| On the sum of the Laplacian eigenvalues of a tree E Fritscher, C Hoppen, I Rocha, V Trevisan Linear Algebra and its Applications 435 (2), 371-399, 2011 | 82 | 2011 |
| Eigenvalues and energy in threshold graphs DP Jacobs, V Trevisan, F Tura Linear Algebra and its Applications 465, 412-425, 2015 | 46 | 2015 |
| Locating the eigenvalues of trees DP Jacobs, V Trevisan Linear Algebra and its Applications 434 (1), 81-88, 2011 | 43 | 2011 |
| Eigenvalue location in threshold graphs DP Jacobs, V Trevisan, F Tura Linear Algebra and its applications 439 (10), 2762-2773, 2013 | 39 | 2013 |
| Laplacian energy of diameter 3 trees V Trevisan, JB Carvalho, RR Del Vecchio, CTM Vinagre Applied mathematics letters 24 (6), 918-923, 2011 | 39 | 2011 |
| Factorization properties of Chebyshev polynomials MO Rayes, V Trevisan, PS Wang Computers & Mathematics with Applications 50 (8-9), 1231-1240, 2005 | 36 | 2005 |
| Distance-k knowledge in self-stabilizing algorithms W Goddard, ST Hedetniemi, DP Jacobs, V Trevisan Theoretical Computer Science 399 (1-2), 118-127, 2008 | 35 | 2008 |
| Reducing the adjacency matrix of a tree G Fricke, S Hedetniemi, D Jacobs, V Trevisan The Electronic Journal of Linear Algebra 1, 1996 | 33 | 1996 |
| Exploring symmetries to decompose matrices and graphs preserving the spectrum E Fritscher, V Trevisan SIAM Journal on Matrix Analysis and Applications 37 (1), 260-289, 2016 | 27 | 2016 |
| Teoria espectral de grafos-uma introduçao N Abreu, R Del-Vecchio, V Trevisan, C Vinagre Notas do IIIo Colóquio de Matemática da Regiao Sul, Florianópolis, Santa …, 2014 | 23 | 2014 |
| Maximum Laplacian energy among threshold graphs CTM Vinagre, RR Del-Vecchio, DAR Justo, V Trevisan Linear Algebra and its Applications 439 (5), 1479-1495, 2013 | 22 | 2013 |
| Bounding the sum of the largest Laplacian eigenvalues of graphs I Rocha, V Trevisan Discrete Applied Mathematics 170, 95-103, 2014 | 19 | 2014 |
| The determinant of a tree's neighborhood matrix DP Jacobs, V Trevisan Linear algebra and its applications 256, 235-249, 1997 | 19 | 1997 |
| Characterizing trees with large Laplacian energy E Fritscher, C Hoppen, I Rocha, V Trevisan Linear Algebra and its Applications 442, 20-49, 2014 | 18 | 2014 |
| Computing the Laplacian spectra of some graphs DM Cardoso, EA Martins, M Robbiano, V Trevisan Discrete Applied Mathematics 160 (18), 2645-2654, 2012 | 18 | 2012 |
| Distance-k information in self-stabilizing algorithms W Goddard, ST Hedetniemi, DP Jacobs, V Trevisan International Colloquium on Structural Information and Communication …, 2006 | 18 | 2006 |
| Polynomial factorization: Sharp bounds, efficient algorithms B Beauzamy, V Trevisan, PS Wang Journal of symbolic computation 15 (4), 393-413, 1993 | 18 | 1993 |
| Complementary eigenvalues of graphs R Fernandes, J Judice, V Trevisan Linear Algebra and its Applications 527, 216-231, 2017 | 17 | 2017 |
| On the distribution of Laplacian eigenvalues of trees RO Braga, VM Rodrigues, V Trevisan Discrete Mathematics 313 (21), 2382-2389, 2013 | 17 | 2013 |
| Ordering trees and graphs with few cycles by algebraic connectivity N Abreu, CM Justel, O Rojo, V Trevisan Linear Algebra and its Applications 458, 429-453, 2014 | 15 | 2014 |
David P. JacobsProfessor Emeritus of Computer Science, Clemson UniversityVerified email at clemson.edu
