In this note, a proof of the Ghoussoub-Preiss theorem is presented by using the epsilon-perturbation as introduced by Brezis-Nirenb erg. Thus, besides the deformation lemma, other advanced tools such as the Radon mea-sures space, sub-differential, or the theory of non-differentiable functions, are avoided. Our new argument is a lemma of local type which is used in com-bination with other main ingredients like the Ekeland variational principle and the pseudo-gradient lemma, for which a new proof is proposed as a consequence of the Michael selection theorem.
Bonanno, G., Livrea, R. (2021). A proof of the Ghoussoub-Preiss theorem by the ε−perturbation of Brezis-Nirenberg. HOUSTON JOURNAL OF MATHEMATICS, 47(1), 165-191.
A proof of the Ghoussoub-Preiss theorem by the ε−perturbation of Brezis-Nirenberg
Livrea, R
2021-01-01
Abstract
In this note, a proof of the Ghoussoub-Preiss theorem is presented by using the epsilon-perturbation as introduced by Brezis-Nirenb erg. Thus, besides the deformation lemma, other advanced tools such as the Radon mea-sures space, sub-differential, or the theory of non-differentiable functions, are avoided. Our new argument is a lemma of local type which is used in com-bination with other main ingredients like the Ekeland variational principle and the pseudo-gradient lemma, for which a new proof is proposed as a consequence of the Michael selection theorem.
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