On the existence of non-special divisors of degree g and g-1 in algebraic function fields over q
Abstract
We study the existence of non-special divisors of degree g and g-1 for algebraic function fields of genus g≥ 1 defined over a finite field q. In particular, we prove that there always exists an effective non-special divisor of degree g≥ 2 if q≥ 3 and that there always exists a non-special divisor of degree g-1≥ 1 if q≥ 4. We use our results to improve upper and upper asymptotic bounds on the bilinear complexity of the multiplication in any extension qn of q, when q=2r≥ 16.
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