In this article, we present some new properties of representations of Yang-Mills algebras. We first show that any free Lie algebra with m generators is a quotient of the Yang-Mills algebra 𝔶𝔪(n) on n generators, for n ≥ 2m. We derive from this that any semisimple Lie algebra and even any affine Kac-Moody algebra is a quotient of 𝔶𝔪(n) for n ≥ 4. Combining this with previous results on representations of Yang-Mills algebras given in [Herscovich and Solotar, Ann. Math. 173(2), 1043–1080 (2011)], one may obtain solutions to the Yang-Mills equations by differential operators acting on sections of twisted vector bundles on the affine space of dimension n ≥ 4 associated to representations of any semisimple Lie algebra. We also show that this quotient property does not hold for n = 3, since any morphism of Lie algebras from 𝔶𝔪(3) to 𝔰𝔩(2, k) has in fact solvable image.
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January 2015
Research Article|
January 15 2015
Some remarks on representations of Yang-Mills algebras
Estanislao Herscovich
Estanislao Herscovich
a)
Departamento de Matemática, FCEyN,
Universidad de Buenos Aires
, Buenos Aires, Argentina
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a)
The author is also a research member of CONICET (Argentina).
J. Math. Phys. 56, 011702 (2015)
Article history
Received:
October 26 2014
Accepted:
December 31 2014
Citation
Estanislao Herscovich; Some remarks on representations of Yang-Mills algebras. J. Math. Phys. 1 January 2015; 56 (1): 011702. https://doi.org/10.1063/1.4905857
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