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NSR database version of May 6, 2024.

Search: Author = A.G.Baryshnickov

Found 16 matches.

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1988BA74      Yad.Fiz. 48, 1273 (1988)

A.G.Baryshnikov, L.D.Blokhintsev, I.M.Narodetsky, D.A.Savin

The Quark Compound Bag Method in the Four-Nucleon Problem

NUCLEAR STRUCTURE ⁴He; calculated binding energy. Quark compound bag.

1986BA15      Ukr.Fiz.Zh. 31, 16 (1986)

A.G.Baryshnikov, L.D.Blokhintsev, S.P.Krekoten, A.N.Safronov

Positive Kaon Scattering by ²H, ³He and ⁴He Nuclei

NUCLEAR REACTIONS ²H, ^3,4He(K⁺, K⁺), E=5-120 MeV; calculated σ(θ). K-matrix approach.

1986BA73      Izv.Akad.Nauk SSSR, Ser.Fiz. 50, 1962 (1986); Bull.Acad.Sci.USSR, Phys.Ser. 50, No.10, 90 (1986)

A.G.Baryshnikov, L.D.Blokhintsev, R.Kapote, D.A.Savin

Resonant Mechanism of the Reaction tt → αnn at very Low Incident Energy

NUCLEAR REACTIONS ³H(t, nα), E=low; calculated σ(Eα), σ(En). ⁵He deduced resonance excitation mechanism.

1984BA17      Izv.Akad.Nauk SSSR, Ser.Fiz. 48, 149 (1984); Bull.Acad.Sci.USSR, Phys.Ser. 48, No.1, 151 (1984)

A.G.Baryshnikov, L.D.Blokhintsev, S.P.Kretkoren

Inclusion of Triangle Diagrams in the Process N + T → N + T in K-Matrix Scattering and Reaction Calculations in Four Nucleon Systems

NUCLEAR REACTIONS ³H(p, n), E=12.4, 21, 30 MeV; ³He(n, p), E=14.4 MeV; ²H(d, p), E=25.3, 83 MeV; calculated σ(θ). K-Matrix formalism, triangle diagram inclusion.

1982BA14      Izv.Akad.Nauk SSSR, Ser.Fiz. 46, 166 (1982)

A.G.Baryshnikov, E.I.Dolinsky, S.P.Krekoten

Inclusion of Coulomb Effects in the Description of the Reactions (p, p') and (p, n) with Basic Mechanism Corresponding to the Triangle Diagram.

NUCLEAR REACTIONS ⁹Be(p, p'), E=6.4 MeV; ¹³C(p, p'), E=6 MeV; ¹³C(p, n), E=30 MeV; calculated σ(θ). Triangle diagram method, Coulomb effects.

1981BA50      Izv.Akad.Nauk SSSR, Ser.Fiz. 45, 169 (1981)

A.G.Baryshnikov, E.I.Dolinsky, S.P.Krekoten

Description of the (p, n) and (p, p') Reactions and the Basic Mechanism Consistent with the Feynman Triangle Diagrams

NUCLEAR REACTIONS ¹²C(p, n), E=30, 50 MeV; ⁹Be(p, p'), E=6.4 MeV; calculated σ(θ); deduced reaction mechanism. Feynman triangle diagrams.

Data from this article have been entered in the EXFOR database. For more information, access X4 datasetF0305.

1980BA55      Yad.Fiz. 32, 369 (1980); Sov.J.Nucl.Phys. 32, 191 (1980)

A.G.Baryshnikov, V.B.Belyaev, L.D.Blokhintsev, B.F.Irgaziev, Yu.V.Orlov

Scattering and Reactions in a 4-Nucleon System within the Framework of the K-Matrix Formalism

NUCLEAR REACTIONS ³He(p, p), E=9.75, 19.48, 30.6 MeV; ³H(p, p), E=13.6, 19.48 MeV; calculated σ(θ); deduced nucleon-nucleon interaction dependence. Multi-channel K-matrix formalism.

