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I. L. Bukhbinder S. M. Kuzenko O. A. Solov'ev 《Theoretical and Mathematical Physics》1990,82(1):52-57
Lenin Komsomol State Pedagogical Institute, Tomsk. Translated from Teoreticheskaya i Matematicheskaya Fizika, Vol. 82, No. 1, pp. 75–82, January, 1990. 相似文献
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This Letter constructs an exact field redefinition that maps the Akulov–Volkov action to that recently studied by Komargodski and Seiberg in [Z. Komargodski, N. Seiberg, JHEP 0909 (2009) 066, arXiv:0907.2441]. This is then used to study the off-shell supersymmetry properties of the Komargodski–Seiberg action. It is also shown that the approach advocated in [A.A. Zheltukhin, Phys. Rev. D 82 (2010) 085005, arXiv:1003.4143v2] and [A.A. Zheltukhin, On equivalence of the Komargodski–Seiberg action to the Volkov–Akulov action, arXiv:1009.2166] for deriving such a field redefinition is inconsistent. 相似文献
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We review the construction of the N = 2 supersymmetric completion of a scalar curvature squared term given in [1] both in superspace and components in a completely gauge independent form. 相似文献
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In gauge theories, not all rigid symmetries of the classical action can be maintained manifestly in the quantization procedure, even in the absence of anomalies. If this occurs for an anomaly-free symmetry, the effective action is invariant under a transformation that differs from its classical counterpart by quantum corrections. In this note, we set up a harmonic superspace formalism for computing quantum deformations of superconformal symmetry in the N = 4 supersymmetric Yang–Mills theory. 相似文献
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