Nash twist and Gaussian noise measure on isometric C1 maps
Abstract
Starting with a short map f0:I R3 on the unit interval I, we construct random isometric map fn:I R3 (with respect to some fixed Riemannian metrics) for each positive integer n, such that the difference (fn - f0) goes to zero in the C0 norm. The construction of fn uses the Nash twist. We show that the distribution of n1/2 (fn - f0) converges (weakly) to a Gaussian noise measure.
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