Abstract:
We consider the Weil restriction of a connected reductive algebraic group over a
number field to the rational numbers. For a level structure in the group of its adelic
points, we form an adelic locally symmetric space. A finite-dimensional, algebraic,
irreducible representation of the group of real points of the Weil restriction induces an
associated sheaf on this space.
Raghuram and Bhagwat found certain necessary conditions for non-vanishing of the
cuspidal part of the respective sheaf cohomology in case of the general linear group
under some additional assumptions on the number field and the weight of the
representation. Motivated by this, we estimate the growth rate of cuspidal cohomology
with varying level structure as well as weight in case of automorphic induction from
GL(1) over imaginary quadratic fields to GL(2) over the rationals and also that of
symmetric square transfer from GL(2) to GL(3); both over the rationals.
We also present bounds on the dimension of the total sheaf cohomology which apply to
an arbitrary connected reductive algebraic group with varying level structure or weight.
The bounds thus obtained are consistent with the classical dimension formulae as well
as several known results.
