ALBERT — All Library Books, journals and Electronic Records Telegrafenberg

1

Monograph available for loan

Mathematical ecology : An introduction (1986)

Hallam, Thomas G. ; Levin, Simon A.

Berlin [u.a.] : Springer-Verlag

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Call number: PIK N 503-91-0130

Type of Medium: Monograph available for loan

Pages: 456 p.

ISBN: 0387136312

Location: A 18 - must be ordered

Branch Library: PIK Library

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2

Electronic Resource

ON BIFURCATION IN ECOSYSTEM MODELS (1979)

Hallam, Thomas G.

Oxford, UK : Blackwell Publishing Ltd

Annals of the New York Academy of Sciences 316 (1979), S. 0

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ISSN: 1749-6632

Source: Blackwell Publishing Journal Backfiles 1879-2005

Topics: Natural Sciences in General

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1111/j.1749-6632.1979.tb29491.x

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3

Electronic Resource

Persistence in food webs—I Lotka-Volterra food chains (1979)

Gard, Thomas C. ; Hallam, Thomas G.

Springer

Bulletin of mathematical biology 41 (1979), S. 877-891

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ISSN: 1522-9602

Source: Springer Online Journal Archives 1860-2000

Topics: Biology , Mathematics

Notes: Abstract Persistence-extinction in simple food chains modelled by Lotka-Volterra dynamics is governed by a single parameter which depends upon the interspecific interaction coefficients, the intraspecific interaction coefficients, and the length of the food chain. In persistent systems with nonzero carrying capacity, two new features predominate. Trophic level influence factors relate persistence on different trophic levels and determine, in conjunction with the persistence parameter, the magnitude of persistence. Equilibrium component ordering, which results in persistent systems, mandates once again that systems need to be studied on the complete ecosystem level; static field measurements reflect species location in the food chain, the total length of the food chain and assume characteristics according to these factors.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF02462384

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4

Electronic Resource

The threshold of survival for systems in a fluctuating environment (1989)

Zhien, Ma ; Baojun, Song ; Hallam, Thomas G.

Springer

Bulletin of mathematical biology 51 (1989), S. 311-323

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ISSN: 1522-9602

Source: Springer Online Journal Archives 1860-2000

Topics: Biology , Mathematics

Notes: Abstract Thresholds for survival and extinction are important for assessing the risk of mortality in systems exposed to exogeneous stress. For generic, rudimentary population models and the classical resource-consumer models of Leslie and Gallopin, we demonstrate the existence of a survival threshold for situations where demographic parameters are fluctuating, generally, in a nonperiodic manner. The fluctuations are assumed, to be generated by exogenous, anthropogenic stresses such as toxic chemical exposures. In general, the survival threshold is determined by a relationship between mean stress measure in organisms to the ratio of the population intrinsic growth rate and stress response rate.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF02460110

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5

Electronic Resource

Effects of delay, truncations and density dependence in reproduction schedules on stability of nonlinear Leslie matrix models (1993)

Silva, Jacques A. L. ; Hallam, Thomas G.

Springer

Journal of mathematical biology 31 (1993), S. 367-395

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ISSN: 1432-1416

Keywords: Population models ; Density dependence ; Stability ; Bifurcation ; Reproductive delays

Source: Springer Online Journal Archives 1860-2000

Topics: Biology , Mathematics

Notes: Abstract Understanding effects of hypotheses about reproductive influences, reproductive schedules and the model mechanisms that lead to a loss of stability in a structured model population might provide information about the dynamics of natural population. To demonstrate characteristics of a discrete time, nonlinear, age structured population model, the transition from stability to instability is investigated. Questions about the stability, oscillations and delay processes within the model framework are posed. The relevant processes include delay of reproduction and truncation of lifetime, reproductive classes, and density dependent effects. We find that the effects of delaying reproduction is not stabilizing, but that the reproductive delay is a mechanism that acts to simplify the system dynamics. Density dependence in the reproduction schedule tends to lead to oscillations of large “period” and towards more unstable dynamics. The methods allow us to establish a conjecture of Levin and Goodyear about the form of the stability in discrete Leslie matrix models.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00163922

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6

Electronic Resource

Traveling wave solutions of a nonlinear reaction–advection equation (1999)

Lika, Konstadia ; Hallam, Thomas G.

