Non-abelian amplification and bilinear forms with Kloosterman sums
Abstract
We introduce a new method to bound bilinear (Type II) sums of Kloosterman sums with composite moduli c, using Fourier analysis on SL2(Z/cZ) and an amplification argument with non-abelian characters. For sums of length c, our method produces a non-trivial bound for all moduli except near-primes, saving c-1/12 for products of two primes of the same size. Combining this with previous results for prime moduli, we achieve savings beyond the Pólya-Vinogradov range for all moduli. We give applications to moments of twisted cuspidal L-functions, and to large sieve inequalities for exceptional cusp forms with composite levels.
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