Fiedler and Markham (1994) proved $$ \Big (\frac {\mathop {\rm det } \widehat {H}}{k}\Big )^{ k}\ge \mathop {\rm det } H, $$ where $H=(H_{ij})_{i,j=1}^n$ is a positive semidefinite matrix partitioned into $n\times n$ blocks with each block $k\times k$ and $\widehat {H}=(\mathop {\rm tr} H_{ij})_{i,j=1}^n$. We revisit this inequality mainly using some terminology from quantum information theory. Analogous results are included. For example, under the same condition, we prove $$ \mathop {\rm det }(I_n+\widehat {H}) \ge \mathop {\rm det }(I_{nk}+kH)^{{1}/{k}}.$$

DOI : 10.1007/s10587-016-0289-3

@article{10_1007_s10587_016_0289_3,
     author = {Lin, Minghua},
     title = {A treatment of a determinant inequality of {Fiedler} and {Markham}},
     journal = {Czechoslovak Mathematical Journal},
     pages = {737--742},
     publisher = {mathdoc},
     volume = {66},
     number = {3},
     year = {2016},
     doi = {10.1007/s10587-016-0289-3},
     mrnumber = {3556864},
     zbl = {06644030},
     language = {en},
     url = {https://geodesic-test.mathdoc.fr/articles/10.1007/s10587-016-0289-3/}
}

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Lin, Minghua. A treatment of a determinant inequality of Fiedler and Markham. Czechoslovak Mathematical Journal, Tome 66 (2016) no. 3, pp. 737-742. doi : 10.1007/s10587-016-0289-3. https://geodesic-test.mathdoc.fr/articles/10.1007/s10587-016-0289-3/