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Intermediate Value Theorem for Analytic Functions on a Levi-Civita Field


The proof of the intermediate value theorem for power series on a Levi-Civita field will be presented. After reviewing convergence criteria for power series [19], we review their analytical properties [18]. Then we state and prove the intermediate value theorem for a large class of functions that are given locally by power series and contain all the continuations of real power series: using iteration, we construct a sequence that converges strongly to a point at which the intermediate value will be assumed.

K. Shamseddine, M. Berz, Bulletin of the Belgian Mathematical Society 14 (2007) 1001-1015


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