Nearly cosine series and generalized trigonometric functions
A. Curcio, G. Dattoli, E. Di Palma, P. Natalini, P. E., Ricci
TL;DR
This paper introduces a class of generalized trigonometric functions with cosine-like Taylor series, exploring their mathematical properties and applications in physics, including laser theory and molecular potentials.
Contribution
It presents a novel class of generalized trigonometric functions with cosine-like series and studies their properties and applications in physics.
Findings
Generalized functions have cosine-like Taylor series.
Applicable to molecular, laser physics, and causality identities.
Provides a new mathematical framework for physical problems.
Abstract
A class of overlooked trigonometric-like functions is explored in this article, along with the relevant applications in applications. We show indeed that Taylor series, resembling that of an ordinary cosine, are representative of wider classes of functions, naturally suited for prolems ranging from molecular to Laser Physics. The article goes through the original motivations of the proposal and studies the relevant properties within the context of an Umbral interpretation. Their use in applications is discussed within the framework of Free Electron Laser theory, Lennard- Jones potentials and Kramers-Kronig causality identities
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Taxonomy
TopicsIterative Methods for Nonlinear Equations · Mathematical functions and polynomials · Approximation Theory and Sequence Spaces