Large deviations for uniform projections of p-radial distributions on pn-balls
Abstract
We consider products of uniform random variables from the Stiefel manifold of orthonormal k-frames in Rn, k n, and random vectors from the n-dimensional pn-ball Bpn with certain p-radial distributions, p∈[1,∞). The distribution of this product geometrically corresponds to the projection of the p-radial distribution on Bnp onto a random k-dimensional subspace. We derive large deviation principles (LDPs) on the space of probability measures on Rk for sequences of such projections.
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