[1] KEEVASH P, SUDAKOV B. On the number of edges not covered by monochromatic copies of axed graphs[J]. J. Combin. Theory Ser. B, 2004,108: 41-53. [2] MA J. On edges not in monochromatic copies of axed bipartite graph[J]. J. Combin. Theory Ser. B, 2017, 123: 240-248. [3] LIU H, PIKHURKOO, SHARIFZADEH M. Edges not in any monochromatic copy of axed graph[J]. J. Combin. Theory Ser. B, 2019, 135: 16-43. [4] SIMONOVITS M. How to solve a Turan type extremal graph problem? (linear decomposition), Contemporary trends in dicrete mathematics[J]. Discrete Math. Theoret. Comput. Sci., 1997, 49: 283-305.
[5] SIMONOVITS M. Extremal graph problems with symmetrical extremal graphs, additionnal chromatic conditions[J]. Discrete Mathematics, 1974, 7: 349-376. [6] ERDS K, STONE A H. On the structure of linear graphs[J]. Bull. Amer. Math. Soc. 1946, 52: 1087-1091.
[7] SIMONOVITS M. A method for solving extremal problems in graph theory, stability problems[C]// Proc. Colloq., Tihany,Theory of Graphs.1968: 279-319.
(上接第327页)
[23] FERNANDEZ C, STEEL M F J. Multivariate student-t regression models: pitfalls and inference[J]. Biometrika, 1999, 86: 153-167. [24] LOUIS T A. Finding the observed information matrix when using the EM algorithm[J]. Journal of the Royal Statistical Society B, 1982, 44: 226-233. [25] MENG X L, RUBIN D B. Maximum likelihood estimation via the ECM algorithm: A general framework[J]. Biometrika, 1993, 80: 267-278. [26] TUKEY J W. One degree of freedom for non-Additivity[J]. Biometrics, 1949, 5: 232-242. [27] ZEGER S L, DIGGLE P J. Semiparametric models for longitudinal data with application to CD4 cell numbers in HIV seroconverters[J]. Biometrics, 1994, 50: 689-699.
() () |