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Darboux type theorems in multisymplectic geometry

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arxiv 2503.03672 v3 pith:BYHAPEID submitted 2025-03-05 math.SG

Darboux type theorems in multisymplectic geometry

classification math.SG
keywords typetheoremsdarbouxgeometrylinearmultisymplecticadmitsautomatic
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We give a survey of Darboux type theorems in multisymplectic geometry. These theorems establish when a closed differential form of a certain type admits a constant-coefficient expression in some local coordinate system. Beyond the classical cases of symplectic and volume forms, 0-deformability (i.e. constancy of linear type) is typically not automatic and has to be imposed, leading to distinct theorems 'per linear type'.

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. The Spencer cohomology and integrability of multisymplectic structures

    math.DG 2026-07 conditional novelty 7.0

    Multisymplectic structures of constant linear type are studied as G-structures; flatness conditions are given via Spencer cohomology, and 3-forms with obstructions to integrability of arbitrary order are constructed.

  2. Classification of nilpotent and semisimple fourvectors of a real eight-dimensional space

    math.RT 2025-11 unverdicted novelty 6.0

    SL(8,R) orbits on ∧⁴R⁸ are classified into nilpotent and semisimple types, with the semisimple orbits falling into 1441 parametrized classes.