А. В. Иванов scite author profile

A new approach to N = 2 supersymmetry based on the concept of harmonic superspace is proposed and is used to give an unconstrained superfield geometric description of N = 2 super Yang-Mills and supergravity theories as well as of matter N = 2 hypermultiplets. The harmonic N = 2 superspace has as independent coordinates, in addition to the usual ones, the isospinor harmonics u : on the sphere SU(2)/U(l). The role of u : is to relate the SU(2) group realised on the component fields to a U ( l ) group acting on the relevant superfields. Their introduction makes it possible to SU(2)-covariantise the notion of Grassmann analyticity. Crucial for our construction is the existence of an analytic subspace of the general harmonic N = 2 superspace. The hypermultiplet superfields and the true prepotentials (pre-prepotentials) of N = 2 super Yang-Mills and supergravity are unconstrained superfunctions over this analytic subspace. The pre-prepotentials have a clear geometric interpretation as gauge connections with respect to the internal SU(2)/U( 1) directions. A radically new feature arises: the number of gauge and auxiliary degrees of freedom becomes infinite while the number of physical degrees of freedom remains finite. Other new results are the massive N = 2 Yang-Mills theory and various off-shell selfinteractions of hypermultiplets. The propagators for matter and Yang-Mills superfields are given.

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Unconstrained N = 2 matter, Yang-Mills and supergravity theories in harmonic superspace

Galperin¹,

Иванов²,

Kalitzin³

et al. 1985

Class. Quantum Grav.

225

497

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Two-loop cutoff renormalization of 4-D Yang–Mills effective action

Иванов

Kharuk

2020

J. Phys. G: Nucl. Part. Phys.

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In the paper we study the Yang–Mills effective action in the four-dimensional spacetime by using background field formalism. We give an explicit way of cutoff regularization procedure, then do a two-loop renormalization and calculate a second β-function coefficient. We also show that the two-loop singularity contains only logarithmic part in the first degree. At the same time additional properties of a Green function regular part are obtained.

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Hölder estimates for a natural class of equations of the type of fast diffusion

Иванов¹

1998

J Math Sci

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