1980BA62      Izv.Akad.Nauk SSSR, Ser.Fiz. 44, 2421 (1980)

A.G.Baryshnikov, M.G.Gulyamov, S.P.Krekoten

Description of the (p, n) Reactions on ⁶Li and ⁹Be at Low Energies using Triangle Diagrams

NUCLEAR REACTIONS ⁶Li, ⁹Be(p, n), E=14.9, 17.8 MeV; measured σ(θ). Triangle diagram analysis.

1977BA46      Yad.Fiz. 25, 1167 (1977); Sov.J.Nucl.Phys. 25, 620 (1977)

A.G.Baryshnikov, L.D.Blokhintsev, I.M.Narodetskii

Microscopic K-Matrix Approach to the Continuous Spectrum in the Four-Nucleon Problem

NUCLEAR REACTIONS ³He(p, p), E=9.75-156 MeV; ³H(p, n), E=13.6 MeV; ²H(d, p), E=8.1-83 MeV; ²H(d, d); calculated σ(E).

1976BA51      Nucl.Phys. A272, 327 (1976)

A.G.Baryshnikov, L.D.Blokhintsev, I.M.Narodetsky

Application of the Method of Integral Equations for Calculating the Vertex Constants for an α-Particle

NUCLEAR STRUCTURE ⁴He; calculated vertex constants.

doi: 10.1016/0375-9474(76)90335-3
Citations: PlumX Metrics

1975BA38      J.Phys. (London) G1, L43 (1975)

A.G.Baryshnikov, L.D.Blokhintsev

Dispersion K-Matrix Approach to αt Scattering and Determination of the Vertex Constant for the Process α → t+p

NUCLEAR REACTIONS ³H(α, α), E=8.249 MeV; calculated σ(θ).

doi: 10.1088/0305-4616/1/6/003
Citations: PlumX Metrics

1975BA43      Yad.Fiz. 22, 104 (1975); Sov.J.Nucl.Phys. 22, 50 (1975)

A.G.Baryshnikov, L.D.Blokhintsev

Analysis of the Elastic Scattering of α Particles by ⁶Li Using the K-Matrix and Pade-Approximant Approaches and the Determination of the Coupling Constant for the Vertex ⁶Li → α + d

NUCLEAR REACTIONS ⁶Li(α, α); analyzed reaction in framework of K-matrix approach.

1974BA34      Nucl.Phys. A224, 61 (1974)

A.G.Baryshnickov, L.D.Blokhintsev, A.N.Safronov, V.V.Turovtsev

Dispersion K-Matrix Approach to Nuclear Reactions and its Application to Nα Scattering

NUCLEAR REACTIONS ⁴He(p, p), E=20.62 MeV; calculated σ(θ).

doi: 10.1016/0375-9474(74)90162-6
Citations: PlumX Metrics

1973BA27      Phys.Lett. 45B, 1 (1973)

A.G.Baryshnickov, L.D.Blokhintsev, A.M.Mukhamedzhanov, V.V.Turovtsev

Peripheral Model Approach to the Process of Radiative Proton Capture by Tritium

NUCLEAR REACTIONS ³H(p, γ), E=156 MeV; calculated σ(θ).

doi: 10.1016/0370-2693(73)90237-2
Citations: PlumX Metrics

1972BB19      Pisma Zh.Eksp.Teor.Fiz. 16, 414 (1972); JETP Lett.(USSR) 16, 294 (1972)

A.G.Baryshnikov, L.D.Blokhintsev, A.N.Safronov, V.V.Turovtsev

Diagram K-Matrix Approach to pα Scattering

1971BA61      Phys.Lett. 36B, 205 (1971)

A.G.Baryshnickov, L.D.Blokhintsev

Vertex Constants for an Alpha Particle

NUCLEAR REACTIONS ⁴He(p, p), E=49, 98 MeV; ¹²C(d, α), E=20 MeV; ¹²C(p, ³He), E=40 MeV; calculated σ(θ). Peripheral model.

doi: 10.1016/0370-2693(71)90069-4
Citations: PlumX Metrics

Note: The following list of authors and aliases matches the search parameter A.G.Baryshnickov: A.G.BARYSHNICKOV, A.G.BARYSHNIKOV