A RELATIVE TRACE FORMULA BETWEEN THE GENERAL LINEAR AND THE METAPLECTIC GROUP
Let F be a number field with ring of adeles and let be a quadratic extension. We prove part of a relative trace identity between and the metaplectic group As consequences, we expect a generalization of work of Kohnen and a verification of a conjecture of Furusawa and Martin characterizing -distinction of a cuspidal representation of
relative trace formula, period integrals.
