An infinite-dimensional helix invariant under spherical projections

Abstract

We classify all subsets S of the projective Hilbert space with the following property: for every point s0∈ S, the spherical projection of S\ s0\ to the hyperplane orthogonal to s0 is isometric to S\ s0\. In probabilistic terms, this means that we characterize all zero-mean Gaussian processes Z=(Z(t))t∈ T with the property that for every s0∈ T the conditional distribution of (Z(t))t∈ T given that Z(s0)=0 coincides with the distribution of ((t; s0) Z(t))t∈ T for some function (t;s0). A basic example of such process is the stationary zero-mean Gaussian process (X(t))t∈ R with covariance function E [X(s) X(t)] = 1/ (t-s). We show that, in general, the process Z can be decomposed into a union of mutually independent processes of two types: (i) processes of the form (a(t) X((t)))t∈ T, with a: T R, (t): T R, and (ii) certain exceptional Gaussian processes defined on four-point index sets. The above problem is reduced to the classification of metric spaces in which in every triangle the largest side equals the sum of the remaining two sides.