kw.\*:("Système non autonome")
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Wave mechanics and inertial guidanceBENN, I. M; TUCKER, R. W.Physical review. D. Particles and fields. 1989, Vol 39, Num 6, pp 1594-1601, issn 0556-2821Article
Conditions de stabilité d'un générateur synchronisé dans une représentation énergétiqueABDRASHITOV, F. R; VOROBEJCHIKOV, EH. S; ELISEEV, A. K et al.Radiotehnika i elektronika. 1983, Vol 28, Num 10, pp 1968-1974Article
Attractivity in non-autonomous systemsYOSHIZAWA, T.International journal of non-linear mechanics. 1985, Vol 20, Num 5-6, pp 519-528, issn 0020-7462Article
STABILITE DE LA POSITION D'EQUILIBRE DES SYSTEMES OSCILLANTS A COEFFICIENTS VARIABLESIGNAT'EV AO.1982; PRIKL. MAT. MEH.; ISSN 0032-8235; SUN; DA. 1982; VOL. 46; NO 1; PP. 167-168; BIBL. 7 REF.Article
ON THE INVARIANCE OF HAMILTON'S FUNCTION. = SUR L'INVARIANCE DE LA FONCTION DE HAMILTONDJUKIC DS.1975; ARCH. MECH.; POLAND; DA. 1975; VOL. 27; NO 4; PP. 685-688; BIBL. 8 REF.Article
A NEW FIRST INTEGRAL CORRESPONDING TO LYAPUNOV'S FUNCTIONS FOR A PENDULUM OF VARIABLE LENGTH.DJUKIC DS.1974; Z. ANGEW. MATH. PHYS.; DTSCH.; DA. 1974; VOL. 25; NO 4; PP. 532-535; ABS. ALLEM.; BIBL. 13 REF.Article
SU ALCUNE FORMULE APPROSSIMATE PER I SISTEMI MECCANICI NON AUTONOMI. NOTA IBOSCHI PETTINI G.1972; ATTI ACCAD. NAZION. LINCEI, R.C., CL. SCI. FIS. MAT. NAT.; ITAL.; DA. 1972; VOL. 53; NO 1-2; PP. 133-138; ABS. ANGL.; BIBL. 3 REF.Serial Issue
Periodic solution of a nonautonomous stage-structured single species model with diffusionZHENGQIU ZHANG; SHANWU ZENG.Quarterly of applied mathematics. 2005, Vol 63, Num 2, pp 277-289, issn 0033-569X, 13 p.Article
On attractivity for nonautonomous systemsXINZHI LIU.Quarterly of applied mathematics. 1993, Vol 51, Num 2, pp 319-327, issn 0033-569XArticle
Systèmes limites dans le problème de stabilité des systèmes non autonomesKARIMZHANOV, A.Prikladnaâ mehanika (Kiev). 1985, Vol 21, Num 5, pp 110-117, issn 0032-8243Article
Sur la construction des domaines d'accessibilité des systèmes linéaires non autonomes de commande sous contraintes de ressourcesGUBIN, S. V; KOVALEV, A. M.Izvestiâ Akademii nauk SSSR. Tehničeskaâ kibernetika. 1986, Num 6, pp 155-160, issn 0002-3388Article
NONAUTONOMOUS DIFFERENTIAL SYSTEMS: SEVERAL FUNCTIONS IN THE STABILITY PROBLEMIANIRO N; MAFFEI C.1980; APPL. MATH. COMPUT.; USA; DA. 1980; VOL. 7; NO 1; PP. 71-80; BIBL. 10 REF.Article
