EXACT DYNAMICAL SYSTEMS AND THE FROBENIUS-PERRON OPERATORLASOTA A; YORKE JA.1982; TRANS. AM. MATH. SOC.; ISSN 0002-9947; USA; DA. 1982; VOL. 273; NO 1; PP. 375-384; BIBL. 8 REF.Article

GONORRHEA MODELING: A COMPARISON OF CONTROL METHODSHETHCOTE HW; YORKE JA.1982; MATH. BIOSCI.; ISSN 0025-5564; USA; DA. 1982; VOL. 58; NO 1; PP. 93-109; BIBL. 21 REF.Article

CHAOTIC BEHAVIOR OF MULTIDIMENSIONAL DIFFERENCE EQUATIONSKAPLAN JL; YORKE JA.1979; LECTURE NOTES MATH.; DEU; DA. 1979; NO 730; PP. 204-227; BIBL. 10 REF.Conference Paper

A DETERMINISTIC MODEL FOR GONORRHEA IN A NONHOMOGENEOUS POPULATION.LAJMANOVICH A; YORKE JA.1976; MATH. BIOSCI.; U.S.A.; DA. 1976; VOL. 28; NO 3-4; PP. 221-236; BIBL. 18 REF.Article

NONASSOCIATIVE, REAL ALGEBRAS AND QUADRATIC DIFFERENTIAL EQUATIONSKAPLAN JL; YORKE JA.1979; NONLINEAR ANAL., THEORY METHODS APPL.; GBR; DA. 1979; VOL. 3; NO 1; PP. 49-51; BIBL. 6 REF.Article

ON THE EXISTENCE OF INVARIANT MEASURES FOR TRANSFORMATIONS WITH STRICTLY TURBULANT TRAJECTORIESLASOTA A; YORKE JA.1977; BULL. ACAD. POLON. SCI., SCI. MATH. ESTR. PHYS.; POLOGNE; DA. 1977; VOL. 25; NO 3; PP. 233-238; ABS. RUSSE; BIBL. 12 REF.Article

ON THE NONLINEAR DIFFERENTIAL DELAY EQUATION X'(T)=-F(X(T),X(T-1)).KAPLAN JL; YORKE JA.1977; J. DIFFER. EQUATIONS; U.S.A.; DA. 1977; VOL. 23; NO 2; PP. 293-314; BIBL. 28 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

PRETURBULENCE: A REGIME OBSERVED IN A FLUID FLOW MODEL OF LORENZKAPLAN JL; YORKE JA.1979; COMMUNIC. MATH. PHYS.; DEU; DA. 1979; VOL. 67; NO 2; PP. 93-108; BIBL. 17 REF.Article

A TRANSITION FROM HOPF BIFURCATION TO CHAOS: COMPUTER EXPERIMENTS WITH MAPS ON R².CURRY JH; YORKE JA.1978; LECTURE NOTES MATH.; DEU; DA. 1978; NO 668; PP. 48-66; BIBL. 2 P.Conference Paper

COMPETITIVE EXCLUSION AND NONEQUILIBRIUM COEXISTENCE.KAPLAN JL; YORKE JA.1977; AMER. NATURALIST; U.S.A.; DA. 1977; VOL. 111; NO 981; PP. 1030-1036; BIBL. 16 REF.Article

ORDINARY DIFFERENTIAL EQUATIONS WHICH YIELD PERIODIC SOLUTIONS OF DIFFERENTIAL DELAY EQUATIONS. = EQUATIONS DIFFERENTIELLES ORDINAIRES PRODUISANT LES SOLUTIONS PERIODIQUES DES EQUATIONS DIFFERENTIELLES AVEC RETARDKAPLAN JL; YORKE JA.1974; J. MATH. ANAL. APPL.; U.S.A.; DA. 1974; VOL. 48; NO 2; PP. 317-324; BIBL. 9 REF.Article

