Abstract
In this work we provide a characterization of $C^{k,1}$ functions on $\mathbb{r}^n$ (that is, $k$ times differentiable with locally Lipschitzian $k$-th derivatives) by means of $(k+1)$-th divided differences and Riemann derivatives. In particular we prove that the class of $C^{k,1}$ functions is equivalent to the class of functions with bounded $(k+1)$-th divided difference. From this result we deduce a Taylor's formula for this class of functions and a characterization through Riemann derivatives.
Citation
Davide La Torre. Matteo Rocca. "A Characterization of Ck,1 Functions." Real Anal. Exchange 27 (2) 515 - 534, 2001/2002.
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