A generalization of Bring's curve in any characteristic
Abstract
Let p 7 be a prime, and m 5 an integer. A natural generalization of Bring's curve valid over any field K of zero characteristic or positive characteristic p, is the algebraic variety V of PG(m-1,K) which is the complete intersection of the projective algebraic hypersurfaces of homogeneous equations x1k+·s +xmk=0 with 1≤ k≤ m-2. In positive characteristic, we also assume m p-1. Up to a change of coordinates in PG(m-1,K), we show that V is a projective, absolutely irreducible, non-singular curve of PG(m-2,K) with degree (m-2)!, genus g= 14 ((m-2)(m-3)-4)(m-2)!+1, and tame automorphism group G isomorphic to Symm. We compute the genera of the quotient curves of V with respect to the stabilizers of one or more coordinates under the action of G. In positive characteristic, the two extremal cases, m=5 and m=p-1 are investigated further. For m=5, we show that there exist infinitely many primes p such that V is Fp2-maximal curve of genus 4. The smallest such primes are 29,59,149,239,839. For m=p-1 we prove that V has as many as (p-2)! points over Fp and has no further points over Fp2. We also point out a connection with previous work of R\'edei about the famous Minkowski conjecture proven by Haj\'os (1941), as well as with a more recent result of Rodr\'iguez Villegas, Voloch and Zagier (2001) on plane curves attaining the St\"ohr-Voloch bound, and the regular sequence problem for systems of diagonal equations introduced by Conca, Krattenthaler and Watanabe (2009).
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