In mathematics, the Gross–Koblitz formula, introduced by Gross and Koblitz (1979) expresses a Gauss sum using a product of values of the p-adic gamma function. It is an analog of the Chowla–Selberg formula for the usual gamma function. It implies the Hasse–Davenport relation and generalizes the Stickelberger theorem. Boyarsky (1980) gave another proof of the Gross–Koblitz formula (Boyarski being a pseudonym of Bernard Dwork), and Robert (2001) gave an elementary proof.
Statement
The Gross–Koblitz formula states that the Gauss sum τ can be given in terms of the p-adic gamma function Γp by
\( {\displaystyle \tau _{q}(r)=-\pi ^{s_{p}(r)}\prod _{0\leq i<f}\Gamma _{p}\left({\frac {r^{(i)}}{q-1}}\right)} \)
where
q is a power pf of a prime p
r is an integer with 0 ≤ r < q–1
r(i) is the integer whose base p expansion is a cyclic permutation of the f digits of r by i positions
sp(r) is the sum of the digits of r in base p
\( {\displaystyle \tau _{q}(r)=\sum _{a^{q-1}=1}a^{-r}\zeta _{\pi }^{{\text{Tr}}(a)}} \), where the sum is over roots of 1 in the extension Qp(π))
π satisfies πp – 1 = –p
ζπ is the pth root of 1 congruent to 1+π mod π2
References
Boyarsky, Maurizio (1980), "p-adic gamma functions and Dwork cohomology", Transactions of the American Mathematical Society, 257 (2): 359–369, doi:10.2307/1998301, ISSN 0002-9947, JSTOR 1998301, MR 0552263
Cohen, Henri (2007). Number Theory – Volume II: Analytic and Modern Tools. Graduate Texts in Mathematics. 240. Springer-Verlag. pp. 383–395. ISBN 978-0-387-49893-5. Zbl 1119.11002.
Gross, Benedict H.; Koblitz, Neal (1979), "Gauss sums and the p-adic Γ-function", Annals of Mathematics, Second Series, 109 (3): 569–581, doi:10.2307/1971226, ISSN 0003-486X, JSTOR 1971226, MR 0534763
Robert, Alain M. (2001), "The Gross-Koblitz formula revisited", Rendiconti del Seminario Matematico della Università di Padova. The Mathematical Journal of the University of Padova, 105: 157–170, ISSN 0041-8994, MR 1834987
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