Each symplectic matrix is a product of four symplectic involutions RJ de la Cruz Linear Algebra and its Applications 466, 382-400, 2015 | 26 | 2015 |

On the diagonalizability of a matrix by a symplectic equivalence, similarity or congruence transformation RJ de la Cruz, H Faßbender Linear Algebra and its Applications 496, 288-306, 2016 | 22 | 2016 |

Independent decompositions of chemical reaction networks BS Hernandez, RJL De la Cruz Bulletin of Mathematical Biology 83 (7), 76, 2021 | 17 | 2021 |

Independent, incidence independent and weakly reversible decompositions of chemical reaction networks BS Hernandez, DA Amistas, RJL De la Cruz, LL Fontanil, AA Reyes V, ... arXiv preprint arXiv:2108.05546, 2021 | 14 | 2021 |

Every real symplectic matrix is a product of real symplectic involutions D Awa, RJ de la Cruz Linear Algebra and Its Applications 589, 85-95, 2020 | 11 | 2020 |

The ϕS polar decomposition of matrices RJ De la Cruz, DI Merino, AT Paras Linear algebra and its applications 434 (1), 4-13, 2011 | 11 | 2011 |

The Cartan–Dieudonné–Scherk theorems for complex S-orthogonal matrices RJ de la Cruz, KL de la Rosa, DI Merino, AT Paras Linear Algebra and its Applications 458, 251-260, 2014 | 10 | 2014 |

Products of symplectic normal matrices RJ de la Cruz, DQ Granario Linear Algebra and its Applications 543, 162-172, 2018 | 5 | 2018 |

S orthogonal matrices and S symmetries RJ de la Cruz, DI Merino, AT Paras Linear Algebra and its Applications 474, 213-229, 2015 | 5 | 2015 |

Diagonalizability with respect to perplectic and pseudo-unitary similarity transformations EA Afable, RJ de la Cruz, AT Paras, ME Segui Linear Algebra and its Applications 591, 61-71, 2020 | 3 | 2020 |

Skew ϕ polar decompositions RJ de la Cruz, DI Merino, AT Paras Linear Algebra and its Applications 531, 129-140, 2017 | 3 | 2017 |

Every 2*n*-by-2*n* complex matrix is a sum of three symplectic matricesRJ de la Cruz, DI Merino, AT Paras Linear Algebra and its Applications 517, 199-206, 2017 | 3 | 2017 |

The phiS polar decomposition when the cosquare of S is nonderogatory RJ de la Cruz, D Granario The Electronic Journal of Linear Algebra 31, 754-764, 2016 | 3 | 2016 |

The algebra generated by nilpotent elements in a matrix centralizer RJ de la Cruz, E Misa The Electronic Journal of Linear Algebra 38, 1-8, 2022 | 2 | 2022 |

Each 2*n*-by-2*n* complex symplectic matrix is a product of *n*+1 commutators of *J*-symmetriesRJ de la Cruz, K dela Rosa Linear Algebra and its Applications 517, 53-62, 2017 | 2 | 2017 |

Sums of orthogonal, symmetric, and skew-symmetric matrices RJ de la Cruz, AT Paras The Electronic Journal of Linear Algebra 38, 655-660, 2022 | 1 | 2022 |

The products of involutions in a matrix centralizer RJ De La Cruz, RL Tañedo The Electronic Journal of Linear Algebra 38, 463-482, 2022 | 1 | 2022 |

On the density of semisimple matrices in indefinite scalar product spaces RJ De la Cruz, P Saltenberger The Electronic Journal of Linear Algebra 37, 387-401, 2021 | 1 | 2021 |

On the Iwasawa decomposition of a perplectic matrix RJ de la Cruz, E Reyes Communications in Algebra 49 (3), 932-947, 2021 | 1 | 2021 |

The sums of symplectic, Hamiltonian, and skew-Hamiltonian matrices RJ de la Cruz, AT Paras Linear Algebra and its Applications 603, 84-90, 2020 | 1 | 2020 |