A general principle, discovered by Robert Langlands and named by
him the "functoriality principle," predicts relations between
automorphic forms on arithmetic subgroups of different reductive
groups. Langlands functoriality relates the eigenvalues of Hecke
operators acting on the automorphic forms on two groups (or the
local factors of the "automorphic representations" generated by
them). In the few instances where such relations have been probed,
they have led to deep arithmetic consequences.
This book studies one of the simplest general problems in the
theory, that of relating automorphic forms on arithmetic subgroups
of GL(n, E) and GL(n, F) when E/F is a cyclic extension of number
fields. (This is known as the base change problem for GL(n).) The
problem is attacked and solved by means of the trace formula. The
book relies on deep and technical results obtained by several
authors during the last twenty years. It could not serve as an
introduction to them, but, by giving complete references to the
published literature, the authors have made the work useful to a
reader who does not know all the aspects of the theory of
automorphic forms.
General
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