A Goppa-like bound on the trellis state complexity of algebraic geometric codes

Abstract

For a linear code of length n and dimension k, Wolf noticed that the trellis state complexity s() of is upper bounded by w():=(k,n-k). In this paper we point out some new lower bounds for s(). In particular, if is an Algebraic Geometric code, then s()≥ w()-(g-a), where g is the genus of the underlying curve and a is the abundance of the code.

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