John H. Sinkovic, Ph.D.
Affiliations: | 2013 | Mathematics | Brigham Young University, Provo, UT, United States |
Area:
Mathematics, Applied MathematicsGoogle:
"John Sinkovic"Parents
Sign in to add mentorWayne W. Barrett | grad student | 2013 | BYU | |
(The Minimum Rank Problem for Outerplanar Graphs.) |
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Publications
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Kempton M, Sinkovic J, Smith D, et al. (2020) Characterizing cospectral vertices via isospectral reduction Linear Algebra and Its Applications. 594: 226-248 |
Barrett W, Evans EJ, Francis AE, et al. (2020) Spanning 2-forests and resistance distance in 2-connected graphs Discrete Applied Mathematics. 284: 341-352 |
Godsil C, Guo K, Sinkovic J. (2018) Average mixing matrix of trees Electronic Journal of Linear Algebra. 34: 269-282 |
Barrus MD, Sinkovic J. (2018) On 1-uniqueness and dense critical graphs for tree-depth Discrete Mathematics. 341: 1973-1982 |
Sinkovic J. (2018) A graph for which the inertia bound is not tight Journal of Algebraic Combinatorics. 47: 39-50 |
Hassani Monfared K, Horn P, Kenter FHJ, et al. (2016) On the principal permanent rank characteristic sequences of graphs and digraphs Electronic Journal of Linear Algebra. 31: 187-199 |
Barrus MD, Sinkovic J. (2016) Uniqueness and minimal obstructions for tree-depth Discrete Mathematics. 339: 606-613 |
Arav M, Hall F, Li Z, et al. (2015) Minimum ranks of sign patterns via sign vectors and duality The Electronic Journal of Linear Algebra. 30 |
Arav M, Holst Hvd, Sinkovic J. (2015) On the inertia set of a signed graph with loops Linear Algebra and Its Applications. 510: 361-372 |
Barrett W, Nelson CG, Sinkovic JH, et al. (2014) The combinatorial inverse eigenvalue problem II: all cases for small graphs Electronic Journal of Linear Algebra. 27: 265 |