Kato T, Martens G (2019)
Publication Type: Journal article
Publication year: 2019
Book Volume: 56
Pages Range: 277-288
Journal Issue: 2
We say that a curve X of genus g has maximally computed Clifford index if the Clifford index c of X is, for c > 2, computed by a linear series of the maximum possible degree d < g; then d = 2c + 3 resp. d = 2c + 4 for odd resp. even c. For odd c such curves have been studied in [6]. In this paper we analyze if/how far analoguous results hold for such curves of even Clifford index c.
APA:
Kato, T., & Martens, G. (2019). CURVES WITH MAXIMALLY COMPUTED CLIFFORD INDEX. Osaka Journal of Mathematics, 56(2), 277-288.
MLA:
Kato, Takao, and Gerriet Martens. "CURVES WITH MAXIMALLY COMPUTED CLIFFORD INDEX." Osaka Journal of Mathematics 56.2 (2019): 277-288.
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