The Cone of J-Hermitian Matrices and a Geometric Mean
Abstract
We study the cone PJ of positive J-Hermitian matrices associated with an indefinite signature matrix J = Idp,q. We show that the J-exponential map is bijective and use it to analyze the algebraic and geometric structure of PJ. Through a canonical identification with the cone of positive definite matrices, we endow PJ with a natural Riemannian structure. In this setting, we define a J-geometric mean as the midpoint of geodesics and prove that it is uniquely characterized as the solution of a Riccati-type equation.
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