Cheeger's isoperimetric problem for Gaussian mixtures
Abstract
In any dimension n, we determine the Cheeger constant and the Cheeger sets of the Gaussian mixture μ(x) = pγ(x-a) + (1-p)γ(x-b), where p ∈ [0,1], a,b ∈ Rn, and γ : Rn (0,∞) denotes a Gaussian. In particular, we characterize the Cheeger sets for μ in terms of specific half-spaces perpendicular to a-b, thereby confirming the conjectured solution to the Cheeger problem for Gaussian mixtures. Finally, we study the regime of parameters p,a,b in which μ admits a unique Cheeger set.
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