Graphs and recursively defined towers of function fields

For a tower F 1 ʕ F 2 ʕ и и и of algebraic function fields F i ‫ކ/‬ q , define ϭ lim iǞȍ N(F i )/g(F i ), where N(F i ) is the number of rational places and g(F i ) is the genus of F i ‫ކ/‬ q . The tower is said to be asymptotically good if Ͼ 0. We give a very simple explicit example of an asymptoti

We study the graph X(n) that is de"ned as the "nite part of the quotient (n)!T, with T the Bruhat}Tits tree over % O ((1/¹ )) and (n) the principal congruence subgroup of "G¸(% We give concrete realizations of the ¸-functions of the "nite part of the hal#ine !T for "nite unitary representations of

By using rami"ed Hilbert Class Field Towers we improve lower asymptotic bounds of the number of rational points of smooth algebraic curves over % and % . ## 2002 Elsevier Science (USA)