Differential Poisson's ratio of a crystalline two-dimensional membrane
Abstract
We compute the differential Poisson's ratio of a suspended two-dimensional crystalline membrane embedded into a space of large dimensionality d 1. We demonstrate that, in the regime of anomalous Hooke's law, the differential Poisson's ratio approaches a universal value determined solely by the spatial dimensionality dc, with a power-law expansion = -1/3 + 0.016/dc + O(1/dc2), where dc=d-2. Thus, the value -1/3 predicted in previous literature holds only in the limit dc ∞.
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