Craig J. Erickson, Ph.D.
Affiliations: | 2014 | Mathematics | Iowa State University, Ames, IA, United States |
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"Craig Erickson"Parents
Sign in to add mentorLeslie Hogben | grad student | 2014 | Iowa State | |
(Sign patterns that require eventual exponential nonnegativity.) |
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Publications
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Butler S, Erickson C, Fallat S, et al. (2020) Properties of a q -Analogue of Zero Forcing Graphs and Combinatorics. 36: 1401-1419 |
Bozeman C, Brimkov B, Erickson C, et al. (2019) Restricted power domination and zero forcing problems Journal of Combinatorial Optimization. 37: 935-956 |
Butler S, Erickson C, Hogben L, et al. (2016) Rainbow arithmetic progressions The Journal of Combinatorics. 7: 595-626 |
Erickson CJ. (2015) Sign Patterns That Require Eventual Exponential Nonnegativity Electronic Journal of Linear Algebra. 30: 12 |
Archer M, Catral M, Erickson C, et al. (2013) Potentially eventually exponentially positive sign patterns Involve, a Journal of Mathematics. 6: 261-271 |
Ekstrand J, Erickson C, Hall HT, et al. (2013) Positive semidefinite zero forcing Linear Algebra and Its Applications. 439: 1862-1874 |
Ekstrand J, Erickson C, Hay D, et al. (2012) Note on positive semidefinite maximum nullity and positive semidefinite zero forcing number of partial 2-trees Electronic Journal of Linear Algebra. 23: 79-87 |
Catral M, Erickson C, Hogben L, et al. (2012) Sign patterns that allow strong eventual nonnegativity Electronic Journal of Linear Algebra. 23: 1-10 |
Archer M, Catral M, Erickson C, et al. (2011) Constructions of potentially eventually positive sign patterns with reducible positive part Involve, a Journal of Mathematics. 4: 405-410 |
Erickson C, Kim I. (2010) On Nilpotence Indices Of Sign Patterns Communications of the Korean Mathematical Society. 25: 11-18 |