[35]	A. Laikhuram and J. C.-H. Lin. Inverse eigenvalue problem for discrete Schrödinger operators of a graph. Linear Algebra Appl., 730:566--586, 2026. [ pdf ]
[34]	S. M. Fallat, H. Gupta, and J. C.-H. Lin. Inverse eigenvalue problem for Laplacian matrices of a graph. SIAM J. Matrix Anal. Appl., 46:1866--1886, 2025. [ pdf ]
[33]	A. Abiad, B. A. Curtis, M. Flagg, H. T. Hall, J. C.-H. Lin, and B. Shader. The inverse nullity pair problem and the strong nullity interlacing property. Linear Algebra Appl., 699:539--568, 2024. [ pdf ]
[32]	C. Erickson, L. Gan, J. Kritschgau, J. C.-H. Lin, and S. Spiro. Complementary vanishing graphs. Linear Algebra Appl., 692:185--211, 2024. [ pdf ]
[31]	P. Hell, J. Huang, and J. C.-H. Lin. Strong cocomparability graphs and slash-free orderings of matrices. SIAM J. Discrete Math., 38:828--844, 2024. [ pdf ]
[30]	J. C.-H. Lin, P. Oblak, and H. Šmigoc. The liberation set in the inverse eigenvalue problem of a graph. Linear Algebra Appl., 675:1--28, 2023. [ pdf ]
[29]	S. M. Fallat, H. T. Hall, J. C.-H. Lin, and B. Shader. The bifurcation lemma for strong properties in the inverse eigenvalue problem of a graph. Linear Algebra Appl., 648:70--87, 2022. [ pdf ]
[28]	J. C.-H. Lin, P. Oblak, and H. Šmigoc. On the inverse eigenvalue problem for block graphs. Linear Algebra Appl., 631:379--397, 2021. [ pdf ]
[27]	F. H. J. Kenter and J. C.-H. Lin. A zero forcing technique for bounding sums of eigenvalue multiplicities. Linear Algebra Appl., 629:138--167, 2021. [ pdf ]
[26]	P. Hell, C. Hernandez-Cruz, J. Huang, and J. C.-H. Lin. Strong chordality of graphs with possible loops. SIAM J. Discrete Math., 35:362--375, 2021. [ pdf ]
[25]	L. Hogben, J. C.-H. Lin, D. D. Olesky, and P. van den Driessche. The sepr-sets of sign patterns. Linear Multilinear Algebra, 26:2044--2068, 2020. [ pdf ]
[24]	P. Hell, J. Huang, J. C.-H. Lin, and R. M. McConnell. Bipartite analogues of comparability and cocomparability graphs. SIAM J. Discrete Math., 34:1969--1983, 2020. [ pdf ]
[23]	S. Butler, C. Erickson, S. M. Fallat, H. T. Hall, B. Kroschel, J. C.-H. Lin, B. Shader, N. Warnberg, and B. Yang. Properties of a q-analogue of zero forcing. Graphs Combin., 36:1401--1419, 2020. [ pdf ]
[22]	A. Chan, S. M. Fallat, S. Kirkland, J. C.-H. Lin, S. Nasserasr, and S. Plosker. Complex Hadamard diagonalisable graphs. Linear Algebra Appl., 605:158--179, 2020. [ pdf ]
[21]	J. C.-H. Lin, P. Oblak, and H. Šmigoc. The strong spectral property for graphs. Linear Algebra Appl., 598:68--91, 2020. [ pdf ]
[20]	W. Barrett, S. Butler, S. M. Fallat, H. T. Hall, L. Hogben, J. C.-H. Lin, B. Shader, and M. Young. The inverse eigenvalue problem of a graph: Multiplicities and minors. J. Combin. Theory Ser. B, 142:276--306, 2020. [ pdf ]
[19]	D. Ferrero, M. Flagg, H. T. Hall, L. Hogben, J. C.-H. Lin, S. Meyer, S. Nasserasr, and B. Shader. Rigid linkages and partial zero forcing. Electron. J. Combin., 26:#P2.43, 2019. [ pdf ]
[18]	F. H. J. Kenter and J. C.-H. Lin. On the error of a priori sampling: Zero forcing sets and propagation time. Linear Algebra Appl., 576:124--141, 2019. [ pdf ]
