Given a parameter (x,lambda,nu) we can obtain information about
the cuspidal data used to construct the representation. Let us review the parameters of all the representations of \(G=SL(2,\mathbb R)\) with infinitesimal character rho
Recall that the Cartan subgroup for this parameter is the split Cartan subgroup:
atlas> set x=x(t)
Variable x: KGBElt
atlas> x
Value: KGB element #2
atlas> set H=Cartan_class(x)
Variable H: CartanClass (overriding previous instance, which had type string (constant))
atlas> H
Value: Cartan class #1, occurring for 1 real form and for 2 dual real forms
atlas> print_Cartan_info(H)
compact: 0, complex: 0, split: 1
canonical twisted involution: 1
twisted involution orbit size: 1; fiber size: 1; strong inv: 1
imaginary root system: empty
real root system: A1
complex factor: empty
atlas>
So, we can extract the character of the Cartan subgroup by finding the Cuspidal
data for the representation with parameter t.
The standard representation containing the trivial is induced from a
parabolic subgroup P with Levi factor equal to \(GL(1,R)\) and a
character q of \(GL(1,R)\) with lambda=0 and nu=1.
Moreover, we can see that when we induce we obtain the composition series
of the spherical principal series that contains the trivial
representation and the two discrete series
So, we get the irreducible, non-spherical principal series by inducing
the character on \(GL(1,R)\) with lambda and nu both equal
to 1 and from the same parabolic subgroup as in the previous
case.
We can look at another example with non-integral infinitesimal character: