Blowing-up solutions to competitive critical systems in dimension 3

TL;DR

This paper constructs explicit solutions to a critical competitive system in three dimensions where solutions blow up, revealing complex multi-peak structures and providing the first near-explicit examples of such solutions.

Contribution

It introduces a novel Ljapunov-Schmidt reduction method to explicitly construct non-synchronized blowing-up solutions in a critical 3D system with competitive interactions.

Findings

Solutions exhibit blow-up at vertices of a regular polygon

One component resembles a Yamabe equation solution

Other components replicate blow-up structures with rotations

Abstract

We study the critical system of $m\geq 2$ equations \begin{equation*} -\Delta u_i = u_i^5 + \sum_{j = 1,\,j\neq i}^m \beta_{ij} u_i^2 u_j^3\,, \quad u_i \gneqq 0 \quad \mbox{in } \mathbb{R}^3\,, \quad i \in \{1, \ldots, m\}\,, \end{equation*} where $\beta_{\kappa\ell} =\alpha\in\mathbb{R}$ if $\kappa\neq\ell$, and $\beta_{\ell m}=\beta_{m \kappa} =\beta<0$, for $ \kappa, \ell \in \{1,\ldots, m-1\}$. We construct solutions to this system in the case where $\beta\to-\infty$ by means of a Ljapunov-Schmidt reduction argument. This allows us to identify the explicit form of the solution at main order: $u_1$ will look like a perturbation of the standard radial positive solution to the Yamabe equation, while $u_2$ will blow-up at the $k$ vertices of a regular planar polygon. The solutions to the other equations will replicate the blowing-up structure under an appropriate rotation that ensures $u_i\neq u_j$ for $i\neq j$. The result provides the first almost-explicit example of non-synchronized solutions to competitive critical systems in dimension 3.