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Hauptverfasser: Palatucci, Giampiero, Piccinini, Mirco
Format: Preprint
Veröffentlicht: 2023
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2307.14933
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author Palatucci, Giampiero
Piccinini, Mirco
author_facet Palatucci, Giampiero
Piccinini, Mirco
contents We investigate some effects of the lack of compactness in the critical Sobolev embedding by proving that a famous conjecture of Brezis and Peletier \cite{BP89} does still hold in the Heisenberg framework: optimal functions for a natural subcritical approximations of the Sobolev quotient concentrate energy at exactly one point which is a critical point of the Robin function (i. e., the diagonal of the regular part of the Green function associated to the involved domain), in clear accordance with the underlying sub-Riemannian geometry. Consequently, a new suitable definition of domains geometrical regular near their characteristic set is introduced. In order to achieve the aforementioned result, we need to combine proper estimates and tools to attack the related CR Yamabe equation with novel feasible ingredients in PDEs and Calculus of Variations which also aim to constitute general independent results in the Heisenberg framework, as for instance a fine asymptotic control of the optimal functions via the Jerison and Lee extremals realizing the equality in the critical Sobolev inequality \cite{JL88}.
format Preprint
id arxiv_https___arxiv_org_abs_2307_14933
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Asymptotic approach to singular solutions for the CR Yamabe equation
Palatucci, Giampiero
Piccinini, Mirco
Analysis of PDEs
We investigate some effects of the lack of compactness in the critical Sobolev embedding by proving that a famous conjecture of Brezis and Peletier \cite{BP89} does still hold in the Heisenberg framework: optimal functions for a natural subcritical approximations of the Sobolev quotient concentrate energy at exactly one point which is a critical point of the Robin function (i. e., the diagonal of the regular part of the Green function associated to the involved domain), in clear accordance with the underlying sub-Riemannian geometry. Consequently, a new suitable definition of domains geometrical regular near their characteristic set is introduced. In order to achieve the aforementioned result, we need to combine proper estimates and tools to attack the related CR Yamabe equation with novel feasible ingredients in PDEs and Calculus of Variations which also aim to constitute general independent results in the Heisenberg framework, as for instance a fine asymptotic control of the optimal functions via the Jerison and Lee extremals realizing the equality in the critical Sobolev inequality \cite{JL88}.
title Asymptotic approach to singular solutions for the CR Yamabe equation
topic Analysis of PDEs
url https://arxiv.org/abs/2307.14933