Graph-theoretic methods for the analysis of chemical and biochemical networks. I. Multistability and oscillations in ordinary differential equation models M Mincheva, MR Roussel Journal of mathematical biology 55 (1), 61-86, 2007 | 107 | 2007 |

Identifying parameter regions for multistationarity C Conradi, E Feliu, M Mincheva, C Wiuf PLoS computational biology 13 (10), e1005751, 2017 | 92 | 2017 |

Catalytic constants enable the emergence of bistability in dual phosphorylation C Conradi, M Mincheva Journal of The Royal Society Interface 11 (95), 20140158, 2014 | 54 | 2014 |

Multigraph conditions for multistability, oscillations and pattern formation in biochemical reaction networks M Mincheva, G Craciun Proceedings of the IEEE 96 (8), 1281-1291, 2008 | 46 | 2008 |

Graph-theoretic methods for the analysis of chemical and biochemical networks. II. Oscillations in networks with delays M Mincheva, MR Roussel Journal of mathematical biology 55 (1), 87-104, 2007 | 40 | 2007 |

A graph-theoretic method for detecting potential Turing bifurcations M Mincheva, MR Roussel The Journal of chemical physics 125 (20), 204102, 2006 | 32 | 2006 |

Stability of mass action reaction–diffusion systems M Mincheva, D Siegel Nonlinear Analysis: Theory, Methods & Applications 56 (8), 1105-1131, 2004 | 27 | 2004 |

Network representations and methods for the analysis of chemical and biochemical pathways CI Sandefur, M Mincheva, S Schnell Molecular bioSystems 9 (9), 2189-2200, 2013 | 23 | 2013 |

Emergence of oscillations in a mixed-mechanism phosphorylation system C Conradi, M Mincheva, A Shiu Bulletin of mathematical biology 81, 1829-1852, 2019 | 20 | 2019 |

Oscillations in biochemical reaction networks arising from pairs of subnetworks M Mincheva Bulletin of mathematical biology 73, 2277-2304, 2011 | 16 | 2011 |

Turing-Hopf instability in biochemical reaction networks arising from pairs of subnetworks M Mincheva, MR Roussel Mathematical biosciences 240 (1), 1-11, 2012 | 13 | 2012 |

Nonnegativity and positiveness of solutions to mass action reaction–diffusion systems M Mincheva, D Siegel Journal of mathematical chemistry 42, 1135-1145, 2007 | 13 | 2007 |

Graph-theoretic analysis of multistationarity using degree theory C Conradi, M Mincheva Mathematics and Computers in Simulation 133, 76-90, 2017 | 11 | 2017 |

On the existence of Hopf bifurcations in the sequential and distributive double phosphorylation cycle C Conradi, E Feliu, M Mincheva arXiv preprint arXiv:1905.08129, 2019 | 9 | 2019 |

Delay stability of reaction systems G Craciun, M Mincheva, C Pantea, YY Polly Mathematical Biosciences 326, 108387, 2020 | 8 | 2020 |

Parametric sensitivity analysis of oscillatory delay systems with an application to gene regulation B Ingalls, M Mincheva, MR Roussel Bulletin of Mathematical Biology 79, 1539-1563, 2017 | 8 | 2017 |

GraTeLPy: graph-theoretic linear stability analysis GR Walther, M Hartley, M Mincheva BMC systems biology 8 (1), 1-18, 2014 | 8 | 2014 |

Oscillations in non-mass action kinetics models of biochemical reaction networks arising from pairs of subnetworks M Mincheva Journal of Mathematical Chemistry 50, 1111-1125, 2012 | 7 | 2012 |

Analysis of biochemical mechanisms using MATHEMATICA with applications N Kyurkchiev, S Markov, M Mincheva Serdica Journal of Computing 10 (1), 063p-078p, 2016 | 4 | 2016 |

Comparison principles for reaction-diffusion systems with respect to proper polyhedral cones M Mincheva, D Siegel DYNAMICS OF CONTINUOUS DISCRETE AND IMPULSIVE SYSTEMS-SERIES A-MATHEMATICAL …, 2003 | 4 | 2003 |