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Higher Haantjes Brackets and Integrability

Giorgio Tondo, Piergiulio Tempesta

2021ArTS Archivio della ricerca di Trieste (University of Trieste https://www.units.it/)11 citationsDOIOpen Access PDF

Abstract

We propose a new, infinite class of brackets generalizing the Frölicher– Nijenhuis bracket. This class can be reduced to a family of generalized Nijenhuis torsions recently introduced. In particular, the Haantjes bracket, the first example of our construc- tion, is relevant in the characterization of Haantjes moduli of operators. We also prove that the vanishing of a higher-level Nijenhuis torsion of an operator field is a sufficient condition for the integrability of its eigen-distributions. This result (which does not re- quire any knowledge of the spectral properties of the operator) generalizes the celebrated Haantjes theorem. The same vanishing condition also guarantees that the operator can be written, in a local chart, in a block-diagonal form.

Topics & Concepts

MathematicsOperator (biology)BracketDiagonalModuliPure mathematicsClass (philosophy)Torsion (gastropod)Algebra over a fieldField (mathematics)Computer scienceGeometryPhysicsArtificial intelligenceSurgeryGeneMedicineRepressorMechanical engineeringEngineeringBiochemistryQuantum mechanicsChemistryTranscription factorNonlinear Waves and SolitonsQuantum chaos and dynamical systemsBlack Holes and Theoretical Physics