Local rigidity, bifurcation, and stability of $H_f$-hypersurfaces in weighted Killing warped products

Abstract: In a weighted Killing warped product M n f ×ρR with warping metric , M + ρ 2 dt, where the warping function ρ is a real positive function defined on M n and the weighted function f does not depend on the parameter t ∈ R, we use equivariant bifurcation theory in order to establish sufficient conditions that allow us to guarantee the existence of bifurcation instants, or the local rigidity for a family of open sets {Ωγ } γ∈I whose boundaries ∂Ωγ are hypersurfaces with constant weighted mean curvature. For this, … Show more

Bifurcation of $$\varphi $$-Minimal Hypersurfaces in a Weighted Killing Warped Product

Bifurcation of $$\varphi $$-Minimal Hypersurfaces in a Weighted Killing Warped Product

Bifurcation of Hypersurfaces with Constant $$\varphi $$-Mean Curvature in $$M_{\varphi }^n\times _{\rho } \mathbb {R}$$