Further Remarks on Multiple p-adic q-L-Function of Two Variables ∗

The object of this paper is to give several properties and applications of the multiple p-adic q-L-function of two variables L (r) p,q (s, z, χ). The explicit formulas relating higher order q- Bernoulli polynomials, which involve sums of products of higher order q-zeta function and higher order Dirichlet q-L-function are given. The value of higher order Dirichlet p-adic q-L-function for positive integers is also calculated. Furthermore, the Kummer-type congruences for multiple generalized q-Bernoulli polynomials are derived by making use of the difference theorem of higher order Dirichlet p-adic q-L-function.

[1]  T. Apostol Introduction to analytic number theory , 1976 .

[2]  N. Koblitz A new proof of certain formulas for $p$-adic $L$-functions , 1979 .

[3]  Y. Simsek THE BEHAVIOR OF THE TWISTED p-ADIC (h, q)-L-FUNCTIONS AT s = 0 , 2007 .

[4]  C. Nelson,et al.  On the zeros of the q-analogue exponential function , 1994 .

[5]  Taekyun Kim On p-adic q-L-functions and sums of powers , 2002, Discret. Math..

[6]  G. Fox A method of Washington applied to the derivation of a two-variable p-adic L-function , 2003 .

[7]  Kenkichi Iwasawa,et al.  Lectures on p-adic L-functions , 1972 .

[8]  Y. Simsek,et al.  $q$-Bernoulli Numbers and Polynomials Associated with Multiple $q$-Zeta Functions and Basic $L$-series , 2005, math/0502019.

[10]  L. CARLITZ Arithmetic Properties of Generalized Bernoulli Numbers. , 1959 .

[11]  Katsumi Shiratani,et al.  On a p-adic interpolation function for the Euler numbers and its derivatives , 1985 .

[12]  C. Nelson,et al.  On the two q -analogue logarithmic functions: ? , 1996, q-alg/9608015.

[13]  Lee-Chae Jang,et al.  Kummer congruence for the Bernoulli numbers of higher order , 2004, Appl. Math. Comput..

[14]  Taekyun Kim Multiple p-adic L-function , 2005, math/0505133.

[15]  Taekyun Kim,et al.  Some formulae for the q-Bernoulli and Euler polynomials of higher order , 2002 .

[16]  H. Leopoldt,et al.  Eine p-adische Theorie der Zetawerte. Teil I: Einführung der p-adischen Dirichletschen L-Funktionen. , 1964 .

[17]  P. Young On the behavior of some two-variable p-adic L-functions , 2003 .

[18]  L. Washington Introduction to Cyclotomic Fields , 1982 .

[19]  Taekyun Kim,et al.  Sums of products of q-Bernoulli numbers , 2001 .

[20]  L. Washington A note on p-adic L-functions , 1976 .

[21]  N. E. Nörlund Vorlesungen über Differenzenrechnung , 1924 .

[22]  Leonard Carlitz,et al.  $q$-Bernoulli numbers and polynomials , 1948 .

[23]  J. Diamond The $p$-adic log gamma function and $p$-adic Euler constants , 1977 .

[24]  H. Leopoldt Eine p-adische Theorie der Zetawerte. II. , 1975 .