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 $\mathcal{P}$ contributes to the perimeter, but all internal and external components of $\mathcal{P}$. 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.
Original language | English |
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Publisher | arXiv |
DOIs | |
Publication status | Published - 17 Dec 2024 |
Keywords
- math.PR
- math-ph
- math.CO
- math.MP
- 05A20, 05B45, 05B50, 52B60, 82C20