Interaction strengths in food webs: issues and opportunities EL Berlow, AM Neutel, JE Cohen, PC De Ruiter, BO Ebenman, ... Journal of animal ecology 73 (3), 585-598, 2004 | 523 | 2004 |

Matrices and graphs stability problems in mathematical ecology D Logofet CRC press, 2018 | 199 | 2018 |

A primer on radial basis functions with applications to the geosciences B Fornberg, N Flyer Society for Industrial and Applied Mathematics, 2015 | 146 | 2015 |

The mathematics of Markov models: what Markov chains can really predict in forest successions DO Logofet, EV Lesnaya Ecological modelling 126 (2-3), 285-298, 2000 | 146 | 2000 |

Convexity in projection matrices: projection to a calibration problem DO Logofet Ecological Modelling 216 (2), 217-228, 2008 | 54 | 2008 |

Succession in mixed boreal forest of Russia: Markov models and non-Markov effects VN Korotkov, DO Logofet, M Loreau Ecological Modelling 142 (1-2), 25-38, 2001 | 49 | 2001 |

Selection on stability across ecological scales JJ Borrelli, S Allesina, P Amarasekare, R Arditi, I Chase, J Damuth, ... Trends in ecology & evolution 30 (7), 417-425, 2015 | 47 | 2015 |

Markov chain models for forest successions in the Erzgebirge, Germany B Benabdellah, KF Albrecht, VL Pomaz, EA Denisenko, DO Logofet Ecological Modelling 159 (2-3), 145-160, 2003 | 41 | 2003 |

Stronger-than-Lyapunov notions of matrix stability, or how “flowers” help solve problems in mathematical ecology DO Logofet Linear algebra and its applications 398, 75-100, 2005 | 40 | 2005 |

Structure and dynamics of a clonal plant population: classical model results in a non-classic formulation DO Logofet, NG Ulanova, IN Klochkova, AN Demidova Ecological Modelling 192 (1-2), 95-106, 2006 | 31 | 2006 |

‘Hybrid’optimisation: a heuristic solution to the Markov-chain calibration problem DO Logofet, VN Korotkov Ecological Modelling 151 (1), 51-61, 2002 | 30 | 2002 |

Projection matrices in variable environments: λ1 in theory and practice DO Logofet Ecological modelling 251, 307-311, 2013 | 28 | 2013 |

Modelling of matter cycle in a mesotrophic bog ecosystem II. Dynamic model and ecological succession DO Logofet, GA Alexandrov Ecological modelling 21 (4), 259-276, 1984 | 27 | 1984 |

Nonnegative matrices as a tool to model population dynamics: classical models and contemporary expansions DO Logofet, IN Belova Journal of Mathematical Sciences 155 (6), 894-907, 2008 | 26 | 2008 |

Leslie model revisited: some generalizations to block structures AI Csetenyi, DO Logofet Ecological Modelling 48 (3-4), 277-290, 1989 | 26 | 1989 |

Complexity in matrix population models: polyvariant ontogeny and reproductive uncertainty DO Logofet Ecological complexity 15, 43-51, 2013 | 25 | 2013 |

Three sources and three constituents of the formalism for a population with discrete age and stage structures DO Logofet Matematicheskoe modelirovanie 14 (12), 11-22, 2002 | 23 | 2002 |

Inhomogeneous Markov models for succession of plant communities: new perspectives on an old paradigm DO Logofet, LL Golubyatnikov, EA Denisenko BIOLOGY BULLETIN-RUSSIAN ACADEMY OF SCIENCES C/C OF IZVESTIIA-ROSSIISKOI …, 1997 | 19 | 1997 |

Conceptual and mathematical modelling of matter cycling in Tajozhny Log bog ecosystem GA Alexandrov, NI Bazilevich, DO Logofet, AA Tishkov, TE Shytikova Wetlands and Shallow Continental Water Bodies 2, 45-93, 1994 | 18 | 1994 |

Adaptation on the ground and beneath: does the local population maximize its λ1? DO Logofet, NG Ulanova, IN Belova Ecological complexity 20, 176-184, 2014 | 17 | 2014 |