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This lecture introduces the theories and models used in landscape ecology to understand the complexity and interactions of ecosystems in a landscape. The lecture covers hierarchy theory, diffusion theory, and percolation theory, along with the island biogeography theory, metapopulation model, and source-sink systems model.
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BCB 322:Landscape Ecology Lecture 2: Theories & Models Hierarchy theory, diffusion theory & percolation theory
Introduction • Landscape heterogeneity, complexity of the ecosystem components, resource restraints & population behaviour all affect organisms in a landscape. • The interaction of these components is estimated through several models and theories. • Most of these theories evolved in different contexts • All aim to interpret landscape complexity (systems & structures), and together
Principal theories • We shall be looking at four theories in greater detail: • Island biogeography theory • Hierarchy theory • Diffusion theory • Percolation theory • We’ll also consider two models: • Metapopulation model • Source-sink systems model • Between them these models cover a lot of the conceptual ground of landscape ecology • There is considerable variation in the details of some of the models
Hierarchy theory • Landscapes are intrinsically complex, with variation in resources at all scales • Hierarchy theory attempts to explain how scale-specific components of the landscape are in contact with components visible at other resolutions • HT considers that any system is a component of other systems at a larger scale, and is itself comprised of sub-systems. • eg: Landscape classification, with the micro-, meso-, macro- and megachores each comprising combinations of the finer-scale classifications
Hierarchy theory • (eg): River watersheds • River basin comprises sub-basins, each comprised of smaller basins • Similarly, different mammals are associated with stream order. • River basins (geological), stream order (physical) and animal size (biological) all interact. • Clearly, landscapes are very complex systems Harris, 1984 (reprinted in Farina, 1998)
Hierarchy theory • To understand complex systems, one needs to focus on organizational level. • This means choosing a relevant spatiotemporal scale to study the system (hence the components of the system) • The horizontal structure of a hierarchical system comprises subsystems or holons • Each holon is an aggregate of lower-level holons, and is part of a higher one • The borders of a holon may be easily visible (the edge of a forest) or invisible (the edge of a frog’s distribution)
Hierarchy theory: holon borders • eg: the structure of a grassland (higher holon) depends on the processes of grazing and woodland encroachment acting on local scales • Finer-scale holons tend to have a faster behaviour rate than larger ones (grazing behaviour at a low level, • Outputs from one level to another are aggregates of the component processes • Consequently, holon levels and borders effectively act as filters for behaviour. Boundaries exist where there is a discontinuity in the rate of change of variables. • This is the basis of the hierarchical understanding of systems
Hierarchy theory: signal filters • Burning in a field occurs rarely (low frequency) and changes the structure of a grassland (visible at higher levels of organisation) • Browsing of woodland margins by migratory animals occurs more frequently (annually), with reduced effect on the matrix (visible to a lesser extent at higher levels) • Localised seed-gathering by mice in a savannah frequently causes local shortages of seed (high frequency), but from a higher level the effect may be seen as constant O’Neill et al, 1986 (reprinted in Farina, 1998)
Hierarchy theory: Incorporation • Incorporation is the process by which perturbation is absorbed by a level of the system • Low frequency fires in a savannah tend to increase soil fertility, reduce woodland encroachment & provide high-quality fodder • Consequently, they increase biodiversity & complexity • Frequent (human-induced) fires can destroy the seed bank & reduce biodiversity, when the system can no longer incorporate the event • The system becomes less complex, turning from a woodland-grassland matrix to simple grassland, then to arid semi-desert.
