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Brown, Kenneth S · 1987 · DOI 10.1016/0022-4049(87)90015-6

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A proof of Powell's conjecture on the Goeritz group of $S^3$

math.GT · 2026-05-21 · unverdicted · novelty 8.0

Proves Powell's conjecture that the Goeritz group for genus g≥3 Heegaard splittings of S³ is generated by four elements, using the topological minimality of the Heegaard surface.

Forest Diagrams and Lengths for the Generalised Thompson's Group $F(n)$

math.GR · 2026-05-07 · unverdicted · novelty 5.0

Extended forest diagrams yield a new length formula for F(n) and confirm dead-end elements always have depth two.

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A proof of Powell's conjecture on the Goeritz group of $S^3$ math.GT · 2026-05-21 · unverdicted · none · ref 15
Proves Powell's conjecture that the Goeritz group for genus g≥3 Heegaard splittings of S³ is generated by four elements, using the topological minimality of the Heegaard surface.
Forest Diagrams and Lengths for the Generalised Thompson's Group $F(n)$ math.GR · 2026-05-07 · unverdicted · none · ref 4
Extended forest diagrams yield a new length formula for F(n) and confirm dead-end elements always have depth two.

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