Pascal-Francis CNRS

Pascal and Francis Bibliographic Databases

Help

Search results

Your search

kw.\*:("COLLISION OPERATOR")

Filter

A-Z Z-A Frequency ↓ Frequency ↑
Export in CSV

Document Type [dt]

A-Z Z-A Frequency ↓ Frequency ↑
Export in CSV

Publication Year[py]

A-Z Z-A Frequency ↓ Frequency ↑
Export in CSV

Discipline (document) [di]

A-Z Z-A Frequency ↓ Frequency ↑
Export in CSV

Language

A-Z Z-A Frequency ↓ Frequency ↑
Export in CSV

Author Country

A-Z Z-A Frequency ↓ Frequency ↑
Export in CSV

Origin

A-Z Z-A Frequency ↓ Frequency ↑
Export in CSV

Results 1 to 25 of 264

  • Page / 11
Export

Selection :

  • and

TURBULENT "POLARIZATION" TERMS AND THE BALESCU-LENARD OPERATORKROMMES JA; KOTSCHENREUTHER MT.1982; J. PLASMA PHYS.; ISSN 0022-3778; GBR; DA. 1982; VOL. 27; NO 1; PP. 83-94; BIBL. 32 REF.Article

TIME-EVOLUTION PROPERTIES OF A LINEAR BOLTZMANN COLLISION OPERATORTIP A.1982; J. PHYS. A; ISSN 0305-4470; GBR; DA. 1982; VOL. 15; NO 4; PP. 1159-1174; BIBL. 12 REF.Article

ON THE INVERSION OF THE LINEARIZED COLLISION OPERATORWEINERT U.1981; Z. NATURFORSCH., A; ISSN 0340-4811; DEU; DA. 1981; VOL. 36; NO 2; PP. 113-120; BIBL. 24 REF.Article

THE COLLISIONAL PLASMA MODEL: A VELOCITY ORTHOGONAL-FUNCTION REPRESENTATION FOR THE DISTRIBUTION FUNCTION OF A COLLISIONAL PLASMA.MEIER HK; VAN RIJ WI; BEASLEY CO JR et al.1977; PLASMA PHYS.; G.B.; DA. 1977; VOL. 19; NO 2; PP. 151-166; BIBL. 9 REF.Article

SPECTRUM OF THE BOLTZMANN COLLISION OPERATOR FOR RADIAL CUT-OFF POTENTIALSCZECHOWSKI Z; PALCZEWSKI A.1980; BULL. ACAD. POL. SCI., SER. SCI. TECH.; ISSN 0001-4125; POL; DA. 1980; VOL. 38; NO 9-10; PP. 387-396; ABS. RUS; BIBL. 7 REF.Article

BOLTZMANN COLLISION OPERATOR WITHOUT CUT-OFF.KLAUS M.1978; HELV. PHYS. ACTA; CHE; DA. 1978; VOL. 50; NO 6; PP. 893-903; BIBL. 8 REF.Article

STRONG FIELD INVERSE BREMSSTRAHLUNG VIA A LORENTZ MODEL.CATTO PJ; SPEZIALE T.1977; PHYS. OF FLUIDS; U.S.A.; DA. 1977; VOL. 20; NO 1; PP. 167-168; BIBL. 6 REF.Article

MICROSCOPIC INTERPRETATION OF THE ENSKOG EQUATION FOR A HOMOGENEOUS GAS.CICHOCKI B; PIASECKI J.1976; PHYSICA A; PAYS-BAS; DA. 1976; VOL. 85; NO 1; PP. 101-113Article

MATRIX ELEMENTS OF THE BOLTZMANN COLLISION OPERATOR FOR GAS MIXTURESLINDENFELD MJ; SHIZGAL B.1979; CHEM. PHYS.; NLD; DA. 1979; VOL. 41; NO 1-2; PP. 81-95; BIBL. 21 REF.Article

MATRIX ELEMENTS OF THE LINEARIZED COLLISION OPERATOR FOR MULTITEMPERATURE GAS-MIXTURES.WEINERT U.1978; Z. NATURFORSCH., A; DEU; DA. 1978; VOL. 33; NO 4; PP. 480-492; BIBL. 23 REF.Article

THE COLLISION OPERATOR AND LONG-TIME BEHAVIOR OF A PERTURBED TWO-BODY PROBLEMTERRY PW.1981; CELEST. MECH.; ISSN 0008-8714; NLD; DA. 1981; VOL. 23; NO 2; PP. 119-130; BIBL. 9 REF.Article

