Sample distribution theory using Coarea Formula
Abstract
Let (,,p) be a probability measure space and let X:Rk be a (vector valued) random variable. We suppose that the probability pX induced by X is absolutely continuous with respect to the Lebesgue measure on Rk and set fX as its density function. Let φ:Rk Rn be a C1-map and let us consider the new random variable Y=φ(X):Rn. Setting m:=\rank (Jφ(x)):x∈Rk\, we prove that the probability pY induced by Y has a density function fY with respect to the Hausdorff measure Hm on φ(Rk) which satisfies align* fY(y)= ∫φ-1(y)fX(x)1Jmφ(x)\,dHk-m(x), & for Hm-a.e. y∈φ(Rk). align* Here Jmφ is the m-dimensional Jacobian of φ. When Jφ has maximum rank we allow the map φ to be only locally Lipschitz. We also consider the case of X having probability concentrated on some m-dimensional sub-manifold E⊂eqRk and provide, besides, several examples including algebra of random variables, order statistics, degenerate normal distributions, Chi-squared and "Student's t" distributions.
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