Existence and asymptotic behavior of non-normal conformal metrics on $\mathbb{R}^4$ with sign-changing $Q$-curvature

TL;DR

This paper investigates the existence, structure, and asymptotic behavior of solutions to a prescribed Q-curvature problem on , revealing conditions for solutions and their geometric implications.

Contribution

It establishes existence and asymptotic properties of solutions with sign-changing Q-curvature on , including a geometric interpretation related to scalar curvature at infinity.

Findings

Existence of solutions with specific polynomial asymptotics for given parameters.

All solutions can be expressed as a polynomial plus a logarithmic integral term.

Solutions exhibit a logarithmic decay at infinity, linked to scalar curvature.

Abstract

We consider the following prescribed $Q$-curvature problem \begin{equation}\label{uno} \begin{cases} \Delta^2 u=(1-|x|^p)e^{4u}, \quad\text{on}\,\,\mathbb{R}^4\\ \Lambda:=\int_{\mathbb{R}^4}(1-|x|^p)e^{4u}dx<\infty. \end{cases} \end{equation} We show that for every polynomial $P$ of degree 2 such that $\lim\limits_{|x|\to+\infty}P=-\infty$, and for every $\Lambda\in(0,\Lambda_\mathrm{sph})$, there exists at least one solution which assume the form $u=w+P$, where $w$ behaves logarithmically at infinity. Conversely, we prove that all solutions have the form $v+P$, where $$v(x)=\frac{1}{8\pi^2}\int\limits_{\mathbb{R}^4}\log\left(\frac{|y|}{|x-y|}\right)(1-|y|^p)e^{4u}dy$$ and $P$ is a polynomial of degree at most 2 bounded from above. Moreover, if $u$ is a solution to the previous problem, it has the following asymptotic behavior $$u(x)=-\frac{\Lambda}{8\pi^2}\log|x|+P+o(\log|x|),\quad\text{as}\,\,|x|\to+\infty.$$ As a consequence, we give a geometric characterization of solutions in terms of the scalar curvature at infinity of the associated conformal metric $e^{2u}|dx|^2$.