What question did this study set out to answer?

To investigate the eigenvalue problems for truncated Laplacians in punctured balls and classify solutions based on their asymptotic behavior.

May 8, 2026

Radial solutions of truncated Laplacian equations in punctured balls

Key Points

To investigate the eigenvalue problems for truncated Laplacians in punctured balls and classify solutions based on their asymptotic behavior.
Analyzed equations involving truncated Laplacians ${\cal P}_k^+$ and ${\cal P}_k^-$ with singular potentials in punctured balls.
Studied principal eigenvalue problems and classified solutions focusing on their behavior near the origin.
Compared results for ${\cal P}_k^+$ and ${\cal P}_k^-$ regarding their degeneracy and ellipticity.
For ${\cal P}_k^+$, results analogous to the classical Laplacian in dimension $k$ were found.
The strong degeneracy of ${\cal P}_k^-$ led to significantly different outcomes compared to ${\cal P}_k^+$.
Classifications revealed differing asymptotic behaviors influenced by the nature of the lower-order terms.

Abstract

We consider equations involving the truncated Laplacians Pₖ^ and having lower-order terms with singular potentials posed in punctured balls. We study both the principal eigenvalue problem and the problem of classification of solutions, in dependence on their asymptotic behaviour near the origin, for equations having also superlinear absorption lower order terms. In the case of Pₖ^+, owing to the mild degeneracy of the operator, we obtain results which are analogous to the results for the Laplacian in dimension k. On the other hand, for operator Pₖ^-, we show that the strong degeneracy in ellipticity of the operator produces radically different results.

Bookmark

View Full Paper

Bookmark

View Full Paper

Radial solutions of truncated Laplacian equations in punctured balls

Key Points

Abstract

Cite This Study