Real-Analyticity of Generalized Sine Functions with Two Parameters
Abstract
We identify the maximal real interval on which p,n is real-analytic for any real number p>1 and any integer n>1. We achieve this by first proving that p,n is analytic at (1/2)πp,n iff p=m/(m-1) for some integer m>1, in which case we determine the radius of convergence of the Taylor series at (1/2)πp,n.
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