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Abstract
We derive an elementary formula for the trace of a Hecke operator acting on a space of algebraic modular forms, as a sum of character values. We describe explicit computations in the case of the unitary group 
that make possible the determination of the eigenvalues of a certain Hecke operator. This produces numerical evidence for a 
analogue of Harder’s conjecture, on congruences between Hecke eigenvalues modulo divisors of critical L-values.
Acknowledgments
I thank G. Harder, D. Loeffler, and J. Tilouine, whose helpful contributions have been noted at various points, and H. Katsurada for directing me to his preprint [CitationKatsurada 10].
Notes
1For this fact, see the L-functions and modular forms database, available at http://www.lmfdb.org/ModularForm/GL2/Q/holomorphic/3/9/1/ .