[17]	C. A. Alfaro and J. C.-H. Lin. Critical ideals, minimum rank and zero forcing number. Appl. Math. Comput., 358:305--313, 2019. [ pdf ]
[16]	J. C.-H. Lin. Zero forcing number, Grundy domination number, and their variants. Linear Algebra Appl., 563:240--254, 2019. [ pdf ]
[15]	Y.-J. Cheng and J. C.-H. Lin. Graph families with constant distance determinant. Electron. J. Combin., 25:#P4.45, 2018. [ pdf ]
[14]	R. Anderson, S. Bai, F. Barrera-Cruz, É. Czabarka, G. Da Lozzo, N. L. F. Hobson, J. C.-H. Lin, A. Mohr, H. C. Smith, L. A. Székely, and H. Whitlatch. Analogies between the crossing number and the tangle crossing number. Electron. J. Combin., 25:#P4.24, 2018. [ pdf ]
[13]	G. Aalipour, A. Abiad, Z. Berikkyzy, L. Hogben, F. H. J. Kenter, J. C.-H. Lin, and M. Tait. Proof of a conjecture of Graham and Lovász concerning unimodality of coefficients of the distance characteristic polynomial of a tree. Electron. J. Linear Algebra, 34:373--380, 2018. [ pdf ]
[12]	J. C.-H. Lin, D. D. Olesky, and P. van den Driessche. Sign patterns requiring a unique inertia. Linear Algebra Appl., 546:67--85, 2018. [ pdf ]
[11]	W. Barrett, S. M. Fallat, H. T. Hall, L. Hogben, J. C.-H. Lin, and B. Shader. Generalizations of the Strong Arnold Property and the minimum number of distinct eigenvalues of a graph. Electron. J. Combin., 24:#P2.40, 2017. [ pdf ]
[10]	A. Berliner, C. Bozeman, S. Butler, M. Catral, L. Hogben, B. Kroschel, J. C.-H. Lin, N. Warnberg, and M. Young. Zero forcing propagation time on oriented graphs. Discrete Appl. Math., 224:45--59, 2017. [ pdf ]
[9]	M. Dairyko, L. Hogben, J. C.-H. Lin, J. Lockhart, D. Roberson, S. Severini, and M. Young. Note on von Neumann and Rényi entropies of a graph. Linear Algebra Appl., 521:240--253, 2017. [ pdf ]
[8]	J. C.-H. Lin. Using a new zero forcing process to guarantee the Strong Arnold Property. Linear Algebra Appl., 507:229--250, 2016. [ pdf ]
[7]	S. Butler, C. Erickson, L. Hogben, K. Hogenson, L. Kramer, R. L. Kramer, J. C.-H. Lin, R. R. Martin, D. Stolee, N. Warnberg, and M. Young. Rainbow arithmetic progressions. J. Comb., 7:595--626, 2016. [ pdf ]
[6]	G. Aalipour, A. Abiad, Z. Berikkyzy, J. Cummings, J. De Silva, W. Gao, K. Heysse, L. Hogben, F. H. J. Kenter, J. C.-H. Lin, and M. Tait. On the distance spectra of graphs. Linear Algebra Appl., 497:66--87, 2016. [ pdf ]
[5]	J. C.-H. Lin. Odd cycle zero forcing parameters and the minimum rank of graph blowups. Electron. J. Linear Algebra, 31:42--59, 2016. [ pdf ]
[4]	C. Bozeman, A. Ellsworth, L. Hogben, J. C.-H. Lin, G. Maurer, K. Nowak, A. Rodriguez, and J. Strickland. Minimum rank of graphs with loops. Electron. J. Linear Algebra, 27:907--934, 2014. [ pdf ]
[3]	J. C.-H. Lin. The sieving process and lower bounds for the minimum rank problem. Congr. Numer., 219:73--88, 2014. [ pdf ]
[2]	G. J. Chang and J. C.-H. Lin. Counterexamples to an edge spread question for zero forcing number. Linear Algebra Appl., 446:192--195, 2014. [ pdf ]
[1]	J. C.-H. Lin. Some interpretations and applications of Fuss-Catalan numbers. ISRN Discrete Math., 2011. doi:10.5402/2011/534628. [ pdf ]