Abstract
A compactness result is revised in order to prove the pointwise convergence of the gradients of a sequence of solutions to a general quasilinear inequality (anisotropic or not, degenerate or not) and for an arbitrary open set. Combining this result with the well-known Brézis-Lieb lemma, we derive simple proofs of Palais-Smale properties in many optimization problems especially on unbounded domains.
Citation
A. El Hamidi. J. M. Rakotoson. "Compactness and quasilinear problems with critical exponents." Differential Integral Equations 18 (11) 1201 - 1220, 2005. https://doi.org/10.57262/die/1356059738
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