What does this research mean for the field?

Nontrivial solutions exist for fractional Laplace equations involving a Hardy potential and critical exponent nonlinearity on compact Riemannian manifolds under specific parameter conditions. Novelty: ClaimNovelty.INCREMENTAL. Consensus alignment: ConsensusAlignment.NEUTRAL.

What question did this study set out to answer?

This work investigates the existence of solutions to a fractional Laplace equation on Riemannian manifolds with Hardy potential.

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May 18, 2026Open Access

Existence of solutions to fractional equations with Hardy potential on compact Riemannian manifolds

Key Points

This work investigates the existence of solutions to a fractional Laplace equation on Riemannian manifolds with Hardy potential.
Employs critical point theory to assess solutions
Analyzes parameters and smooth positive functions
Focuses on specific conditions for parameters mu, lambda, f, and k.
Establishes existence of nontrivial solutions under defined conditions
Demonstrates applications of fractional Sobolev critical exponent
Confirms theoretical frameworks using compact Riemannian manifolds.

Abstract

In this article, we study a fractional Laplace equation on a compact Riemannian manifold involving a Hardy potential and a nonlinearity with critical exponent, (-g) ˢ u - udg (x, x₀) ^{2s} = f (x) |u|^p-2u + k (x) |u|^2ₛ^*-2u in M, where \ (n > 2s \), \ (s (0, 1) \), \ (2 < p < 2ₛ^* \), and \ (2ₛ^* = 2nn-2s \) denotes the fractional Sobolev critical exponent. Under suitable conditions on the parameters, and the smooth positive functions \ (f \) and \ (k \), we employ critical point theory to establish the existence of nontrivial solutions. For more information and the latex file, see https: //ejde. math. txstate. edu/Volumes/2026/38/abstr. html

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Existence of solutions to fractional equations with Hardy potential on compact Riemannian manifolds

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Abstract

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