Mathematics – Number Theory
Scientific paper
2006-08-15
Mathematics
Number Theory
AMS-LaTeX, 30 pages, final version, to appear on the Mathematical Proceedings of the Cambridge Philosophical Society
Scientific paper
Let S_{w+2}(\Gamma_0(N)) be the vector space of cusp forms of weight w+2 on the congruence subgroup \Gamma_0(N). We first determine explicit formulas for period polynomials of elements in S_{w+2}(\Gamma_0(N)) by means of Bernoulli polynomials. When N=2, from these explicit formulas we obtain new bases for S_{w+2}(\Gamma_0(2)), and extend the Eichler-Shimura-Manin isomorphism theorem to \Gamma_0(2). This implies that there are natural correspondences between the spaces of cusp forms on \Gamma_0(2) and the spaces of period polynomials. Based on these results, we will find explicit form of Hecke operators on S_{w+2}(\Gamma_0(2)). As an application of our main theorems, we will also give an affirmative answer to a speculation of Imamo\=glu and Kohnen on a basis of S_{w+2}(\Gamma_0(2)).
Fukuhara Shinji
Yang Yifan
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