Springer

Journal of mathematical biology 38 (1999), S. 346-358

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ISSN: 1432-1416

Keywords: Key words: Nonlinear advective processes ; Traveling waves ; Stability

Source: Springer Online Journal Archives 1860-2000

Topics: Biology , Mathematics

Notes: Abstract. We establish the existence of traveling wave solutions for a nonlinear partial differential equation that models a logistically growing population whose movement is governed by an advective process. Conditions are presented for which traveling wave solutions exist and for which they are stable to small semi-finite domain perturbations. The wave is of mathematical interest because its behavior is determined by a singular differential equation and those with small speed of propagation steepen into a shock-like solutions. Finally, we indicate that the smoothing presence of diffusion allows wave persistence when an advective slow moving wave may collapse.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/s002850050152

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7

Electronic Resource

Structural sensitivity of grazing formulations in nutrient controlled plankton models (1978)

Hallam, Thomas G.

Springer

Journal of mathematical biology 5 (1978), S. 269-280

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ISSN: 1432-1416

Source: Springer Online Journal Archives 1860-2000

Topics: Biology , Mathematics

Notes: Summary Stability and persistence properties of a family of non-spatial plankton models, each differentiated by its herbivore grazing term, are analytically compared. The dynamic persistence function in the model is shown to operate uniformly even though stability configuration characteristics of the model may be topologically distinct. The persistence threshold for each model indicates that total nutrient is a fundamental biological control. In the parameter space, all of the models studied are structurally unstable; however, an important bifurcation mechanism associated with this instability governs persistence. While, topologically, model transfigurement through parameter modulation is non-continuous, the biological populations evolve in a continuous or a lower semicontinuous manner. A basic conclusion of the paper is that fundamental problems for these marine ecological models remain unresolved since each of the models is a structurally unstable system for a fixed dynamically persistent ecology.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00276122

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8

Electronic Resource

Persistence in population models with demographic fluctuations (1986)

Hallam, Thomas G. ; Zhien, Ma

Springer

Journal of mathematical biology 24 (1986), S. 327-339

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ISSN: 1432-1416

Keywords: Extinction ; Survival ; Population models ; Perturbations ; Toxic effects

Source: Springer Online Journal Archives 1860-2000

Topics: Biology , Mathematics

Notes: Abstract A persistence and extinction theory is developed through analytical studies of deterministic population models. Under hypotheses that require demographic parameters to fluctuate temporally, the populations may or may not oscillaate. Extinction, when it occurs, is asymptotic. An hierarchy of persistence criteria, based upon fluctuations measured by time average means, is derived. In some situations a threshold value is found to separate persistent population models from those that tend to extinction. Application of the persistence-extinction theory is to the problem of assessing effects of a toxic substance on a population when toxicant inputs to the environment and to resources are oscillatory.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00275641

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9

Electronic Resource

The community matrix in three species community models (1982)

Clark, C. E. ; Hallam, Thomas G.

Springer

Journal of mathematical biology 16 (1982), S. 25-31

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ISSN: 1432-1416

Keywords: Stability ; Community matrix ; Lotka-Volterra models

Source: Springer Online Journal Archives 1860-2000

Topics: Biology , Mathematics

Notes: Abstract The explicit function of the community matrix of a three dimensional Lotka-Volterra model is delineated by a set of necessary and sufficient conditions for a positive equilibrium to be asymptotically stable. In the special case that the community matrix is quasi weakly diagonally dominant, it is shown that a positive determinant for the community matrix is not only necessary but is also sufficient for stability. The results are specific to three dimensional models and do not extend to communities of dimension greater than three.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00275158

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10

Electronic Resource

On density and extinction in continuous population models (1987)

Hallam, Thomas G. ; Zhien, Ma

Springer

Journal of mathematical biology 25 (1987), S. 191-201

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ISSN: 1432-1416

Keywords: Density dependence ; Persistence ; Extinction ; Population ; Finite time horizon

Source: Springer Online Journal Archives 1860-2000

Topics: Biology , Mathematics

Notes: Abstract Survival analyses, investigations of extinction and persistence, are executed for populations represented by a nonautonomous differential equation model. The population is assumed governed by density dependent and time varying density independent demographic parameters. While traditional approaches to extinction postulate extinction on an infinite time horizon and at zero abundance level, survival analysis is developed not only for this traditional setting but also on a finite time horizon and at a nonzero threshold level. A main conclusion is that extinction of a temporally stressed population is determined by a totality of density independent and density dependent factors.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00276389

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