An algorithm computes the Pyasetskii involution for symplectic, odd orthogonal, and orthogonal groups by merging existing methods for GL_n and bad-parity cases.
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Formulates a new upper-bound conjecture for wavefront sets of p-adic group representations, reduces it to anti-discrete series, and proves equivalence to the Jiang conjecture on Arthur packets plus an ABV-packet analog.
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Algorithms on the Pyasetskii involution on local Langlands parameters of classical groups
An algorithm computes the Pyasetskii involution for symplectic, odd orthogonal, and orthogonal groups by merging existing methods for GL_n and bad-parity cases.
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On the upper bound of wavefront sets of representations of p-adic groups
Formulates a new upper-bound conjecture for wavefront sets of p-adic group representations, reduces it to anti-discrete series, and proves equivalence to the Jiang conjecture on Arthur packets plus an ABV-packet analog.