Kummer congruence for the Bernoulli numbers of higher order

We define higher or arbitrary order universal Bernoulli numbers and higher order universal Bernoulli Hurwitz numbers. We deduce a universal first-order Kummer congruence and a congruence for the higher order universal Bernoulli Hurwitz numbers from Clarke's universal von Staudt theorem. We also esta

Let R, represent the set of all rational numbers which are integral (mod m ) . We recall that a/b is integral (mod m) if m and b are relatively prime. If {a,L} is a sequence of numbers in R,, where p is a fixed rational prime, it is customary to say that a, satisfies KUMMER'S congruence when for al

The theorem of Kummer congruences of Bernoulli numbers says that if p -1 h m and mn (mod p N (p -1)), then In this paper we generalize these congruences to derivatives of Barnes' multiple Bernoulli polynomials by an elementary method and give a p-adic interpretation of them.

We prove congruences of shape E kþh E k Á E h ðmod NÞ modulo powers N of small prime numbers p; thereby refining the well-known Kummer-type congruences modulo these p of the normalized Eisenstein series E k : The method uses Serre's theory of Iwasawa functions and p-adic Eisenstein series; it presen

In this paper, we find simple 2-adic congruences mod 2 [nÂ2]+1 for the No rlund numbers B (n) n and for the Bernoulli numbers of the second kind b n . These congruences improve F. T. Howard's mod 8 congruences (in ``Applications of Fibonacci Numbers, '' Vol. 5, pp. 355 366, Kluwer Academic, Dordrech