BOUND-STATE CONTRIBUTIONS TO THE TRIPLE-COLLISION OPERATORMCLENNAN JA.1981; PHYSICA A; ISSN 0378-4371; NLD; DA. 1981; VOL. 106; NO 1-2; PP. 278-289; ABS. FRE; BIBL. 6 REF.Conference Paper

The dielectric function for the Balescu-Lenard-Poisson kinetic equationsJASPERSE, J. R; BASU, B.The Physics of fluids. 1986, Vol 29, Num 1, pp 110-121, issn 0031-9171Article

Comparison of the Bhatnagar-Gross-Krook approximation with the exact Coulomb collision operatorLIVI, S; MARSCH, E.Physical review. A, General physics. 1986, Vol 34, Num 1, pp 533-540, issn 0556-2791Article

The theory of thermal relaxation of light dilute particles in a heat bath: integral and differential elastic collision operatorsGARRETT, A. J. M.Physics reports. 1986, Vol 134, Num 4, pp 196-271, issn 0370-1573Article

Collisional coupling of fluctuations in plasmasUDDHOLM, P.Journal of physics. A, mathematical and general. 1983, Vol 16, Num 6, pp 1315-1330, issn 0305-4470Article

MATHEMATICAL PROBLEMS OF IRREVERSIBLE STATISTICAL MECHANICS FOR QUANTUM SYSTEMS. I: ANALYTIC CONTINUATION OF THE COLLISION AND DESTRUCTION OPERATORS BY SPECTRAL DEFORMATION METHODCOURBAGE M.1982; J. MATH. PHYS. (N.Y.); ISSN 0022-2488; USA; DA. 1982; VOL. 23; NO 4; PP. 646-651; BIBL. DISSEM.Article

DYNAMICAL INVARIANTS AND THE COLLISION OPERATOR IN THE LIMIT OF LONG TIME FOR A PERTURBED TWO-BODY PROBLEMTERRY P.1981; PHYS. LETT. SECT. A; ISSN 0375-9601; NLD; DA. 1981; VOL. 83; NO 6; PP. 233-236; BIBL. 6 REF.Article

EXISTENCE AND UNIQUENESS OF THE SOLUTION OF THE NON-STATIONARY BOLTZMANN-EQUATION FOR THE ELECTRONS IN A COLLISION DOMINATED PLASMA BY MEANS OF OPERATOR SEMIGROUPSBARTOLOMAEUS G; WILHELM J.1981; ANN. PHYS.; ISSN 0003-3804; DDR; DA. 1981; VOL. 38; NO 3; PP. 211-220; ABS. GER; BIBL. 19 REF.Article

ELECTRON TRANSPORT AND SMALL ANGLE COLLISIONSWIENKE BR.1979; J. QUANT. SPECTROSC. RAD. TRANSFER; GBR; DA. 1979; VOL. 22; NO 4; PP. 301-313; BIBL. 28 REF.Article

EFFET SENFTLEBEN ANORMALBRUEV AS.1978; ZH. EKSPER. TEOR. FIZ.; SUN; DA. 1978; VOL. 74; NO 6; PP. 2027-2041; ABS. ENG; BIBL. 27 REF.Article

APPROXIMATE FOKKER-PLANCK COLLISION OPERATOR FOR TRANSPORT THEORY APPLICATIONS.HIRSHMAN SP; SIGMAR DJ.1976; PHYS. OF FLUIDS; U.S.A.; DA. 1976; VOL. 19; NO 10; PP. 1532-1540; BIBL. 25 REF.Article

REMARKS ON THE CALCULATION OF EIGENVALUES AND GENERALIZED EIGENFUNCTIONS USING A FINITE DIMENSIONAL APPROXIMATION FOR THE INSCATTERING PART OF THE BOLTZMANN COLLISION OPERATORBARTOLOMAUS G; WILHELM J.1982; BEITR. PLASMAPHYS.; ISSN 0005-8025; DDR; DA. 1982; VOL. 22; NO 4; PP. 347-355; BIBL. 7 REF.Article

A STRICTLY MARKOVIAN EXPANSION FOR PLASMA TURBULENCE THEORY.JONES FC.1978; J. PLASMA PHYS.; GBR; DA. 1978; VOL. 20; NO 1; PP. 87-94; BIBL. 13 REF.Article

PROPERTIES OF THE COLLISION OPERATORS OF THE ELECTRON BOLTZMANN EQUATION FOR A WEAKLY IONIZED PLASMA. II: COMPACTNESS PROOF AND STATEMENTS ON THE SPECTRUMBARTOLOMAEUS G; WILHELM J.1982; BEITR. PLASMAPHYS.; ISSN 0005-8025; DDR; DA. 1982; VOL. 22; NO 2; PP. 135-148; BIBL. 12 REF.Article

  • Page / 11