bdim: Biblioteca Digitale Italiana di Matematica

Un progetto SIMAI e UMI
Indice degli Autori
Home -> Boll. Un. Mat. Ital., Serie 8 -> Vol. 5-A (2002), n. 3 -> pp. 515-539

Referenza completa

Gatto, Marino:
Matematica ed Ecologia: un’interazione feconda
Bollettino dell'Unione Matematica Italiana Serie 8 5-A (2002) —La Matematica nella Società e nella Cultura, fasc. n.3, p. 515-539, Unione Matematica Italiana (Italian)
pdf (1.03 MB), djvu (789 Kb). | MR1947794 | Zbl 1194.00040

Referenze Bibliografiche
[1] T. R. MALTHUS, An Essay on the Principle of Population, London: Johnson, 1798.
[2] P. F. VERHULST, Recherches mathematiques sur la loi d’accroissement de la population, Mem. Acad. Roy. Belg., 18 (1845), 1-38. | fulltext EuDML
[3] A. J. LOTKA, Elements of Physical Biology, Baltimore: Williams and Wilkins, 1924. | Jbk 51.0416.06
[4] V. VOLTERRA, Variazioni e fluttazioni del numero d’individui in specie animali conviventi, Mem. Accad. Lincei, 6 (1926), 31-113. | Jbk 52.0450.06
[5] G. F. GAUSE, The struggle for existence, Baltimore: Williams and Wilkins, 1934.
[6] M. BEGON - J. L. HARPER - C. R. TOWNSEND, Ecology, Oxford: Blackwell Scientific Publications, 1990.
[7] R. J. H. BEVERTON - S. J. HOLT, On the Dvnamics of Exploited Fish Populations, London: H. M. Stationery Office, 1957.
[8] W. E. RICKER, Handbook of Computations for Biological Statistics of Fish Populations, vol. 119, Ottawa: Bull. Fish. Res. Board Can., 1958.
[9] H. S. GORDON, Economic theory of a common-property resource: the fishery, J. Pol. Econ., 62 (1954), 124-142.
[10] C. W. CLARK, Mathematical Bioeconomics, New York: J. Wiley, 1976. | MR 2778605 | Zbl 0364.90002
[11] L. S. PONTRYAGIN - V. BOLTYANSKII - R. GAMKRELIDZE - E. MISCHENKO, The mathematical theory of optimal processes, New York and London: Interscience, 1962. | Zbl 0102.32001
[12] P. A. SAMUELSON, A Catenary turnpike theorem involving consumption and the golden rule, American Economic Review, 55 (1965), 486-496.
[13] R. M. MAY, Biological populations with non-overlapping generations: stable points, stable cycles and chaos, Science, 186 (1974), 645-647.
[14] R. LEVINS, Some demographic and genetic consequences of environmental heterogeneity for biological control, Bulletin of the Entomogical Society of America, 15 (1969), 237-240.
[15] I. HANSKI - M. GILPIN, Metapopulation Biology: Ecology, Genetics, and Evolution, San Diego: Academic Press, 1997. | Zbl 0913.92025
[16] M. GYLLENBERG - I. HANSKI, Single-species metapopulation dynamics: a structured model, Theoretical Population Biology, 42 (1992), 35-61. | fulltext (doi) | MR 1181879 | Zbl 0758.92011
[17] J. C. ALLEN - W. M. SCHAFFER - D. ROSKO, Chaos reduces species extinction by amplifying local population noise, Nature, 364 (1993), 229-232.
[18] R. CASAGRANDI - M. GATTO, A mesoscale approach to extinction risk in fragmented habitats, Nature, 400 (1999), 560-562.
[19] Y. A. KUZNETSOV, Elements of Applied Bifurcation Theory, New York: Springer, 1995. | MR 1344214 | Zbl 1082.37002
Home -> Boll. Un. Mat. Ital., Serie 8 -> Vol. 5-A (2002), n. 3 -> pp. 515-539

La collezione può essere raggiunta anche a partire da EuDML, la biblioteca digitale matematica europea, e da mini-DML, il progetto mini-DML sviluppato e mantenuto dalla cellula Math-Doc di Grenoble.

Per suggerimenti o per segnalare eventuali errori, scrivete a

logo MBACCon il contributo del Ministero per i Beni e le Attività Culturali