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Autor principal: Pinta, Titus
Formato: Preprint
Publicado: 2025
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Acceso en línea:https://arxiv.org/abs/2510.23431
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author Pinta, Titus
author_facet Pinta, Titus
contents The purpose of this work is to investigate root finding problems defined on (quasi-)metric spaces, and ranging in Euclidean spaces. The motivation for this line of inquiry stems from recent models in biology and phylogenetics, where problems of great practical significance are cast as optimization problems on (quasi-)metric spaces. We investigate a minimal algebraic setup that allows us to study a notion of differentiability suitable for Newton-type methods, called Newton differentiability. This notion of differentiability benefits from calculus rules and is sufficient to prove superlinear convergence of a Newton-type method. Finally, a Newton-Kantorovich-type theorem provides an inverse function result, applicable on (quasi-)metric spaces.
format Preprint
id arxiv_https___arxiv_org_abs_2510_23431
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle A Newton-Kantorovich Inverse Function Theorem in Quasi-Metric Spaces
Pinta, Titus
Optimization and Control
58C15, 90C53, 30L99
The purpose of this work is to investigate root finding problems defined on (quasi-)metric spaces, and ranging in Euclidean spaces. The motivation for this line of inquiry stems from recent models in biology and phylogenetics, where problems of great practical significance are cast as optimization problems on (quasi-)metric spaces. We investigate a minimal algebraic setup that allows us to study a notion of differentiability suitable for Newton-type methods, called Newton differentiability. This notion of differentiability benefits from calculus rules and is sufficient to prove superlinear convergence of a Newton-type method. Finally, a Newton-Kantorovich-type theorem provides an inverse function result, applicable on (quasi-)metric spaces.
title A Newton-Kantorovich Inverse Function Theorem in Quasi-Metric Spaces
topic Optimization and Control
58C15, 90C53, 30L99
url https://arxiv.org/abs/2510.23431