Все выпуски

Список литературы:

1. В. А. Адамович, И. А. Терсков, А. Г. Дегерменджи. Эффект аутостабилизации контролирующих рост факторов и взаимодействия в сообществе // ДАН. — 1987. — Т. 295, № 5. — С. 1236–1239.
   • V. A. Adamovich, I. A. Terskov, A. G. Degermendzhy. Effekt autostabilizacii kontroliruyushchih rost faktorov i vzaimodeistviya v soobshchestve // Doklady Akademii nauk. — 1987. — V. 295, no. 5. — P. 1236–1239. — in Russian. — Math-Net: Mi eng/dan8014. — MathSciNet: MR0907182.
2. В. А. Васильев, Ю. М. Романовский, В. Г. Яхно. Автоволновые процессы. — М: Наука, 1987.
   • V. A. Vasilyev, Y. M. Romanovskii, V. G. Yakhno. Avtovolnovye processy. — Moscow: Nauka, 1987. — in Russian.
3. В. Вольтерра. Математическая теория борьбы за существование. — М: Наука, 1976.
   • V. Volterra. Variations and fluctuations of the number of individuals in animal species living together. — New York: McGraw-Hill, 1926.
   • V. Volterra. Matematicheskaya teoriya borby za sushchestvovanie. — Moscow: Nauka, 1976. — in Russian. — MathSciNet: MR0497841.
4. А. Г. Дегерменджи. Смешанные проточные культуры микроорганизмов. — Новосибирск: Наука, Сибирское отделение, 1981. — С. 26–106.
   • A. G. Degermendzhy. Smeshannye protochnye kul’tury mikroorganizmov. — Novosibirsk: Nauka, Sibirskoe otdelenie, 1981. — P. 26–106. — in Russian.
5. R. A. Armstrong. Prey species replacement along a gradient of nutrition enrichment: a graphical approach // Ecology. — 1979. — V. 60. — P. 76–84. — DOI: 10.2307/1936470.
6. R. A. Armstrong, R. McGehee. Competitive exclusion // The American Naturalist. — 1980. — V. 115. — P. 151–170. — DOI: 10.1086/283553. — MathSciNet: MR0596657.
7. A. Degermendzhi. Coexistence of microbial populations and autostabilization of regulating factors in continuous culture: theory and experiments // Aquatic Ecology. — 2010. — V. 44. — P. 541–560. — DOI: 10.1007/s10452-010-9325-9.
8. G. F. Gause. The Struggle for Existence. — Baltimore: William and Wilkins, 1934.
9. F. Grognard, F. Mazenc, A. Rapaport. Polytopic Lyapunov functions for persistence analysis of competing species // Discrete and Continuous Dynamical Systems. Series B 8 (1). — 2007. — P. 73–93. — MathSciNet: MR2300323. — zbMATH: Zbl 1129.92065.
10. G. P. Harris. Phytoplankton ecology: Structure, Function and Fluctuation. — London, 1986.
11. M. P. Hassel, H. N. Comins, R. M. May. Species coexistence and self-organizing spatial dynamics // Hydrobiologia. — 1994. — V. 344. — P. 87–102.
12. J. N. Holland, D. L. DeAngelis. Consumer-resource theory predicts dynamic transitions between outcomes of interspecies interactions // Ecol. Lett. — 2009. — V. 12. — P. 1357–1366. — DOI: 10.1111/j.1461-0248.2009.01390.x.
13. J. Huisman, N. N. Pham Thi, D. M. Karl, B. Sommeijer. Reduced mixing generates oscillations and chaos in the oceanic deep chlorophyll maximum // Nature. — 2006. — V. 439. — P. 322–325. — DOI: 10.1038/nature04245.
14. J. Huisman, F. J. Weissing. Biodiversity of plankton by species oscillation and chaos // Nature. — 1999. — V. 402. — P. 407–410. — DOI: 10.1038/46540.
15. G. E. Hutchinson. The paradox of the plankton // The American Naturalist. — 1961. — V. 95, no. 882. — P. 137–145. — DOI: 10.1086/282171.
16. Y. Kuang, W. F. Fagan, I. Loladze. Biodiversity, habitat area, resource growth rate and interference competition // Bull. Math. Biol. — 2003. — V. 65. — P. 497–518. — DOI: 10.1016/S0092-8240(03)00008-9. — zbMATH: Zbl 1334.92349.
17. C. Lobry, J. Harmand. A new hypothesis to explain the coexistence of n species in the presence of a single resource // C. R. Biologies. — 2006. — V. 329. — P. 40–46. — DOI: 10.1016/j.crvi.2005.10.004.
18. S. V. Petrovskii, B.-L. Li, H. Malchow. Quantification of the spatial aspect of chaotic dynamics in biological and chemical systems // Bulletin of Mathematical Biology. — 2003. — V. 65. — P. 425–446. — DOI: 10.1016/S0092-8240(03)00004-1. — zbMATH: Zbl 1334.92160.
19. Y. Wang, D. L. DeAngelis, J. N. Holland. Uni-directional consumer-resource theory characterizing transitions of interaction outcomes // Ecological Complexity. — 2011. — V. 8. — P. 249–257. — DOI: 10.1016/j.ecocom.2011.04.002. — MathSciNet: MR2975041.