Combinatorial Approach to ABV-packets for GL_n
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There exists a significant conjecture in the local Langlands correspondence that A-packets are ABV-packets. For the case $G=GL_n$, the conjecture reduces to ABV-packets for orbits of Arthur type in $GL_n$ being singletons, which is a specialisation of the wider conjecture known as the Open-Orbit conjecture. In this paper, we will prove the reduced conjecture since there exists a nice combinatorial description. The result first appeared in the associated Master's thesis, however we aim to use a slightly more simplified and succinct approach in this paper using results of Knight and Zelevinskii. We will also prove the partial ordering relation associated to the conjecture for multisegments of ladder type.
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Forward citations
Cited by 2 Pith papers
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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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Functoriality and the theta correspondence
Functoriality of the local theta correspondence for classical p-adic groups is realized through adaptation of the Adams conjecture to ABV-packets, with evidence given particularly for general linear groups.
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