Relative Trace Formula And Simultaneous Nonvanishing for GL3 x GL2 and GL3 x GL1 L-functions
Abstract
Fix a Dirichlet character and a cuspidal GL(2) eigenform φ with relatively prime conductors. Then we show that there are infinitely many cusp forms π on GL(3) such that L(1/2, π × ) and L(1/2, π × φ) are simultaneously non-zero. We achieve this by use of Jacquet's Relative Trace Formula. We derive an expression of the average over the GL(3) cuspidal spectrum as a sum of a non-zero main term and two subsidiary terms which are forced to be zero for large enough level by use of a suitable test function. This modest article is dedicated to the memory of Harish Chandra, on the occasion of his hundredth birthday.
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