Linear independence of periods for the symmetric square L-functions
Abstract
For Sk, the space of cusp forms of weight k for the full modular group, we first introduce periods on Sk associated to symmetric square L-functions. We then prove that for a fixed natural number n, if k is sufficiently large relative to n, then any n such periods are linearly independent. With some extra assumption, we also prove that for k≥ e12, we can always pick up to k4 arbitrary linearly independent periods.
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