On q-analoques of divergent and exponential series

概要

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We shall consider linear independence measures for the values of the functions Da(z) and Ea(z) given below, which can be regarded as q-analogues of Eulers divergent series and the usual exponential series. For the q-exponential function Eq(z), our main result (Theorem 1) asserts the linear independence (over any number field) of the values 1 and Eq(αz) (j = 1,…,m) together with its measure having the exponent μ = O (m), which sharpens the known exponent μ = O (m2) obtained by a certain refined version of Siegels lemma (cf. [1]). Let p be a prime number. Then Theorem 1 further implies the linear independence of the p-adic numbers ∏n=1∞ (1+kpn), (k = 0,1,…,p-1), over Q with its measure having the exponent μ < 2p. Our proof is based on a modification of Maiers method which allows to construct explicit Padé type approximations (of the second kind) for certain q-hypergeometric series.
社団法人日本数学会の論文
2009-01-01