Stability of cylinders in E(,τ) homogeneous spaces

Abstract

We extend the classical Plateau-Rayleigh instability criterion in the E(,τ) spaces. We prove the existence of a positive number L0>0 such that if a truncated circular cylinder of radius in E(,τ) has length L>L0 then it is unstable. This number L0 depends on , τ and . The value L0 is sharp under axially-symmetric variations of the surface. We also extend this result for the partitioning problem in E(,τ).

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