#### Articles containing keyword "Heinz mean":

MIA-15-83 | » On the invariance equation for Heinz means (10/2012) |

JMI-10-44 | » Improved Young and Heinz inequalities with the Kantorovich constant (06/2016) |

JMI-11-27 | » Improved Jensen-type inequalities via linear interpolation and applications (06/2017) |

MIA-22-21 | » Heinz means and triangles inscribed in a semicircle in Banach spaces (01/2019) |

JMI-14-13 | » A new family of weighted operator means including the weighted Heron, logarithmic and Heinz means (03/2020) |

OaM-15-17 | » Refined Heinz operator inequalities and norm inequalities (03/2021) |

JMI-15-84 | » On the arithmetic-geometric mean inequality (09/2021) |

JMI-16-74 | » On some inequalities related to Heinz means for unitarily invariant norms (09/2022) |

JMI-16-76 | » Norm inequalities related to Heinz and logarithmic means (09/2022) |

JMI-16-107 | » More results on weighted means (12/2022) |

MIA-27-27 | » On bounds of logarithmic mean and mean inequality chain (04/2024) |

#### Articles containing keyword "Heinz means":

JMI-07-34 | » Inequalities related to Heinz and Heron means (09/2013) |

JMI-08-06 | » Refinements of the Heron and Heinz means inequalities for matrices (03/2014) |

OaM-08-68 | » Some inequalities for unitarily invariant norms (12/2014) |

JMI-08-56 | » Operator inequalities involving the arithmetic, geometric, Heinz and Heron means (12/2014) |

JMI-09-10 | » Improved arithmetic-geometric mean inequality and its application (03/2015) |

OaM-10-21 | » Singular value inequalities related to the Audenaert-Zhan inequality (06/2016) |

OaM-10-26 | » Log and harmonically log-convex functions related to matrix norms (06/2016) |

JMI-10-26 | » Integral inequalities of the Heinz means as convex functions (06/2016) |

MIA-20-03 | » Convex functions and means of matrices (01/2017) |

MIA-21-53 | » Quadratic interpolation of the Heinz means (07/2018) |

JMI-12-68 | » On the matrix harmonic mean (12/2018) |

JMI-13-79 | » Complete refinements of the Berezin number inequalities (12/2019) |