Diffusion theory • This theory describes the movement of organisms through a landscape. • Describes plants & animals, although they obviously operate on different timescales • The principle is based on the diffusion of particles in a liquid. Eqn (1) • N=population size • f(N) = population growth function • D = diffusion coefficient (describes spatial movement rate) • = diffusion operator (describes the rate of change of N with distance – the density gradient) Turner et al, 2001
Diffusion theory uniform landscape • When invading a uniform landscape, the rate of spread (V) will reach asymptotes equal to where r is the intrinsic growth rate & D is the diffusion coefficient • Equation tested by Andow et al (1990), and was found to work well for • Invasion of muskrats in Europe • Invasion of cabbage white butterfly in North America • However, in the case of the cereal leaf beetle, movement patterns were considered on a finer scale, and it appeared that D was underestimated. Eqn (2)
Percolation theory • Real landscapes are only uniform when considering very broad scales • At finer scales, percolation theory describes organismal movement through the matrix. • Differs from diffusion theory in that it considers the connectedness of the landscape • Also considers movement to be similar to a that of a fluid • Below a critical threshold (pc), distribution is patchy & separated into discrete regions • Above the threshold, movement through the region is free • Experiments corroborate theory that the percolation critical threshold (pc) is <0.5928
Percolation theory • The number & size of lattices are related to P(probability of a cell being occupied by the target species) • P = 0.4 (no percolation) • 49 clusters • Largest cluster = 18 cells • P = 0.6 (some percolation) • 17 clusters • Largest cluster = 163 cells • P = 0.8 (fully percolated) • 1 clusters • Largest cluster = 320 cells • From this we can calculate landscape boundaries (total & inner edges) – useful for edge effect assessment in conservation. Gardner et al, 1992
Percolation theory: uses • The occupancy can signify any resource, and we can thus estimate the likelihood of many events • resinous shrubs/trees: forest fires • carrier animals: disease spread • susceptible plants: pest outbreaks • Also useful for resource usage studies in animals • If a landscape has a percolation value over to pc (0.5928), it can move throughout the landscape to find resources • Chance of finding no resources in n landscape units is where P is the random distribution of the resource Eqn (3) Farina, 1998
Percolation theory: uses • Therefore, the probability R or finding at least one resource is • We know that if R=0.5928 the animal can move through the landscape to find resources • Substituting this into equation 4 gives us the relationship between n and P : • This then tells us far the animal needs to travel to obtain sufficient resources. Eqn (4) Eqn (5)
Percolation theory: resource use • Hence, when resources are well distributed (P<=pc), the organism doesn’t have to move very far • Decreasing resource density will require an organism to look further afield • When there are two or more available resources, n is calculated using their combined potential • If a dominant organism consumes 90% of a resource, the subdominant species has much lower resource availability, and must consequently search more land units • The likelihood of finding subdominant species in a given land unit is hence much smaller than for dominant species, even in relation to their densities (sample is insufficient) (O’Neill et al, 1988) • Furthermore, fragmented landscapes will reduce the viability of subdominant species first.
Summary • Hierarchy theory: all systems and processes in a landscape are components of higher-level systems • Incorporation: the extent to which perturbation can be absorbed by a system • Diffusion theory: in a homogeneous landscape, population dispersion is related to the population growth rate and the rate at which it can move • Percolation theory: in a fragmented landscape, movement rate is related to the integrity of the landscape. Over a critical threshold (pc = 0.5928) organisms can move freely through the landscape. • Resource-gathering (& consequently home range) is related to resource density and landscape integrity
References • Andow, D.A., Karieva, P.M., Levin, S.A. & Okubo, A. (1990) Spread of invading organisms. Landscape Ecology4:177-188. • Farina, A. (1998) Principles and Methods in Landscape Ecology. Chapman & Hall, London. • Harris, L.D. (1984) The fragmented forest. Island biograpgraphy theory and the preservation of biotic diversity. University of Chicago Press, Chicago. • Gardner, R.H., Turner, M.G., Dale, V.H. & O’Neill, R.V. (1992) A percolation model of ecological flows. In: Hansen, A.J. & di Castri, F. (eds.), Landscape boundaries. Consequences for biotic diversity and ecological flows. Springer-Verlag, New York, pp. 259-269. • O’Neill, R.V., DeAngelis, D.L. Waide, J.B. & Allen, T.F.H. (1986) a hierarchical concept of ecosystems. Princeton University Press, Princeton, New Jersey. • O’Neill, R.V., Milne, B.T., Turner, M.G. & Garnder, R.I.I. (1988) Resource utilization and landscape pattern. Landscape Ecology2:63-69. • Turner, M.G., Gardner, R.H. & O’Neill, R.V. (2001) Landscape Ecology in Theory and Practice: Pattern and Process. Springer-Verlag, New York 401pp.