Constructs and classifies all differential symmetry breaking operators for principal series representations of the de Sitter and Lorentz groups, proving localness and sporadic character.
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2 Pith papers cite this work. Polarity classification is still indexing.
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Pith papers citing it
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math.RT 2years
2025 2verdicts
UNVERDICTED 2representative citing papers
The paper gives a complete classification of differential symmetry breaking operators from rank-(2N+1) vector bundles over S^3 to line bundles over S^2 for the pair (SO0(4,1), SO0(3,1)) when |m|=N.
citing papers explorer
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On sporadic symmetry breaking operators for principal series representations of the de Sitter and Lorentz groups
Constructs and classifies all differential symmetry breaking operators for principal series representations of the de Sitter and Lorentz groups, proving localness and sporadic character.
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Construction and classification of differential symmetry breaking operators for principal series representations of the pair $(SO_0(4,1), SO_0(3,1))$ for special parameters
The paper gives a complete classification of differential symmetry breaking operators from rank-(2N+1) vector bundles over S^3 to line bundles over S^2 for the pair (SO0(4,1), SO0(3,1)) when |m|=N.