On the mu and lambda invariants of the logarithmic class group

Abstract

Let be a rational prime number. Assuming the Gross-Kuz'min conjecture along a -extension K\∞ of a number field K, we show that there exist integers μt, and such that the exponent e\n of the order e\n of the logarithmic class group n for the n-th layer K\n of K\∞ is given by e\n=μn+λ n + , for n big enough. We show some relations between the classical invariants μ and λ, and their logarithmic counterparts μt and for some class of -extensions. Additionally, we provide numerical examples for the cyclotomic and the non-cyclotomic case.