Jorge DÁvila, Héctor Barrantes G., Isidro H. Munive
Published 2023-01-18Version 1
Given any closed Riemannian manifold $(M, g)$, we use the gradient flow method and Sign-Changing Critical Point Theory to prove multiplicity results for 2-nodal solutions of a subcritical Yamabe type equation on $(M, g)$. If $(N, h)$ is a closed Riemannian manifold of constant positive scalar curvature our result gives multiplicity results for the type Yamabe equation on the Riemannian product $(M x N, g + \epsilon h)$, for $\epsilon > 0$ small.
New multiplicity results for critical $p$-Laplacian problems
Existence and multiplicity results for Kirchhoff type problems on a double phase setting
Regularity and multiplicity results for fractional $(p,q)$-Laplacian equations
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