Concentration profile, energy, and weak limits of radial solutions to semilinear elliptic equations with Trudinger-Moser critical nonlinearities

TL;DR

This paper classifies the asymptotic behavior of radial solutions to a class of Trudinger-Moser critical elliptic equations, revealing energy concentration, weak limits, and bubble formation, and confirms a conjecture in the radial case.

Contribution

It provides a detailed blow-up analysis and new conditions on weak limits, proving a conjecture and establishing the behavior of solutions with multiple bubbles.

Findings

Classified the asymptotic profiles of solutions.

Proved the conjecture by Grossi-Mancini-Naimen-Pistoia in the radial case.

Showed solutions with multiple bubbles exist and weakly converge to sign-changing solutions.

Abstract

We investigate the next Trudinger-Moser critical equations, \[ \begin{cases} -\Delta u=\lambda ue^{u^2+\alpha|u|^\beta}&\text{ in }B,\\ u=0&\text{ on }\partial B, \end{cases} \] where $\alpha>0$, $(\lambda,\beta)\in(0,\infty)\times(0,2)$ and $B\subset \mathbb{R}^2$ is the unit ball centered at the origin. We classify the asymptotic behavior of energy bounded sequences of radial solutions. Via the blow--up analysis and a scaling technique, we deduce the limit profile, energy, and several asymptotic formulas of concentrating solutions together with precise information of the weak limit. In particular, we obtain a new necessary condition on the amplitude of the weak limit at the concentration point. This gives a proof of the conjecture by Grossi-Mancini-Naimen-Pistoia in 2020 in the radial case. Moreover, in the case of $\beta\le1$, we show that any sequence carries at most one bubble. This allows a new proof of the nonexistence of low energy nodal radial solutions for $(\lambda,\beta)$ in a suitable range. Lastly, we discuss several counterparts of our classification result. Especially, we prove the existence of a sequence of solutions which carries multiple bubbles and weakly converges to a sign-changing solution.