An Algorithm for Aubert–Zelevinsky Duality\a la M{\oe}glin–Waldspurger

Thomas Lanard, Alberto M´ ınguez · 2025 · arXiv 2509.13231

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Algorithms on the Pyasetskii involution on local Langlands parameters of classical groups

math.RT · 2026-04-13 · unverdicted · novelty 6.0

An algorithm computes the Pyasetskii involution for symplectic, odd orthogonal, and orthogonal groups by merging existing methods for GL_n and bad-parity cases.

AI for Mathematics: Progress, Challenges, and Prospects

math.HO · 2026-01-19 · unverdicted · novelty 4.0

AI for math combines task-specific architectures and general foundation models to support research and advance AI reasoning capabilities.

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Algorithms on the Pyasetskii involution on local Langlands parameters of classical groups math.RT · 2026-04-13 · unverdicted · none · ref 27 · internal anchor
An algorithm computes the Pyasetskii involution for symplectic, odd orthogonal, and orthogonal groups by merging existing methods for GL_n and bad-parity cases.
AI for Mathematics: Progress, Challenges, and Prospects math.HO · 2026-01-19 · unverdicted · none · ref 89 · internal anchor
AI for math combines task-specific architectures and general foundation models to support research and advance AI reasoning capabilities.

An Algorithm for Aubert–Zelevinsky Duality\a la M{\oe}glin–Waldspurger

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