On (conditional) positive semidefiniteness in a matrix-valued context
Abstract
In a nutshell, we intend to extend Schoenberg's classical theorem connecting conditionally positive semidefinite functions F Rn C, n ∈ N, and their positive semidefinite exponentials (tF), t > 0, to the case of matrix-valued functions F Rn Cm × m, m ∈ N. Moreover, we study the closely associated property that (t F(- i ∇)), t>0, is positivity preserving and its failure to extend directly in the matrix-valued context.
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