\(p\)-adic interpolation of the coefficients of Hurwitz series attached to height one formal groups
DOI10.1216/rmjm/1181072627zbMath0810.11068OpenAlexW1985127288MaRDI QIDQ1801941
Publication date: 11 April 1995
Published in: Rocky Mountain Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1216/rmjm/1181072627
\(p\)-adic measureformal power seriesKummer congruencesformal groupIwasawa algebraHurwitz series\(p\)-adic interpolation
Other analytic theory (analogues of beta and gamma functions, (p)-adic integration, etc.) (11S80) Local ground fields in algebraic geometry (14G20) Formal groups, (p)-divisible groups (14L05) Class field theory; (p)-adic formal groups (11S31)
Cites Work
- Kummer congruences in formal groups and algebraic groups of dimension one
- On p-adic L-functions associated to elliptic curves
- A concept of Bernoulli numbers in algebraic function fields. II
- One-parameter formal Lie groups over p-adic integer rings
- Formal groups and zeta-functions
- Kummersche Kongruenzen für die normierten Entwicklungskoeffizienten der Weierstraßschen \(\wp\)-Funktionen
- Congruences for the coefficients of the Jacobi elliptic functions
- Kummer congruences for the coefficients of Hurwitz series
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