Methods of the mathematical morphology of landscape

Victorov, Aleksey S.

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Tytuł artykułu

Methods of the mathematical morphology of landscape

Autorzy

Victorov Aleksey S.

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Abstrakty

The paper discusses the mathematical morphology of landscape, which is a branch of the landscape science dealing with quantitative laws for the Earth surface mosaics, formed by natural units (bogs, aeolian ridges, karst, etc.), and mathematical methods of their analysis. The mathematical models are a core of the mathematical morphology of landscape. A mathematical model of a landscape pattern is a set of mathematical dependences reflecting most essential geometric characteristics of a landscape. The theory of random processes is a base for the mathematical models of morphological patterns. They appear to be an indivisible integral base for solving various tasks. The landscape researches, which deal with landscape metrics, new landscape laws, risk assessment, and development dynamics, are in need of the quantitative analysis of spatial landscape patterns.

Słowa kluczowe

mathematical modeling landscape metrics diffuse exogenous processes landscape pattern random processes theory

modelowanie matematyczne metryki krajobrazowe rozproszone procesy egzogeniczne krajobraz wzorzec procesy losowe teoria

Wydawca

Komisja Krajobrazu Kulturowego Polskiego Towarzystwa Geograficznego

Czasopismo

Prace Komisji Krajobrazu Kulturowego

Rocznik

2008

Tom

nr 9

Strony

104--127

Opis fizyczny

Bibliogr. 20 poz., rys., tab.

Twórcy

autor

Victorov Aleksey S.

direct@geoenv.ru

Russian Academy of Science, The Institute of Environmental Geoscience, Russia

Bibliografia

1. Fridland V.M., 1972: Soil cover pattern. Moscow, Publ. House "Mysl", p.423 (in Ru-ssian).
2. Ivashutina L.I., Nikolaev V.A. 1971: Landscape pattern contrast and some aspects of its study [in:] Vestnik M.S.U, geogr. # 5, pp 77–81 (in Russian).
3. Jaeger JAG, 2000: Landscape division, splitting index, and effective mesh size: new measures of landscape fragmentation. Landscape Ecol 15(2): 115-130.
4. Kolluru R.V., Bartell S.M., Pitblado R.M., Stricoff R.S., 1996: Risk assessment and management handbook for environmental, health, and safety professionals. McGraw-Hill, New York, p 550.
5. Koroljuk, Portenko, Skorokhod et al.,1985: Handbook for probability theory and mathematical statistics. Moscow, Publ. House "Nauka'", p. 640 (in Russian).
6. Leitao A.B. et al. , 2006: Measuring landscapes: a planner's handbook. Island press, p.245.
7. McGarigal K, Cushman S.A., Neel M.C., Ene E., 2002: FRAGSTATS: Spatial Pattern Analysis Program for Categorical Maps. Computer software program produced by the authors at the University of Massachusetts, Amherst, MA: University of Massachusetts. www.umass.edu/landeco/research/fragstats/fragstats.htm.
8. Moser B., Jaeger J. A.G., Tappeiner U., Tasser E., Eiselt B., 2006: Modification of the effective mesh size for measuring landscape fragmentation to solve the boundary problem. [in:] Landscape Ecology 3/22.
9. Pshenitchnikov A.E., 2003: Thematic morphometry – general directions and u used parameters [in:] Vest-nik MSU, geogr. # 5 pp 42–46 (in Russian).
10. Ragozin A.L. (ed.), 2003: Natural risk assessment and management. Proceedings of the all-Russia confe-rence RISK-2003, vol 1. PFUR Publishing, Moscow, p 413 (in Russian).
11. Riitters K.H., O’Neill R.V., Hunsaker C.T., Wickham J.D., Yankee D.H., Timmins S.P., Jones K.B., Jackson B.L., 1995: A vector analysis of landscape pattern and structure metrics. Landscape Ecol 10:23 – 39.
12. Simonov YU.G., 1970: Geographical neighborhood and methods of its measuring [in:] Vestnik MSU, geogr. # 4, pp 13–19 (in Russian).
13. Victorov A.S., 1986: Landscape pattern. Moscow, Publ. House "Mysl", p. 179 (in Russian).
14. Victorov A.S., 1998: Matematicheskaya morfologiya landshafta (Mathematical morphology of landscape). Tratek, Moscow, p 180 (in Russian).
15. Victorov A.S. Zaitzev M.L., 2000: Mathematical model of ridge-cellular and cellular sand plains as a base for remote sensing data interpretation [in:] Issledovanie Zemli iz Kosmosa, # 4 (in Russian).
16. Victorov A.S. 2001: A model of dynamics for thermokarst plains with fluvial erosion [in:] Sergee-vskie chteniya, Issue 3, Moscow, Publ. House GEOS, pp 351–356 (in Russian).
17. Victorov A.S., 2003: An integrated mathematical model for diffuse exogenous geolo-gical processes. Proceeding of the 9th Annual Conference of the IAMG, Port-smouth, GB.
18. Victorov A.S. 2005: Mathematical models of thermokarst and fluvial erosion plains [in:] Proceedings of the IAMG’ 05, vol 1. York University, Toronto, pp 62–67.
19. Victorov A.S., 2006: General problems of the mathematical morphology of landscape. Moscow, Publ. House "Nauka'", p. 180 (in Russian).
20. Victorov A.S. 2007: Age differentiation model for alluvial plains. In Geoekologiya, #4, pp 302–309 (in Russian).

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Bibliografia

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