A study of H. Martens' Theorem on chains of cycles
Abstract
Let be a chain of cycles of genus g. Let d,r be integers with 1 ≤ r ≤ g-2 and 2r≤ d ≤ g-3+r. Then wrd()=d-2r implies is hyperelliptic. For each g ≥ 2r+3 there exist non-hyperelliptic chains of cycles satisfying wrg-2+r()=g-2-r. In the case of algebraic curves such equality implies the curve is hyperelliptic. In particular we obtain the existence of chains of cycles such that wrg-2+r() ≠ w1g-r() in case r ≥ 2. In the case of algebraic curves such numbers are equal because of the Riemann-Roch Theorem.
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