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  "path": "/abs/2604.24445v1",
  "publishedAt": "2026-04-28T00:00:00.000Z",
  "site": "https://arxiv.org",
  "tags": [
    "Kenta Watanabe"
  ],
  "textContent": "**Authors:** Kenta Watanabe\n\nFor a smooth irreducible curve $C$, its second gonality $d_2$ is defined to be the minimum integer $d$ such that $C$ admits a linear series $g_d^2$. In this paper, we compute the second gonality of a smooth aCM curve $C$ lying on a smooth quartic surface in $\\mathbb{P}^3$, whose Clifford index is computed by a net on $C$.",
  "title": "Second gonality of smooth aCM curves on quartic surfaces in $\\mathbb{P}^3$"
}