An algorithm of computing special values of Dwork's p-adic hypergeometric functions in polynomial time

Abstract: Dwork's $p$-adic hypergeometric function is defined to be a ratio ${}sF{s-1}(t)/{}sF{s-1}(t^p)$ of hypergeometric power series. Dwork showed that it is a uniform limit of rational functions, and hence one can define special values on $|t|_p=1$. However to compute the value modulo $p^n$ in the naive method, the bit complexity increases by exponential when $n\to\infty$. In this paper we present a certain algorithm whose complexity increases at most $O(n^4(\log n)^3)$.