164 J.W. COGDELL, £-FUNCTIONS FOR GLnstates that to 7r and u should be associated an automorphic representation IT of
GLn(A) for which L(s, 7r, u) = L(s, IT) among other things.
If we assume the Local Langlands Conjecture for each local group H(kv) then
this global F\mctoriality is easy to formulate. We first take 7r and decompose it into
its local components 7r = &/7rv· For each lo cal representation 7rv we apply our local
lifting diagram:LH __ u ___. Le
1rv >------>W' k v
Then piecing the local representations ITv together we obtain an irreducible admis-
sible representation IT = @'ITv of GLn(A). Langlands' Principle of Functoriality
then says that IT should be automorphic. Then IT would be the global Langlands
lift or transfer of 7r associated to the L-homomorphism u. Note that in this case
we would have the equality of L-and €-factorsL(s, 7r, u) =II L(s, 7rv, u) =II L(s, ITv) = L(s, IT)
v v
and
c(s, 7r, u) =II c(s, 7rv, u, 'l/Jv) =II c(s, ITv, 'l/Jv) = c(s, IT)
v v
as well as equalities for the twisted versions with representations 7r^1 of GLm(A)
L(s, 7r x 7r^1 , u 0 L) = L(s, IT x 7r^1 )for cuspidal automorphic representations of GLm(A), where l: GLm(<C) -+ GLm(<C)
is the identity map viewed as an L-homomorphism, and the related equalities of
€-factors.
In general, as noted above, there will be a finite set S of finite places of k for
which we do not know the local Langlands conjecture for H(kv)· So for any finite
set of finite places S we will call an automorphic representation IT of GLn(A) a
global Langlands lift of 7r if for every v tJ_ S we have that ITv is the lo cal Langlands
lift of 7rv. In particular this will imply an equality of partial L-functions
L^8 (s , 7r,u) = L^8 (s,IT)
as well as the related equalities of €-factors and twisted versions.6.2. Functoriality and the Converse Theorem
It should now be clear how one can apply the Converse Theorem to establish lift-
ings or transfers from split connected reductive groups H to an appropriate GLN
associated to an L-homomorphism u: LH-+ GLN(<C). There are essentially three
steps.
- Construction of a candidate lift. We begin with a cuspidal automorphic
representation 7r = @^1 7rv of H(A). Assume that for each place v we can construct