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SEMI-SYMMETRIC METRIC CONNECTIONS IN GENERALIZED METRIC STRUCTURE MANIFOLDSSHARMA K.1982; TENSOR; ISSN 0040-3504; JPN; DA. 1982; VOL. 36; NO 1; PP. 109-114; BIBL. 3 REF.Article

THE COMPLEX LORENZ EQUATIONSFOWLER AC; GIBBON JD; MCGUINNESS MJ et al.1982; PHYSICA D; ISSN 0167-2789; NLD; DA. 1982; VOL. 4; NO 2; PP. 139-163; BIBL. 21 REF.Article

INTERWINING INVARIANT MANIFOLDS AND THE LORENZ ATTRACTORPERELLO C.1980; LECTURE NOTES MATH.; DEU; DA. 1980; NO 819; PP. 375-378; BIBL. 6 REF.Conference Paper

DIFFERENTIABILITY OF THE STABLE FOLIATION FOR THE MODEL LORENZ EQUATIONSROBINSON C.1981; LECT. NOTES MATH.; ISSN 0075-8434; DEU; DA. 1981; NO 898; PP. 302-315; BIBL. 7 REF.Conference Paper

PERIODIC SOLUTIONS AND BIFURCATION STRUCTURE AT HIGH R IN THE LORENZ MODELROBBINS KA.1979; S.I.A.M. J. APPL. MATH.; USA; DA. 1979; VOL. 36; NO 3; PP. 457-472; BIBL. 9 REF.Article

TRANSIENT BEHAVIOR IN PERIODIC REGIONS OF THE LORENZ MODELSHIMIZU T; MORIOKA N.1978; PHYS. LETTERS, A; NLD; DA. 1978; VOL. 69; NO 3; PP. 148-150; BIBL. 6 REF.Article

TRANSITION BETWEEN TURBULENT AND PERIODIC STATES IN THE LORENZ MODEL.MORIOKA N; SHIMIZU T.1978; PHYS. LETTERS, A; NLD; DA. 1978; VOL. 66; NO 6; PP. 447-449; BIBL. 4 REF.Article

SUBHARMONIC STROBOSCOPY AS A METHOD TO STUDY PERIOD-DOUBLING BIFURCATIONSBAI LIN HAO; SHU YU ZHANG.1982; PHYS. LETT. SECT. A; ISSN 0375-9601; NLD; DA. 1982; VOL. 87; NO 6; PP. 267-276; BIBL. 10 REF.Article

ANALYTIC STRUCTURE OF THE LORENZ SYSTEMTABOR M; WEISS J.1981; PHYS. REV. A; ISSN 0556-2791; USA; DA. 1981; VOL. 24; NO 4; PP. 2157-2167; BIBL. DISSEM.Article

DYNAMICS OF THE LORENZ MODEL OF CONVECTIVE INSTABILITIES. IITAKEYAMA K.1980; PROGR. THEOR. PHYS.; JPN; DA. 1980; VOL. 63; NO 1; PP. 91-105; BIBL. 30 REF.Article

THE LORENZ ATTRACTOR AND A RELATED POPULATION MODELPARRY W.1979; LECTURE NOTES MATH.; DEU; DA. 1979; NO 729; PP. 169-187; BIBL. 17 REF.Conference Paper

THE ONSET OF CHAOS IN A FLUID FLOW MODEL OF LORENZKAPLAN JL; YORKE JA.1979; ANN. NEW YORK ACAD. SCI.; USA; DA. 1979; VOL. 316; PP. 400-407; BIBL. 28 REF.Conference Paper

INTERMITTENT TRANSITION TO TURBULENCE IN DISSIPATIVE DYNAMICAL SYSTEMSPOMEAU Y; MANNEVILLE P.1980; COMMUNIC. MATH. PHYS.; DEU; DA. 1980; VOL. 74; NO 2; PP. 189-197; BIBL. 7 REF.Article

