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Seidel, Paul , TITLE = · 2008 · DOI 10.4171/063

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Modular variants of p-adic fundamental sequence

math.NT · 2026-06-10 · unverdicted · novelty 5.0

Any Farey triangle corresponds to a variant of the Colmez-Fontaine fundamental lemma, with the original lemma matching the triangle (1/0, 1/1, 0/1).

From Morse Trees to $J$-Holomorphic Discs -- Rigid Y-Graphs

math.SG · 2026-06-08 · unverdicted · novelty 5.0

Existence of at least one J-holomorphic disc is shown for every sufficiently small height parameter from any rigid transversely cut-out Y-Morse tree via obstruction bundle gluing.

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Modular variants of p-adic fundamental sequence math.NT · 2026-06-10 · unverdicted · none · ref 97
Any Farey triangle corresponds to a variant of the Colmez-Fontaine fundamental lemma, with the original lemma matching the triangle (1/0, 1/1, 0/1).
From Morse Trees to $J$-Holomorphic Discs -- Rigid Y-Graphs math.SG · 2026-06-08 · unverdicted · none · ref 68
Existence of at least one J-holomorphic disc is shown for every sufficiently small height parameter from any rigid transversely cut-out Y-Morse tree via obstruction bundle gluing.

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