Zero curvature conditions and conformal covariance

Akemann G, Grimm R (1993)
J.Math.Phys. 34(2): 818-835.

Journal Article | Published | English

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Two‐dimensional zero curvature conditions with special emphasis on conformal properties are investigated in detail and the appearance of covariant higher order differential operators constructed in terms of a projective connection is elucidated. The analysis is based on the Kostant decomposition of simple Lie algebras in terms of representations with respect to their ‘‘principal’’ SL(2) subalgebra.
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Akemann G, Grimm R. Zero curvature conditions and conformal covariance. J.Math.Phys. 1993;34(2):818-835.
Akemann, G., & Grimm, R. (1993). Zero curvature conditions and conformal covariance. J.Math.Phys., 34(2), 818-835.
Akemann, G., and Grimm, R. (1993). Zero curvature conditions and conformal covariance. J.Math.Phys. 34, 818-835.
Akemann, G., & Grimm, R., 1993. Zero curvature conditions and conformal covariance. J.Math.Phys., 34(2), p 818-835.
G. Akemann and R. Grimm, “Zero curvature conditions and conformal covariance”, J.Math.Phys., vol. 34, 1993, pp. 818-835.
Akemann, G., Grimm, R.: Zero curvature conditions and conformal covariance. J.Math.Phys. 34, 818-835 (1993).
Akemann, Gernot, and Grimm, R. “Zero curvature conditions and conformal covariance”. J.Math.Phys. 34.2 (1993): 818-835.
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