Zero forcing sets and the minimum rank of graphs AIM Minimum Rank–Special Graphs Work Group Linear algebra and its applications 428 (7), 1628-1648, 2008 | 436 | 2008 |
Zero forcing parameters and minimum rank problems F Barioli, W Barrett, SM Fallat, HT Hall, L Hogben, B Shader, ... Linear Algebra and its Applications 433 (2), 401-411, 2010 | 236 | 2010 |
Parameters Related to Tree‐Width, Zero Forcing, and Maximum Nullity of a Graph F Barioli, W Barrett, SM Fallat, HT Hall, L Hogben, B Shader, ... Journal of Graph Theory 72 (2), 146-177, 2013 | 142 | 2013 |
Graphs whose minimal rank is two W Barrett, H Van Der Holst, R Loewy Electronic Journal of Linear Algebra 11, 258-280, 2004 | 119 | 2004 |
A theorem on inverse of tridiagonal matrices WW Barrett Linear Algebra and Its Applications 27, 211-217, 1979 | 105 | 1979 |
Inverses of banded matrices WW Barrett, PJ Feinsilver Linear Algebra and its Applications 41, 111-130, 1981 | 86 | 1981 |
Determinantal formulae for matrix completions associated with chordal graphs WW Barrett, CR Johnson, M Lundquist Linear Algebra and its Applications 121, 265-289, 1989 | 70 | 1989 |
The real positive definite completion problem for a simple cycle W Barrett, CR Johnson, P Tarazaga Linear Algebra and its Applications 192, 3-31, 1993 | 66 | 1993 |
The Real Positive Definite Completion Problem: Cycle Completability: Cycle Completability WW Barrett, CR Johnson, R Loewy American Mathematical Soc., 1996 | 64 | 1996 |
Generalizations of the Strong Arnold Property and the minimum number of distinct eigenvalues of a graph W Barrett, S Fallat, HT Hall, L Hogben, JCH Lin, BL Shader arXiv preprint arXiv:1511.06705, 2015 | 54 | 2015 |
The inverse eigenvalue problem of a graph: Multiplicities and minors W Barrett, S Butler, SM Fallat, HT Hall, L Hogben, JCH Lin, BL Shader, ... Journal of Combinatorial Theory, Series B 142, 276-306, 2020 | 37 | 2020 |
The inverse inertia problem for graphs: Cut vertices, trees, and a counterexample W Barrett, HT Hall, R Loewy Linear Algebra and its Applications 431 (8), 1147-1191, 2009 | 37 | 2009 |
On the graph complement conjecture for minimum rank F Barioli, W Barrett, SM Fallat, HT Hall, L Hogben, H van der Holst Linear Algebra and its Applications 436 (12), 4373-4391, 2012 | 35 | 2012 |
Trump: The greatest show on earth: The deals, the downfall, the reinvention W Barrett Simon and Schuster, 2016 | 32 | 2016 |
Equitable decompositions of graphs with symmetries W Barrett, A Francis, B Webb Linear Algebra and its Applications 513, 409-434, 2017 | 31 | 2017 |
Spanning-tree extensions of the Hadamard-Fischer inequalities CR Johnson, WW Barrett Linear algebra and its applications 66, 177-193, 1985 | 31 | 1985 |
Determinantal formulae for matrices with sparse inverses WW Barrett, CR Johnson Linear algebra and its applications 56, 73-88, 1984 | 31 | 1984 |
Graphs whose minimal rank is two: the finite fields case W Barrett, H Van Der Holst, R Loewy International Linear Algebra Society, 2005 | 29 | 2005 |
Resistance distance in straight linear 2-trees W Barrett, EJ Evans, AE Francis Discrete Applied Mathematics 258, 13-34, 2019 | 27 | 2019 |
The minimum rank problem over the finite field of order 2: minimum rank 3 W Barrett, J Grout, R Loewy Linear Algebra and its Applications 430 (4), 890-923, 2009 | 25 | 2009 |