On the linear bounds on genera of pointless hyperelliptic curves
Abstract
An irreducible smooth projective curve over F\q is called pointless if it has no F\q-rational points. In this paper we study the lower existence bound on the genus of such a curve over a fixed finite field F\q. Using some explicit constructions of hyperelliptic curves, we establish two new bounds that depend linearly on the number q. In the case of odd characteristic this improves upon a result of R. Becker and D. Glass. We also provide a similar new bound when q is even.
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