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Asymptotics of zeros of basic sine and cosine functions

✍ Scribed by Sergei K. Suslov

Publisher
Elsevier Science
Year
2003
Tongue
English
Weight
377 KB
Volume
121
Category
Article
ISSN
0021-9045

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✦ Synopsis

We give an elementary calculus proof of the asymptotic formulas for the zeros of the q-sine and cosine functions which have been recently found numerically by Gosper and Suslov. Monotone convergent sequences of the lower and upper bounds for these zeros are constructed as an extension of our method. Improved asymptotics are found by a different method using the Lagrange inversion formula. Asymptotic formulas for the points of inflection of the basic sine and cosine functions are conjectured. Analytic continuation of the q-zeta function is discussed as an application. An interpretation of the zeros is given.

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