p-adic exponential ring, p-adic Schanuel's conjecture and decidability
Abstract
Let exp(x) be the function determined by the classical power series of the exponentiation. Then Ep(x):=exp(px) is well-defined on Zp, the ring of p-adic integer (for p not equal to 2, we set E2(x)=exp(4x)). Furthermore, Ep determines a structure of exponential ring on Zp. In this paper, we prove that if a p-adic version of Schanuel's conjecture is true then the theory of (Zp, +, ., 0, 1, Ep) is decidable.
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