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Main Authors: Luzón, Ana, Morón, Manuel A., Ramírez, José L.
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2408.12552
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_version_ 1866929470085005312
author Luzón, Ana
Morón, Manuel A.
Ramírez, José L.
author_facet Luzón, Ana
Morón, Manuel A.
Ramírez, José L.
contents In this paper we solve some differential equations in the $D_h$ derivative in Ward's sense. We use a special metric in the formal power series ring $\K[[x]]$. The solutions of that equations are giving in terms of fixed points for certain contractive maps in our metric framework. Our main tools are Banach's Fixed Point Theorem, Fundamental Calculus Theorem and Barrow's rule for Ward's calculus. Later, we return to the usual differential calculus via Sheffer's expansion of some kind of operators. Finally, we give some examples related, in some sense, to combinatorics.
format Preprint
id arxiv_https___arxiv_org_abs_2408_12552
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Differential equations in Ward's calculus
Luzón, Ana
Morón, Manuel A.
Ramírez, José L.
Combinatorics
In this paper we solve some differential equations in the $D_h$ derivative in Ward's sense. We use a special metric in the formal power series ring $\K[[x]]$. The solutions of that equations are giving in terms of fixed points for certain contractive maps in our metric framework. Our main tools are Banach's Fixed Point Theorem, Fundamental Calculus Theorem and Barrow's rule for Ward's calculus. Later, we return to the usual differential calculus via Sheffer's expansion of some kind of operators. Finally, we give some examples related, in some sense, to combinatorics.
title Differential equations in Ward's calculus
topic Combinatorics
url https://arxiv.org/abs/2408.12552