Two remarks on Normality Preserving Borel Automorphisms of Rn

Abstract

Let T be a bijective map on Rn such that both T and T-1 are Borel measurable. For any ∈ Rn and any real n × n positive definite matrix , let N (, ) denote the n-variate normal (gaussian) probability measure on Rn with mean vector and covariance matrix . Here we prove the following two results: (1) Suppose N(j, I)T-1 is gaussian for 0 ≤ j ≤ n where I is the identity matrix and \j - 0, 1 ≤ j ≤ n \ is a basis for Rn. Then T is an affine linear transformation; (2) Let j = I + εj uj uj, 1 ≤ j ≤ n where εj > -1 for every j and uj, 1 ≤ j ≤ n is a basis of unit vectors in Rn with uj denoting the transpose of the column vector uj. Suppose N(0, I)T-1 and N (0, j)T-1, 1 ≤ j ≤ n are gaussian. Then T(x) = Σs 1Es V s U x a.e. x where s runs over the set of 2n diagonal matrices of order n with diagonal entries 1, U,\, V are n × n orthogonal matrices and \Es\ is a collection of 2n Borel subsets of Rn such that \Es\ and \V s U (Es)\ are partitions of Rn modulo Lebesgue-null sets and for every j, V s U j (V s U)-1 is independent of all s for which the Lebesgue measure of Es is positive. The converse of this result also holds. 0.1in Our results constitute a sharpening of the results of S. Nabeya and T. Kariya