Dimension Walks on Generalized Spaces

Abstract

Let d,k be positive integers. We call generalized spaces the cartesian product of the d-dimensional sphere, Sd, with the k-dimensional Euclidean space, Rk. We consider the class P(Sd × Rk) of continuous functions : [-1,1] × [0,∞) R such that the mapping C: ( Sd ×Rk )2 R, defined as C ( (x,y),(x,y) ) = ( θ(x,x), \|y-y\| ), (x,y), \; (x,y) ∈ Sd × Rk, is positive definite. We propose linear operators that allow for walks through dimension within generalized spaces while preserving positive definiteness.

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