Scaling limits of discrete copulas are bridged Brownian sheets
Abstract
For large n, take a random n × n permutation matrix and its associated discrete copula Xn. For a, b = 0, 1, …, n, let yn(an,bn) = 1n ( Xa,b - abn ); define yn: [0,1]2 R by interpolating quadratically on squares of side 1n. We prove a Donsker type central limit theorem: n yn approaches a bridged Brownian sheet on the unit square.
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