Improved upper bounds for the number of points on curves over finite fields
Abstract
We give new arguments that improve the known upper bounds on the maximal number Nq(g) of rational points of a curve of genus g over a finite field Fq for a number of pairs (q,g). Given a pair (q,g) and an integer N, we determine the possible zeta functions of genus-g curves over Fq with N points, and then deduce properties of the curves from their zeta functions. In many cases we can show that a genus-g curve over Fq with N points must have a low-degree map to another curve over Fq, and often this is enough to give us a contradiction. In particular, we able to provide eight previously unknown values of Nq(g), namely: N4(5) = 17, N4(10) = 27, N8(9) = 45, N16(4) = 45, N128(4) = 215, N3(6) = 14, N9(10) = 54, and N27(4) = 64. Our arguments also allow us to give a non-computer-intensive proof of the recent result of Savitt that there are no genus-4 curves over F8 having exactly 27 rational points. Furthermore, we show that there is an infinite sequence of q's such that for every g with 0 < g < log2 q, the difference between the Weil-Serre bound on Nq(g) and the actual value of Nq(g) is at least g/2.
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