Колебания и бегущие полны в химических системах - Филд Р.
Скачать (прямая ссылка):
531. Koga S. (1982b), Schrodinger Equation Approach to Rotating Spiral Waves in Reaction-Diffusion Svstems, Progr. Theor. Phys, 67, 454.
532. Kogan B. Y„ Zykov V. S., Petrov A. A. (1980), Hybrid Computer Simulation of Stimulative Media, in Dekker L.. Savastano G, and Vansteen-kiste G. C, Eds, Simulation of Systems '79, p. 693.
o33. Kohlrausch F. (1900), Ober den stationaren Temperaturzustand eines elek-trisch geheizten Leitcrs, Ann. Phys, 1, 132.
й34, Колмогоров A. H., Петровский П. E., Пискунов H. С. Изучение уравнения диффузии с источником вещества и его приложение к биологическим проблемам. — Бюлл. Л\ГУ, Матсм. и мех, 1937, т. 1(6), с. 1.
536
W™«e"'K (1936), Spectrum ol the Cold Flame of Ether, Acta Physl-
537. CfR1^ *-.(1?73M'kPS,C4*',VC S"'U,i0"S 10 ReaC,i0"-
нЫ.. Bands in ,he Belousov
539 K0W' SWoMrdl82'. A'7''(1974), Pattern Formation in the Belousov
Reaction, Lect. Math. Life Sci., 7, 201. . ., . ,. ....
540. Корей V., Howard I. N. (1975), Bifurcation under Noiigeneiic Conditions,
541 Kom-U'л''' '(1980. Target Pattern Solulions to Reaction-Diffusion Equa-' lions in the Presence of Impurities, Adv. Appl. Math, 2, 389.
542 Kopell N. Howard L N. (198ta), Target Patterns and Horseschoes from a Central'Force Problem Some Temporally Periodic Solutions to Reaction-Diffusion Equations, Stud. Appl. Math, 64, 1.
543. Kopell N.. Howard L. N. (1981b), Target Pattern and Spiral Solutions to Reaction-Diffusion Equation with More than One Space Dimension, Adv. Appl. Math, 2, 417.
544. Kopp D. Kowalskii A.. Sagulin A.. Semenou N. N. (1930), F.iilzunduiigs-grenze des Gemisches 2H,-f O, mid 2 CO + O2, 7.. Phys. Chem. Part B, 6, 307.
545. Koros E., Orban M., Nagy Zs. (1973), Periodicity in the Rate of Heat Evolution During the Temporal Oscillation in the 2,4-Pentanedione-Brom-ate-Calalyst System, J. Phys. Chem, 77, 3122.
546. Koros E. (1974), Moiiomoleciilar Treatment of Chemical Oscillation, Nature, 251, 703.
it
547. Koros E., Burger M.. Eriedrich V., Ladanyi L„ Nagy Zs., Orban M. (1974a), Chemistry of Belousov Type Oscillating Reactions, Faraday Symp. of the Chem. Soc, No. 9, Physical Chemistry of Oscillatory Phenomena,
548. Koros E., Burger Af, Kiss A. (1974b), Reduction of Bromine(V) by Tris(l,10-Phenanlhroline)-lron(ll) in Aqueous Sulfuric Acid. React. Kinet. Catal. Lett, 1, 475.
VJ549. Koros E., Orban M. (1978), Uncatalyzcd Oscillatory Chemical Reactions, Nature, 273, 371.
550. Koros E Orban M, Nagy Zs. (1979), Calorimelric Studies on the Belousov — Zhabotinskii Oscillatory Chemical Reaction, Acta Chim. Acad. Sci. Hung, 100, 449. /r
55t' Й/' ?rnd" "rb?n '¦ <198°). Chemical Oscillations During the wf if 3^S Reaction o[ Aromatic Compounds with Bromate, Part 3. Ef-J Phys Chem 'С84П'559 X Collples 011 ""catalyzed Bromate Oscillators.
552' UtS m ЙУД Ptu[!fska4" P- (1981). Perturbations ol Bromale Oseil-Dyna,n "s Vs^r Vі ""її" Eds- Nonlinear Phenomena in Chemical dynamics, bprmger-Verlag, Berlin, p. 207.
553'&r^ Study of the Iodide-Induced
J Phys 8° 4K»'0" '" Bromatc-Malonlc Acid-Catalyst Systems,
^ ale 1? ЙЇЇ » «"ЬГ °'
, V ПЧ57) General Theory ol Dynamical Systems and M°'cSr^i.ic4 P«h'' "d. Congr. on Mathematics. North-Holland
'» Г\> , i,„„„ С, Varna M (1982), Perturbation of Bromate Oscil-655 Mot Part"!'. Pcriurbati^by Gamma Radiation, Acta Chim. Acad. Sci. Hung., HO. 295. ж , a д M Математическое моделирование хи-
,rlZl иоа Dei Г M. Франка. - M.: Наука, 1965, с. 52. «7 СЯ• Д Математическое моделирование кинетики гомогенных хи-551 S""x систем. II. Колеб. проц. и биол. и хим. сист. Под ред.
Г M франка. — M.: Наука, 1967, с. 231.
KaDsuxuH M Д Математическое моделирование кинетики гомогенних хн-55 MmSx систем. III. Колеб. „роп. в биол. н хим. сист. Под ред. Г М. Франка. - M.: Наука, 1967, с. 242 ,,¦„„, м„
559 Kramer M.. CaIo 1., RabiU Я. (1981), An Improved Computa t.ona Me-tliod for Sensitivity Analysis. The Green's Function Method with «AIM».
560 Kramer^"m.', ^ato^^abitpH., Kee R. (1982), CHEMSEN: A Computer ' Code for Sensitivity Analysis of Elementary Chemical Reaction Models.
AIM- The Analytically Integrated Magnus Method for Linear and Second Order Sensitivity Coefficients, Sandia Technical Report No. 82-9231, Sandia National Laboratories, Livcrniore, Calif.
561. Kramer Al., CaIo 1., Rabitz 11. (1984a), A Computational Package for Sensitivity Analysis in Chemical Kinetics, Appl. Math. Modelling, to be published.
562. Kramer M., CaIo 1.. Rabitz H. (1984b), Sensitivity Analysis of Oscillatory Systems, Appl. Atath. AtodeUing, to be published.
563. Кринский В. И., Холопов А. В. Явление эха в возбудимой ткани. — Биофизика, 1967, т. 12, с. 524.
564. Кринский В. И., Фомин С. Ф., Холопов А. В. О критической массе при фибрилляции. — Биофизика, 1967, т. 12, с. 908.
565. Кринский В. И. Фибрилляция в возбудимых средах. — Проблемы кибернетики, 1968, т. 20, с. 59.