Abstract
This note is concerned with arithmetic properties of power series with integral coefficients that are lacunary in the following sense. There are two infinite sequences of integers {rn} and {sn}, satisfying such that It is also assumed that f(z) has a positive radius of convergence, Rf say, where naturally . A power series with these properties will be called admissible.
Publisher
Cambridge University Press (CUP)
Cited by
14 articles.
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1. Minimal varieties of associative algebras and transcendental series;International Journal of Algebra and Computation;2020-12-12
2. -NUMBERS IN FIELDS OF FORMAL POWER SERIES OVER FINITE FIELDS;Bulletin of the Australian Mathematical Society;2019-07-29
3. A NOTE ON A COMPLETE SOLUTION OF A PROBLEM POSED BY K. MAHLER;Bulletin of the Australian Mathematical Society;2018-05-03
4. ON EXCEPTIONAL SETS: THE SOLUTION OF A PROBLEM POSED BY K. MAHLER;Bulletin of the Australian Mathematical Society;2016-05-12
5. A NOTE ON LACUNARY POWER SERIES WITH RATIONAL COEFFICIENTS;Bulletin of the Australian Mathematical Society;2015-11-11