Certain identities on derivatives of radial homogeneous and logarithmic functions
Abstract
Let k be a natural number and s be real. In the 1-dimensional case, the k-th order derivatives of the functions xs and x are multiples of xs-k and x-k, respectively. In the present paper, we generalize this fact to higher dimensions by introducing a suitable norm of the derivatives, and give the exact values of the multiples.
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