A Generalization of the GGR Conjecture

Abstract

For each positive integer n, function f, and point c, the GGR Theorem states that f is n times Peano differentiable at c if and only if f is n-1 times Peano differentiable at c and the following n-th generalized Riemann~derivatives of f at c exist: \[ h→ 0 1hnΣi=0n(-1)inif(c+(n-i-k)h), \] for k=0,…,n-1. The theorem has been recently proved in [AC2] and has been a conjecture by Ghinchev, Guerragio, and Rocca since 1998. We provide a new proof of this theorem, based on a generalization of it that produces numerous new sets of n-th Riemann smoothness conditions that can play the role of the above set in the GGR Theorem.

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