dimension is at most n - p {n-p}.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
