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1. ALGEBRAIC INDEPENDENCE OF PERIODS AND LOGARITHMS OF DRINFELD MODULES.

Author

CHIEH-YU CHANG and PAPANIKOLAS, MATTHEW A.

Subjects

*ALGEBRAIC independence, *DRINFELD modules, *MODULES (Algebra), *ELLIPTIC curves, *ABELIAN groups

Abstract

The article discusses a paper that proves algebraic independence outcomes on periods, quasi-periods, logarithms, and quasi-logarithms on Drinfeld modules, which are influenced by speculations from the theory of elliptic curves and abelian types. Its discussions include the deep connection between Drinfeld modules and Anderson's theory of t-motives, Galois groups and difference equations, and the endomorphisms of t-motives. The algebraic independence of Drinfeld logarithms is also taken up.

Published

2012