Abstract
In Theorem 1 of this paper, we establish the necessary and sufficient condition for the values of a power series, a Lambert series, and an infinite product generated by a linear recurrence at the same set of algebraic points to be algebraically dependent. In Theorem 4, from which Theorems 1--3 are deduced, we obtain an easily confirmable condition under which the values more general than those considered in Theorem 1 are algebraically independent, improving the method of [5].
Citation
Taka-aki Tanaka. "Algebraic independence of the values of power series, Lambert series, and infinite products generated by linear recurrences." Osaka J. Math. 42 (2) 487 - 497, June 2005.
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