Two-level mean and covariance structures: Maximum likelihood via an EM algorithm PM Bentler, J Liang Multilevel modeling: Methodological advances, issues, and applications, 53-70, 2003 | 88 | 2003 |

An EM algorithm for fitting two-level structural equation models J Liang, PM Bentler Psychometrika 69, 101-122, 2004 | 87 | 2004 |

Testing multivariate uniformity and its applications JJ Liang, KT Fang, F Hickernell, R Li Mathematics of Computation 70 (233), 337-355, 2001 | 64 | 2001 |

Testing multinormality based on low-dimensional projection J Liang, R Li, H Fang, KT Fang Journal of Statistical Planning and Inference 86 (1), 129-141, 2000 | 51 | 2000 |

A generalized Shapiro–Wilk W statistic for testing high-dimensional normality J Liang, ML Tang, PS Chan Computational statistics & data analysis 53 (11), 3883-3891, 2009 | 49 | 2009 |

Characterization-based Q–Q plots for testing multinormality J Liang, WSY Pan, ZH Yang Statistics & Probability Letters 70 (3), 183-190, 2004 | 36 | 2004 |

A multivariate version of Ghosh's T3-plot to detect non-multinormality KT Fang, RZ Li, JJ Liang Computational statistics & data analysis 28 (4), 371-386, 1998 | 34 | 1998 |

Some necessary uniform tests for spherical symmetry J Liang, KT Fang, FJ Hickernell Annals of the Institute of Statistical Mathematics 60, 679-696, 2008 | 20 | 2008 |

A t-distribution plot to detect non-multinormality JJ Liang, PM Bentler Computational statistics & data analysis 30 (1), 31-44, 1999 | 18 | 1999 |

A characterization of multivariate normal distribution and its application ZH Yang, KT Fang, JJ Liang Statistics & Probability Letters 30 (4), 347-352, 1996 | 18 | 1996 |

Testing high-dimensional normality based on classical skewness and Kurtosis with a possible small sample size J Liang, ML Tang, X Zhao Communications in Statistics-Theory and Methods 48 (23), 5719-5732, 2019 | 15 | 2019 |

A multivariate normal plot to detect nonnormality J Liang, KW Ng Journal of Computational and Graphical Statistics 18 (1), 52-72, 2009 | 14 | 2009 |

On multivariate vertical density representation and its application to random number generation S Kotz, KT Fang, JJ Liang Statistics: a journal of theoretical and applied statistics 30 (2), 163-180, 1997 | 14 | 1997 |

Characterizations of some subclasses of spherical distributions JJ Liang, PM Bentler Statistics & probability letters 40 (2), 155-164, 1998 | 13 | 1998 |

Generalized F-tests for the multivariate normal mean J Liang, ML Tang Computational statistics & data analysis 53 (4), 1177-1190, 2009 | 11 | 2009 |

Some applications of Läuter's technique in tests for spherical symmetry J Liang, KT Fang Biometrical Journal: Journal of Mathematical Methods in Biosciences 42 (8 …, 2000 | 11 | 2000 |

A method for generating uniformly scattered points on the *L* _{ p }-norm unit sphere and its applicationsJ Liang, KW Ng Metrika 68, 83-98, 2008 | 10 | 2008 |

A MATLAB-Aided Method for teaching calculus-based business mathematics J Liang, WSY Pan American Journal of Business Education (AJBE) 2 (9), 15-40, 2009 | 8 | 2009 |

An Excel-aided method for teaching calculus-based business mathematics J Liang, L Martin College Teaching Methods & Styles Journal (CTMS) 4 (11), 11-24, 2008 | 8 | 2008 |

A unified approach to two-level structural equation models and linear mixed effects models PM Bentler, J Liang Random effect and latent variable model selection, 95-119, 2008 | 8 | 2008 |