Some Applications

TL;DR: In this article, the Lipschitz continuity of local minimizers has been studied in the context of the calculus of variations of the Lagrangian, and it has been shown that the local minimizer satisfies a relaxation result and an Erdmann- Du Bois-Reymond convex inclusion which, remarkably, holds under a growth condition, weaker than superlinearity.

TL;DR: In this paper , the authors considered the problem of avoiding the Lavrentiev phenomenon for Sobolev functions with one or both end point conditions and showed that the Lagrangian can be bounded on bounded sets to ensure the non-occurrence of the phenomenon.

TL;DR: In this paper, the Polya-Szego type weighted inequality for monotone rearrangement and Steiner symmetrization was shown to hold for 1D case.

TL;DR: Hardy and Hardy as mentioned in this paper derived Hardy inequalities in weighted Sobolev spaces via anticoercive partial differential inequalities of elliptic type involving A-Laplacian, where u = −divA(∇u) ≥ Φ, and u is defined on an open subset.