A Note on Cyclotomic Function Fields with Quadratic Modulus
Abstract
A longstanding and important problem in algebraic geometry is the characterization of algebraic function fields. In this paper, we focus on the characterization problem for cyclotomic function field L(M), which is an important class of explicit function fields with applications in number theory and coding theory. Motivated by Arakelian and Quoos' classification of L(M) with an irreducible quadratic modulus, we provide a complete characterization of the cyclotomic function field L(M) with modulus M = x2. More precisely, we prove that a function field F over Fq is Fq-isomorphic to L(x2) if and only if it satisfies the following three conditions: (i) F has a subgroup G isomorphic to the direct product (Fq,+) × Fq*; (ii) its genus is g(F) = 1 + q(q-3)/2; and (iii) the cardinality of Fq-rational places is exactly q+1.
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