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Under mild assumptions on the kernel K0, the non-local K-perimeter PK satisfies the monotonicity property on nested convex bodies; i. e. \ if A Bⁿ are two convex bodies, then PK (A) PK (B). In this note, we prove quantitative lower bounds on the difference of the K-perimeters of A and B in terms of their Hausdorff distance, provided that K satisfies suitable symmetry properties.
Giannetti et al. (Wed,) studied this question.