Minimal controllability of conjunctive Boolean networks is NP-complete E Weiss, M Margaliot, G Even Automatica 92, 56-62, 2018 | 25 | 2018 |

A polynomial-time algorithm for solving the minimal observability problem in conjunctive Boolean networks E Weiss, M Margaliot IEEE Transactions on Automatic Control 64 (7), 2727-2736, 2018 | 24 | 2018 |

A generalization of linear positive systems with applications to nonlinear systems: Invariant sets and the Poincaré–Bendixson property E Weiss, M Margaliot Automatica 123, 109358, 0 | 13 | |

Output Selection and Observer Design for Boolean Control Networks: A Sub-Optimal Polynomial-Complexity Algorithm E Weiss, M Margaliot IEEE control systems letters 3 (1), 210-215, 2018 | 7 | 2018 |

A Generalization of Smillie's Theorem on Strongly Cooperative Tridiagonal Systems E Weiss, M Margaliot 2018 IEEE Conference on Decision and Control, 2018 | 5 | 2018 |

Is My System of ODEs *k*-Cooperative?E Weiss, M Margaliot IEEE Control Systems Letters 5 (1), 73-78, 2020 | 4 | 2020 |

A Generalization of Linear Positive Systems E Weiss, M Margaliot 2019 27th Mediterranean Conference on Control and Automation (MED), 2019 | 3 | 2019 |

Observability Analysis and Observer Design for Boolean Control Networks: A Sub-Optimal Polynomial-Complexity Algorithm E Weiss, M Margaliot 2018 IEEE International Conference on the Science of Electrical Engineering, 2018 | | 2018 |