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References
R.Penrose, Conformal treatment of infinity, in: Relativity, Groups and Topology, ed. C.M.De Witt and B.De Witt, Les Houches Summer School, 1963(Gordon and Breach N.Y.; 1964) pp. 565–584.
N.A.Chernikov, E.A.Tagirov, Quantum theory of scalar field in de Sitter space-time, Ann. Inst. H.Poincaré 9, 109 (1968).
A.Z.Petrov, New Methods in General Relativity (Nauka, M., 1965); see also
A.Z.Petrov, Einstein Spaces (Pergamon Press, Oxford, 1969) (especially Chapter 6, pp. 257–275).
S.Fubini, A new approach to conformal invariant field theories, Nuevo CÃmento 34A, 521 (1976).
L.N.Lipatov, Divergence of the perturbation series and pseudoparticles, Zh. Eksp. Teor. Fiz., Pisma 25, 116 (1977).
L.Castell, Exact solutions of the λϕ4 theory, Phys. Rev. D6, 536 (1972).
A.A.Belavin, A.M.Polyakov, A.S.Schwartz, Yu.S.Tyupkin, Pseudoparticle solutions of the Yang-Mills equations, Phys. Letters 59B, 85 (1975).
J.Cervero, L.Jacobs, C.Nohl, Elliptic solutions of classical Yang-Mills theory, Phys. Letters 69B, 351 (1977).
W.Bernreuther, A note on classical solutions of the Yang-Mills equations in Minkowski space, C.T.P. Publ. 626, MIT (1977).
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Tagirov, E.A., Todorov, I.T. (1978). A geometric approach to the solution of conformal invariant field equations. In: Dell'Antonio, G., Doplicher, S., Jona-Lasinio, G. (eds) Mathematical Problems in Theoretical Physics. Lecture Notes in Physics, vol 80. Springer, Berlin, Heidelberg. https://doi.org/10.1007/3-540-08853-9_37
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