Artin L-function on PGL3
arXiv:1406.5277
Abstract
We study Artin $L$-functions on a finite $2$-dimensional complex $X_Î$ arising from PGL$_3$ attached to finite-dimensional representations $Ï$ of its fundamental group. Some key properties, such as rationality, functional equation, and invariance under induction, of these functions are proved. Moreover, using a cohomological argument, we establish a connection between the Artin $L$- functions and the $L$-function of $Ï$, extending the identity on zeta functions of $X_Î$ obtained in [KL,KLW].