Beyond the extended Selberg class: dF 1

Abstract

We will introduce two new classes of Dirichlet series which are monoids under multiplication. The first class A\# contains both the extended Selberg class S\# of Kaczorowski and Perelli as well as many L-functions attached to automorphic representations of GLn( AK), where AK denotes the ad\`eles over the number field K (these representations need not be unitary or generic). This is in contrast to the class S\# which is smaller and is known to contain, very few of these L-functions. The larger class is obtained by weakening the requirement for absolute convergence, allowing a finite number of poles, allowing more general gamma factors and by allowing the series to have trivial zeros to the right of Re(s)=1/2, while retaining the other axioms of the extended Selberg class. We will classify series in A\# of degree d when d 1 (when d=1, we will assume absolute convergence in Re(s)>1). We will further prove a primitivity result for the L-functions of cuspidal eigenforms on GL2( A Q) and a theorem allowing us to compare the zeros of tensor product L-functions of GLn( AK) which cannot be deduced from previous classification results. The second class G\#⊂A\#, which also contains S\#, more closely models the behaviour of L-functions of unitary globally generic representations of GLn( AK).