Shenglin Zhou
Orcid: 0000-0003-4784-1803
According to our database1,
Shenglin Zhou
authored at least 42 papers
between 2000 and 2024.
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Bibliography
2024
Des. Codes Cryptogr., February, 2024
2023
Des. Codes Cryptogr., March, 2023
Flag-transitive 2-designs with prime square replication number and alternating groups.
Des. Codes Cryptogr., March, 2023
Flag-transitive 2-designs with (<i>r</i> - <i>λ</i>, <i>k</i>)=1 and alternating socle.
Discret. Math., 2023
Reduction for flag-transitive symmetric designs with <i>k</i> > <i>λ</i>(<i>λ</i> - 2).
Discret. Math., 2023
A note on flag-transitive automorphism groups of 2-designs with $\lambda \ge (r, \lambda )^2$.
Appl. Algebra Eng. Commun. Comput., 2023
2022
Alternating groups and flag-transitive non-symmetric 2-(<i>v</i>, <i>k</i>, <i>λ</i>) designs with <i>λ</i> ≥ (<i>r</i>, <i>λ</i>)<sup>2</sup>.
Discret. Math., 2022
2021
Reduction of flag-transitive automorphism groups of 2-(<i>v</i>, <i>k</i>, <i>λ</i>) designs with (<i>r</i> - <i>λ</i>, <i>k</i>)=1.
Discret. Math., 2021
Discret. Math., 2021
Flag-transitive, point-imprimitive 2-(v, k, λ ) symmetric designs with k and λ prime powers.
Des. Codes Cryptogr., 2021
Metric dimension and metric independence number of incidence graphs of symmetric designs.
Discret. Appl. Math., 2021
2020
Discret. Math., 2020
Discret. Math., 2020
Flag-Transitive Non-Symmetric 2-Designs with (r, λ)=1 and Exceptional Groups of Lie Type.
Electron. J. Comb., 2020
Electron. J. Comb., 2020
2019
Discret. Math., 2019
2018
Des. Codes Cryptogr., 2018
Flag-transitive point-primitive automorphism groups of non-symmetric 2-(v, k, 3) designs.
Des. Codes Cryptogr., 2018
Flag-transitive automorphism groups of 2-designs with λ ≥ (<i>r</i>, λ)<sup>2</sup> and an application to symmetric designs.
Ars Math. Contemp., 2018
Further results on Wiener, Harary indices and graph properties.
Ars Comb., 2018
Appl. Math. Comput., 2018
2017
A classification of flag-transitive 2-designs with λ≥(r, λ)<sup>2</sup> and sporadic socle.
Discret. Math., 2017
Combinatorial extensions of Terwilliger algebras and wreath products of association schemes.
Discret. Math., 2017
2016
Des. Codes Cryptogr., 2016
Flag-transitive symmetric (v, k, λ) designs admitting primitive automorphism groups with socle PSL(12, 2).
Ars Comb., 2016
2015
Electron. J. Comb., 2015
2014
2010
Flag-transitive 2-(v, k, 4) symmetric designs.
Ars Comb., 2010
2009
Block-Transitive 2-(v, k, 1) Designs and the Groups E<sub>7</sub>(q).
Ars Comb., 2009
2008
Classification of line-transitive point-imprimitive linear spaces with line size at most 12.
Des. Codes Cryptogr., 2008
2006
2005
Block Primitive 2-(<i>v</i>, <i>k</i>, 1) Designs Admitting a Ree Group of Characteristic Two.
Des. Codes Cryptogr., 2005
2004
2002
Eur. J. Comb., 2002
2000
The Ree groups <sup>2</sup><i>G</i><sub>2</sub>(<i>q</i>) and 2-(<i>v, k</i>, 1) block designs.
Discret. Math., 2000