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I assume you have already found this pagespage? It seems that, from the definition
$$ H(x) = \frac{\Psi(1-x/2)-\Psi(1/2-x/2)}{2\Gamma(1-x)} $$
the various properties you are interested in should be straightforward to prove.
I assume you have already found this pages? It seems that, from the definition
$$ H(x) = \frac{\Psi(1-x/2)-\Psi(1/2-x/2)}{2\Gamma(1-x)} $$
the various properties you are interested in should be straightforward to prove.
I assume you have already found this page? It seems that, from the definition
$$ H(x) = \frac{\Psi(1-x/2)-\Psi(1/2-x/2)}{2\Gamma(1-x)} $$
the various properties you are interested in should be straightforward to prove.
I assume you have already found this pages? It seems that, from the definition
$$ H(x) = \frac{\Psi(1-x/2)-\Psi(1/2-x/2)}{2\Gamma(1-x)} $$
the various properties you are interested in should be straightforward to prove.
