Isoperimetric inequality for nonlocal bi-axial discrete perimeter
Abstract
In the present manuscript we address and solve for the first time a nonlocal discrete isoperimetric problem. We consider indeed a generalization of the classical perimeter, what we call a nonlocal bi-axial discrete perimeter, where, not only the external boundary of a polyomino P contributes to the perimeter, but all internal and external components of P. Furthermore, we find and characterize its minimizers in the class of polyominoes with fixed area n. Moreover, we explain how the solution of the nonlocal discrete isoperimetric problem is related to the rigorous study of the metastable behavior of a long-range bi-axial Ising model.
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