Counting Minimal Lagrangians Via Mirzakhani Functions
Abstract
We show that for k>1 the number of genus k minimal Lagrangians with area at most A in a product of hyperbolic surfaces grows on the order of A6(k-1), with an explicit leading constant given in terms of the Mirzakhani function. We also prove rigidity of the Lagrangian area spectrum, and obtain analogous counting results for products of a higher genus surface with a circle.
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