Open AccessOn Locally Uniformly Differentiable Functions on a Complete Non-Archimedean Ordered Field Extension of the Real Numbers
Author(s) -
Khodr Shamseddine,
Todd Sierens
Publication year - 2012
Publication title -
isrn mathematical analysis
Language(s) - English
Resource type - Journals
eISSN - 2090-4665
pISSN - 2090-4657
DOI - 10.5402/2012/387053
Subject(s) - differentiable function , cauchy distribution , inverse , extension (predicate logic) , field (mathematics) , mathematics , polynomial , function (biology) , algorithm , discrete mathematics , pure mathematics , computer science , mathematical analysis , geometry , biology , programming language , evolutionary biology
We study the properties of locally uniformly differentiable functions on , a non-Archimedean field extension of the real numbers that is real closed and Cauchy complete in the topology induced by the order. In particular, we show that locally uniformly differentiable functions are 1, they include all polynomial functions, and they are closed under addition, multiplication, and composition. Then we formulate and prove a version of the inverse function theorem as well as a local intermediate value theorem for these functions.
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