1. Faryad Ali and Jamshid Moori, The Fischer-Clifford matrices of a maximal subgroup of Fi'24, Represent. Theory 7 (2003), 300–321 (electronic).[MR]
  2. Faryad Ali and Jamshid Moori, Fischer-Clifford matrices of the non-split group extension 26·U4(2), Quaest. Math. 31 (2008), no. 1, 27–36.[MR/doi]
  3. J. D. Key and J. Moori, Codes, designs and graphs from the Janko groups J1 and J2, J. Combin. Math. Combin. Comput. 40 (2002), 143–159.[MR]
  4. J. D. Key and J. Moori, Some irreducible codes invariant under the Janko group, J1 or J2, preprint (2008), 20 pages.
  5. J. D. Key, J. Moori, and B. G. Rodrigues, On some designs and codes from primitive representations of some finite simple groups, J. Combin. Math. Combin. Comput. 45 (2003), 3–19.[MR]
  6. J. D. Key, J. Moori, and B. G. Rodrigues, Binary codes from graphs on triples, Discrete Math. 282 (2004), no. 1-3, 171–182.[MR]
  7. J. D. Key, J. Moori, and B. G. Rodrigues, Permutation decoding for the binary codes from triangular graphs, European J. Combin. 25 (2004), no. 1, 113–123.[MR]
  8. J. D. Key, J. Moori, and B. G. Rodrigues, Some binary codes from symplectic geometry of odd characteristic, Util. Math. 67 (2005), 121–128.[MR]
  9. J. D. Key, J. Moori, and B. G. Rodrigues, Partial permutation decoding of some binary codes from graphs on triples, Ars Combin. 91 (2009), 363–371.[MR]
  10. J. D. Key, J. Moori, and B. G. Rodrigues, Ternary codes from graphs on triples, Discrete Math. 309 (2009), no. 14, 4663–4681.[MR/doi]
  11. J. D. Key, J. Moori, and B. G. Rodrigues, Codes associated with triangular graphs, and permutation decoding, International Journal of Information and Coding Theory 1 (2010), no. 3, 334–349 pages.
  12. Jamshid Moori, Subgroups of 3-transposition groups generated by four 3-transpositions, Quaestiones Math. 17 (1994), no. 1, 83–94.[MR]
  13. Jamshid Moori and B. G. Rodrigues, A self-orthogonal doubly even code invariant under McL : 2, J. Combin. Theory Ser. A 110 (2005), no. 1, 53–69.[MR]
  14. Jamshid Moori and B. G. Rodrigues, Some designs and codes invariant under the simple group Co2, J. Algebra 316 (2007), no. 2, 649–661.[MR]