ON AN ALGORITHM FOR ESTIMATING UNIFORM ASYMPTOTIC STABILITY BOUNDARY OF NONAUTONOMOUS SYSTEM.KORMANIK J; LI CC.1976; IN: CONF. DECIS. CONTROL. SYMP. ADAPT. PROCESSES. 15. PROC.; CLEARWATER, FLA.; 1976; NEW YORK; INST. ELECTR. ELECTRON. ENG.; DA. 1976; PP. 1132-1133; BIBL. 4 REF.Conference Paper
PARTIAL ASYMPTOTIC STABILITY VIA LIMITING EQUATIONSBONDI P; FERGOLA P; GAMBARDELLA L et al.1981; MATH. METHODS APPL. SCI.; DEU; DA. 1981; VOL. 3; NO 4; PP. 516-522; BIBL. 14 REF.Article
A STRUCTURAL PROPERTY IN THE THEORY OF STABILITY IN TERMS OF TWO MEASURESCAPRINO S; GIGLIOTTI A.1979; APPLIC. ANAL.; GBR; DA. 1979; VOL. 9; NO 2; PP. 99-105; BIBL. 5 REF.Article
GIROSKOPICHESKIE SISTEMY. = SYSTEMES GYROSCOPIQUESMERKIN DR.1974; MOSKVA; NAUKA; DA. 1974; PP. 1-344; BIBL. 4 P. 1/2; 2EME EDBook
ON THE EXISTENCE OF PERIODIC SOLUTIONS IN GENERAL TWO-DIMENSIONAL DIFFERENTIAL SYSTEMSCOOPER RM.1972; J. MATH. ANAL. APPL.; U.S.A.; DA. 1972; VOL. 40; NO 1; PP. 243-257; BIBL. 9 REF.Serial Issue
STABILITE DES MOUVEMENTS PERIODIQUES DANS UN CAS CRITIQUEMEDVEDEV SV.1980; PRIKL. MAT. MEH.; ISSN 0032-8235; SUN; DA. 1980; VOL. 44; NO 4; PP. 650-659; BIBL. 14 REF.Article
SU ALCUNE FORMULE APPROSSIMATE PER I SISTEMI MECCANICI NON AUTONOMI. NOTA IIBOSCHI PETTINI G.1972; ATTI ACCAD. NAZION. LINCEI, R.C., CL. SCI. FIS. MAT. NAT.; ITAL.; DA. 1972; VOL. 53; NO 1-2; PP. 139-143; ABS. ANGL.; BIBL. 1 REF.Serial Issue
STABILITE DES ENSEMBLES POUR LES SYSTEMES NON AUTONOMESMALYSHEV YU V.1980; DIFFER. URAVNEN.; BYS; DA. 1980; VOL. 16; NO 5; PP. 818-826; BIBL. 12 REF.Article
SOME LINEAR NONAUTONOMOUS CONTROL PROBLEMS WITH QUADRATIC COST.DATKO R.1976; J. DIFFER. EQUATIONS; U.S.A.; DA. 1976; VOL. 21; NO 2; PP. 231-262; BIBL. 21 REF.Article
EQUIVALENT LINEAR MODELS FOR NON-LINEAR NON-AUTONOMOUS SYSTEMS. = MODELES LINEAIRES EQUIVALENTS POUR LES SYSTEMES NON LINEAIRES NON AUTONOMESDASARATHY BV.1975; J. SOUND VIBR.; G.B.; DA. 1975; VOL. 42; NO 4; PP. 447-452; BIBL. 5 REF.Article
QUELQUES CRITERES DE CONVERGENCE DE LA TRANSFORMATION NORMALISANTEKOSTYIN VV; LE DYIN TKHYUYI; LE DINH THUY et al.1975; DOP. AKAD. NAUK UKRAJIN. R.S.R., A; S.S.S.R.; DA. 1975; NO 11; PP. 982-985; ABS. ANGL. RUSSE; BIBL. 7 REF.Article
A study of the asymptotic behaviour of solutions of certain non-autonomous differential equations of the fifth orderTUNC, Cemil.Applied mathematics and computation. 2004, Vol 154, Num 1, pp 103-113, issn 0096-3003, 11 p.Article
Chaos in a non-autonomous active-R circuitMUHAMMAD TAHER ABUELMA'ATTI; AL-AMRI, O; AL-ABBAS, S et al.Frequenz. 1997, Vol 51, Num 3-4, pp 116-119, issn 0016-1136Article
