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Inducing chaos by resonant perturbations : Theory and experimentLAI, Ying-Cheng; KANDANGATH, Anil; KRISHNAMOORTHY, Satish et al.Physical review letters. 2005, Vol 94, Num 21, pp 214101.1-214101.4, issn 0031-9007Article

The heavy chain with finite number of linksWANG, C. Y.Mechanics of structures and machines. 1993, Vol 21, Num 4, pp 455-469, issn 0890-5452Article

Constraints on backreaction in dust universesRASANEN, Syksy.Classical and quantum gravity (Print). 2006, Vol 23, Num 6, pp 1823-1835, issn 0264-9381, 13 p.Article

Holocene climatic change ¹⁴C wiggles and variations in solar irradiance. DiscussionWIGLEY, T. M. L; KELLY, P. M; EDDY, J. A et al.Philosophical transactions of the royal society of London, series A : mathematical and physical sciences. 1990, Vol 330, Num 1615, pp 547-560, issn 0080-4614Conference Paper

Continued fractions and Rayleigh-Schrödinger perturbation theory at large orderVRSCAY, E. R; CIZEK, J.Journal of mathematical physics. 1986, Vol 27, Num 1, pp 185-201, issn 0022-2488Article

Action-variable perturbation theoryLEACOCK, R. A.Physics letters. A. 1984, Vol 104, Num 4, pp 184-188, issn 0375-9601Article

An integral equation for the continuation of perturbative expansionsCIULLI, S; SPEARMAN, T. D.Nuovo cimento. A. 1984, Vol 83, Num 4, pp 352-360, issn 0369-3546Article

Perturbation theory for non-axial molecular fluidsSINGH, S; SINGH, U. P; SINGH, Y et al.Physica. A. 1983, Vol 121, Num 3, pp 563-575, issn 0378-4371Article

Strange-quark mass from tau-lepton decays with O(α3s) accuracyBAIKOV, P. A; CHETYRKIN, K. G; KüHN, J. H et al.Physical review letters. 2005, Vol 95, Num 1, pp 012003.1-012003.4, issn 0031-9007Article

Convergent perturbation series for coupled oscillatorsFERNANDEZ, F. M; MESON, A. M; CASTRO, E. A et al.Physics letters. A. 1985, Vol 112, Num 3-4, pp 107-110, issn 0375-9601Article

In what schemes can QCD perturbation series converge?MAXWELL, C. J.Physical review. D. Particles and fields. 1984, Vol 29, Num 12, pp 2884-2890, issn 0556-2821Article

An infrared-finite algorithm for rayleigh scattering amplitudes, and Bohr's frequency conditionBACH, Volker; FRÖHLICH, Jurg; PIZZO, Alessandro et al.Communications in mathematical physics. 2007, Vol 274, Num 2, pp 457-486, issn 0010-3616, 30 p.Article

On the validity perturbation theory for the ΔI=1/2 ruleBIJNENS, J.Physics letters. Section B. 1985, Vol 152, Num 3-4, pp 226-230, issn 0370-2693Article

Petites perturbations aléatoires des systèmes dynamiques: développements asymptotiques = Small random perturbations of dynamic systems: asymptotics expansionsAZENCOTT, R.Bulletin des sciences mathématiques (Paris. 1885). 1985, Vol 109, Num 3, pp 253-308, issn 0007-4497Article

Equivalence of the generalized Lie-Hori method and the method of averagingAHMED, A. H; TAPLEY, B. D.Celestial mechanics. 1984, Vol 33, Num 1, pp 1-20, issn 0008-8714Article

Développements de Mayer d'un gaz de contours aux basses températures et dans champs extérieurs arbitraires pour un modèle d'Ising à plusieurs composantesBASUEV, A. G.Teoretičeskaâ i matematičeskaâ fizika. 1984, Vol 58, Num 1, pp 121-136, issn 0564-6162Article

On perturbation theory at finite temperatureDICUS, D. A; DOWN, D; KOLB, E. W et al.Nuclear physics. B. 1983, Vol 223, Num 2, pp 525-531, issn 0550-3213Article

Scheme dependence and the limit of QCD perturbation seriesMAXWELL, C. J.Physical review. D. Particles and fields. 1983, Vol 28, Num 8, pp 2037-2044, issn 0556-2821Article

Expected conditioningFLETCHER, R.IMA journal of numerical analysis. 1985, Vol 5, Num 3, pp 247-273, issn 0272-4979Article

Fuzzy perturbation analysis. I: Directional perturbationHONG-XING, L. I.Fuzzy sets and systems. 1985, Vol 17, Num 2, pp 189-197, issn 0165-0114Article

Is perturbation theory misleading in general relativity?GEROCH, R; LINDBLOM, L.Journal of mathematical physics. 1985, Vol 26, Num 10, pp 2581-2588, issn 0022-2488Article

Non-perturbative solution of a quantum mechanical oscillator interacting with a specific environmentBADRALEXE, E; GUPTA, R. K; SCHEID, W et al.Journal of physics. A, mathematical and general. 1984, Vol 17, Num 2, pp 333-343, issn 0305-4470Article

Note on logarithmic switchback terms in regular and singular perturbation expansionsLAGERSTROM, P. A; REINELT, D. A.SIAM journal on applied mathematics (Print). 1984, Vol 44, Num 3, pp 451-462, issn 0036-1399Article

Leading and misleading logs in perturbative QCDPENNINGTON, M. R.Journal of mathematical physics. 1984, Vol 25, Num 5, pp 1548-1554, issn 0022-2488Article

Decoherence properties of scalar field perturbationsFELDMAN, H. A; KAMENSHCHIK, A. YU.Classical and quantum gravity (Print). 1991, Vol 8, Num 3, pp L65-L71, issn 0264-9381Article

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