Iwasawa main conjecture and p-adic L-functions
¹ÚÁöÈÆ (Æ÷Ç×°ø°ú´ëÇб³)
2011. 04. 07.
The theory of L-functions and zeta functions have been the key subject
of mathematical research during the centuries since the Riemann zeta
function was introduced and its important connection to the arithmetic
of the integer was recognized. Though vast generalizations of the Riemann
zeta function (for example, L-functions attached to motives, Galois
representations, and automorphic representations) have been discovered
and studied by many mathematicians, they are still mysterious analytic
invariants. One approach to understand the origin of L-functions and
their relation to number theory is studying p-adic L-functions and the
Iwasawa main conjectures for a prime number p. In this talk, I will
start from the simplest p-adic L-functions (due to Kubota-Leopoldt)
and explain the idea of Iwasawa main conjecture, which gives a direct
connection between p-adic L-functions and certain arithmetic objects
called characteristic ideals. Hopefully we will be able to see how p-adic
aspects of L-functions give some insight to their connection to arithmetic.