A DERIVATION OF THE LORENZ EQUATIONS FOR SOME UNSTABLE DISPERSIVE PHYSICAL SYSTEMSGIBBON JD; MCGUINNESS MJ.1980; PHYS. LETT. SECT. A; ISSN 0375-9601; NLD; DA. 1980; VOL. 77; NO 5; PP. 295-299; BIBL. 13 REF.Article

METASTABLE CHAOS: THE TRANSITION TO SUSTAINED CHAOTIC BEHAVIOR IN THE LORENZ MODELYORKE JA; YORKE ED.1979; J. STATIST. PHYS.; USA; DA. 1979; VOL. 21; NO 3; PP. 263-277; BIBL. 22 REF.Article

ANALYTIC FORM OF THE SIMPLEST LIMIT CYCLE IN THE LORENZ MODELSHIMIZU T.1979; PHYSICA A; NLD; DA. 1979; VOL. 97; NO 2; PP. 383-398; BIBL. 18 REF.Article

CORRELATION DECAY IN THE LORENZ MODEL AS A STATISTICAL PHYSICS PROBLEMGROSSMANN S; SONNEBORN SCHMICK B.1982; PHYS. REV. A; ISSN 0556-2791; USA; DA. 1982; VOL. 25; NO 4; PP. 2371-2384; BIBL. 21 REF.Article

A STUDY OF THE EFFECT OF MODE TRUNCATION ON AN EXACT PERIODIC SOLUTION OF AN INFINITE SET OF LORENZ EQUATIONSBOOTY M; GIBBON JD.1982; PHYS. LETT. SECT. A; ISSN 0375-9601; NLD; DA. 1982; VOL. 87; NO 6; PP. 261-266; BIBL. 13 REF.Article

HYPERBOLICITY CONDITIONS FOR THE LORENZ MODELSINAI JG; VUL EB.1981; PHYSICA D; ISSN 0167-2789; NLD; DA. 1981; VOL. 2; NO 1; PP. 3-7; BIBL. 8 REF.Conference Paper

LES FRONTIERES DE STABILITE DANGEREUSES DU MODELE DE LORENZROSHCHIN NV.1978; PRIKL. MAT. MEKH.; SUN; DA. 1978; VOL. 42; NO 5; PP. 950-952; BIBL. 9 REF.Article

THE REAL AND COMPLEX LORENZ EQUATIONS IN ROTATING FLUIDS AND LASERSGIBBON JD; MCGUINESS MJ.1982; PHYSICA D; ISSN 0167-2789; NLD; DA. 1982; VOL. 5; NO 1; PP. 108-122; BIBL. 28 REF.Article

STRUCTURAL STABILITY OF LORENZ ATTRACTORSGUCKENHEIMER J; WILLIAMS RF.1979; INST. HAUTES ET. SCI., PUBL. MATH.; FRA; DA. 1979; NO 50; PP. 307-320; BIBL. 12 REF.Article

THE STRUCTURE OF LORENZ ATTRACTORSWILLIAMS RF.1979; INST. HAUTES ET. SCI., PUBL. MATH.; FRA; DA. 1979; NO 50; PP. 321-347; BIBL. 22 REF.Article

GLOBAL ASPECTS OF THE DISSIPATIVE DYNAMICAL SYSTEMS. I: STATISTICAL IDENTIFICATION AND FRACTAL PROPERTIES OF THE LORENZ CHAOSAIZAWA Y.1982; PROGR. THEOR. PHYS.; ISSN 0033-068X; JPN; DA. 1982; VOL. 68; NO 1; PP. 64-84; BIBL. 57 REF.Article

THE LORENZ MODEL AND THE METHOD OF CARLEMAN EMBEDDINGANDRADE RFS; RAUH A.1981; PHYS. LETT. SECT. A; ISSN 0375-9601; NLD; DA. 1981; VOL. 82; NO 6; PP. 276-278; BIBL. 11 REF.Article

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