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Abstract
We classify Chabauty limits of groups fixed by various (abstract) involutions over SL(2,F), where F is a finite field-extension of Q_p, with p>2. To do so, we first classify abstract involutions over SL(2,F) with F a quadratic extension of Q_p, and prove p-adic polar decompositions with respect to various subgroups of p-adic SL_2. Then we classify Chabauty limits of: Then we classify Chabauty limits of: SL(2,F) ⊂ SL(2,E), where E is a quadratic extension of F, of SL(2,R) ⊂ SL(2,C), and of H_θ⊂SL(2,F), where H_θ is the fixed point group of an F-involution θ over SL(2,F).
Original language | English |
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Journal | Communications in Algebra |
Volume | 52 |
Issue | 4 |
Pages (from-to) | 1408-1431 |
Number of pages | 24 |
ISSN | 0092-7872 |
DOIs | |
Publication status | Published - 2024 |
Keywords
- Chabauty topology
- buildings
- groups of involutions
- polar decomposition
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