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Dmitrii O. Logofet
Researcher at Russian Academy of Sciences
Publications - 56
Citations - 2354
Dmitrii O. Logofet is an academic researcher from Russian Academy of Sciences. The author has contributed to research in topics: Population & Matrix (mathematics). The author has an hindex of 17, co-authored 53 publications receiving 2091 citations. Previous affiliations of Dmitrii O. Logofet include Moscow State University.
Papers
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Journal ArticleDOI
Matrix Population Models: Construction, Analysis, and Interpretation
Journal ArticleDOI
Interaction strengths in food webs: issues and opportunities
Eric L. Berlow,Anje-Margiet Neutel,Joel E. Cohen,Peter C. de Ruiter,Bo Ebenman,Mark C. Emmerson,Jeremy W. Fox,Vincent A. A. Jansen,J. Iwan Jones,Giorgos D. Kokkoris,Dmitrii O. Logofet,Alan J. McKane,José M. Montoya,Owen L. Petchey +13 more
TL;DR: The various ways in which the term ‘interaction strength’ has been applied are described and the implications of loose terminology and definition for the development of this field are discussed.
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The mathematics of Markov models: what Markov chains can really predict in forest successions.
TL;DR: In this article, a general method for estimation of time-homogeneous transition probabilities applicable for any kind of successional scheme, yet with strong requirements to the expert data: average duration times should be known for each specified stage of succession as well as the likelihood proportions among the transitions from the ramifying states of the scheme.
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Selection on stability across ecological scales.
Jonathan J. Borrelli,Stefano Allesina,Priyanga Amarasekare,Roger Arditi,Ivan D. Chase,John Damuth,Robert D. Holt,Dmitrii O. Logofet,Mark Novak,Rudolf P. Rohr,Axel G. Rossberg,Matthew Spencer,J. Khai Tran,Lev R. Ginzburg +13 more
TL;DR: Examples of similarities occurring at different ecological scales are discussed, from predator-prey relations (attack rates and handling times) through communities (food-web structures) to ecosystem properties.
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Stronger-than-Lyapunov notions of matrix stability, or how "flowers" help solve problems in mathematical ecology
TL;DR: In this paper, a hierarchy of matrix Flowers are suggested where "petals" correspond to subsets of particular stability kinds, whose visible inclusion/intersection represent logical implication/junction.