THE BEHAVIOR OF OSCILLATORY SOLUTIONS OF X''(T)+P(T)G (X(T))=0BERNFELD SR; YORKE JA.1972; S.I.A.M. J. MATH. ANAL.; U.S.A.; DA. 1972; VOL. 3; NO 4; PP. 654-667; BIBL. 8 REF.Serial Issue

NUMERICAL SOLUTION OF GENERALIZED EIGENVALUE PROBLEM FOR EVEN MAPPINGKAPLAN JL; YORKE JA.1979; LECTURE NOTES MATH.; DEU; DA. 1979; NO 730; PP. 228-237; BIBL. 18 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

THE "SIMPLEST" DYNAMICAL SYSTEM.TIEN YIEN LI; YORKE JA.1976; IN: DYN. SYST. INT. SYMP.; PROVIDENCE, R.I.; 1974; NEW YORK; ACADEMIC PRESS; DA. 1976; VOL. 2; PP. 203-206; BIBL. 5 REF.Conference Paper

LYAPUNOV FUNCTIONS AND ISOLATING BLOCKSWILSON FW JR; YORKE JA.1973; J. DIFFER. EQUATIONS; U.S.A.; DA. 1973; VOL. 13; NO 1; PP. 106-123; BIBL. 17 REF.Serial Issue

ERGODIC MAPS ON (0,1) AND NONLINEAR PSEUDO-RANDOM NUMBER GENERATORS.TIEN YIEN LI; YORKE JA.1978; NONLINEAR ANAL., THEORY METHODS APPL.; G.B.; DA. 1978; VOL. 2; NO 4; PP. 473-481; BIBL. 8 REF.Article

SNAKES: ORIENTED FAMILIES OF PERIODIC ORBITS, THEIR SOURCES, SINKS, AND CONTINUATIONMALLET PARET J; YORKE JA.1982; J. DIFFER. EQU.; ISSN 0022-0396; USA; DA. 1982; VOL. 43; NO 3; PP. 419-450; BIBL. 20 REF.Article

ERGODIC TRANSFORMATIONS FROM AN INTERVAL INTO ITSELF.TIEN YIEN LI; YORKE JA.1978; TRANS. AMER. MATH. SOC.; U.S.A.; DA. 1978; VOL. 235; PP. 183-192; BIBL. 8 REF.Article

LYAPUNOV THEORY AND PERTURBATION OF STABLE AND ASYMPTOTICALLY STABLE SYSTEMS.SHUI NEE CHOW; YORKE JA.1974; J. DIFFER. EQUATIONS; U.S.A.; DA. 1974; VOL. 15; NO 2; PP. 308-321; BIBL. 11 REF.Article

FAMILIES OF PERIODIC ORBITS: LOCAL CONTINUABILITY DOES NOT IMPLY GLOBAL CONTINUABILITYALLIGOOD KT; MALLET PARET J; YORKE JA et al.1981; J. DIFFER. GEOM.; ISSN 0022-040X; USA; DA. 1981 PUBL. 1982; VOL. 16; NO 3; PP. 483-492; BIBL. 4 REF.Article

BEHAVIORAL RHYTHMS IN SCHIZOPHRENIAREYNOLDS TD; LONDON WP; YORKE JA et al.1978; J. NERV. MENTAL DIS.; USA; DA. 1978; VOL. 166; NO 7; PP. 489-499; BIBL. 11 REF.Article

GLOBAL HOPF BIFURCATION FROM A MULTIPLE CIGENVALUECHOW SN; MALLET PARET J; YORKE JA et al.1978; NONLINEAR ANAL., THEORY METHODS APPL.; GBR; DA. 1978; VOL. 2; NO 6; PP. 753-763; BIBL. 28 REF.Article

SOLUTIONS OF X'(T)=F(X(T),X(T-L)) HAVE LIMITS WHEN F IS AN ORDER RELATIONKAPLAN JL; SORG M; YORKE JA et al.1979; NONLINEAR ANAL., THEORY METHODS APPL.; GBR; DA. 1979; VOL. 3; NO 1; PP. 53-58; BIBL. 4 REF.Article