Rational points on cubic surfaces and AG codes from the Norm-Trace curve
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In this paper we give a complete characterization of the intersections between the Norm-Trace curve over 𝔽_q^3 and the curves of the form y=ax^3+bx^2+cx+d, generalizing a previous result by Bonini and Sala, providing more detailed information about the weight spectrum of one-point AG codes arising from such curve. We also derive, with explicit computations, some general bounds for the number of rational points on a cubic surface defined over 𝔽_q.
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