A scalar field equation on hyperbolic space with indefinite sign nonlinearity

TL;DR

This paper analyzes threshold phenomena for a semilinear elliptic equation on hyperbolic space, identifying spectral regimes that determine the existence of positive-energy solutions across various nonlinear exponent configurations.

Contribution

It provides a complete characterization of the spectral thresholds for solution existence in a hyperbolic space setting with indefinite sign nonlinearity, covering all exponent regimes.

Findings

Explicit critical spectral parameters delineate solution regimes.

Thresholds depend on parameters p, q, and N in specific regimes.

Complete resolution of existence and non-existence across all exponent configurations.

Abstract

In this article, we study threshold phenomena for the semilinear double-power elliptic equation $$-\Delta_{\mathbb{B}^N} u - \lambda u = |u|^{p-1}u - |u|^{q-1}u, \quad u \in H^1(\mathbb{B}^N),$$ on the hyperbolic space $\mathbb{B}^N$ for $N \ge 3$. For parameters $1 < p \le 2^*-1$ (though we occasionally allow for supercritical exponents) and $q > 0$, we seek to identify the optimal spectral regimes for $\lambda \in \mathbb{R}$ that delineate the existence and non-existence of positive-energy solutions. We achieve a complete resolution of these thresholds across all exponent configurations: $p < q$, $0 < q < 1 < p$, and $1 < q < p$. Our results demonstrate that the boundary separating these regimes is governed by an explicit critical spectral parameter, which depends on $p$, $q$, and $N$ in the regime where $p < q$, but depends solely on $N$ in the remaining cases.