Email this article A local mean value theorem for functions on non-archimedean field extensions of the real numbers
- Authors: Shamseddine K.1, Bookatz G.1
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Affiliations:
- Department of Physics and Astronomy
- Issue: Vol 8, No 2 (2016)
- Pages: 160-175
- Section: Research Articles
- URL: https://journals.rcsi.science/2070-0466/article/view/200616
- DOI: https://doi.org/10.1134/S2070046616020059
- ID: 200616
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Abstract
In this paper, we review the definition and properties of locally uniformly differentiable functions on N, a non-Archimedean field extension of the real numbers that is real closed and Cauchy complete in the topology induced by the order. Then we define and study n-times locally uniform differentiable functions at a point or on a subset of N. In particular, we study the properties of twice locally uniformly differentiable functions and we formulate and prove a local mean value theorem for such functions.
About the authors
K. Shamseddine
Department of Physics and Astronomy
Author for correspondence.
Email: khodr.shamseddine@umanitoba.ca
Canada, Manitoba, R3T 2N2
G. Bookatz
Department of Physics and Astronomy
Email: khodr.shamseddine@umanitoba.ca
Canada, Manitoba, R3T 2N2
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