A wavelet basis for non-Archimedean Cn-functions and n-th Lipschitz functions
Abstract
A wavelet basis is a basis for the K-Banach space C(R, K) of continuous functions from a complete discrete valuation ring R whose residue field is finite to its quotient field K. In this paper, we prove a characterization of n-times continuously differentiable functions from R to K by the coefficients with respect to the wavelet basis and give an orthonormal basis for K-Banach space Cn(R, K) of n-times continuously differentiable functions.
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