The content starts by reviewing the notion of T-product and T-positive definite tensors, and their basic properties. It then defines the geometric mean of two T-positive definite tensors and proves that it satisfies various properties that a "mean" should have, such as idempotence, inversion, commutativity, and transformation.
The geometric mean is also shown to be the unique T-positive definite solution of an algebraic Riccati tensor equation, and can be expressed as solutions of algebraic Riccati matrix equations.
The content then introduces a Riemannian metric on the convex open cone of T-positive definite tensors, and interprets the geometric mean in terms of this Riemannian metric. It is proved that the geometric mean of two T-positive definite tensors is the midpoint of the geodesic joining the tensors, and that the Riemannian manifold is complete and has nonpositive curvature.
In un'altra lingua
dal contenuto originale
arxiv.org
Approfondimenti chiave tratti da
by Jeong-Hoon J... alle arxiv.org 04-02-2024
https://arxiv.org/pdf/2404.00255.pdfDomande più approfondite