On Tate's conjecture for elliptic modular surfaces over finite fields
Abstract
For N≥ 3, we show Tate's conjecture for the elliptic modular surface E(N) of level N over Fp for a prime p satisfying p 1 N outside of a set of primes of density zero. We also prove a strong form of Tate's conjecture for E(N) over any finite field of characteristic p prime to N under the assumption that the formal Brauer group of E(N) is of finite height.
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