Infinite products with algebraic numbers
Abstract
We obtain general criteria for giving a lower bound on the degree of numbers of the form Πn=1∞ (1+bnαn) or of the form Πm=1∞ (1+ Σn=1∞ bn,mαn,m), where the αn and αn,m are assumed to be algebraic integers, and the bn and bn,m are natural numbers. In each case, we give a lower bound of the degree over the smallest extension of Q containing all algebraic numbers in the expression. The criteria obtained depend on growth conditions on the involved quantities.
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