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Research Article

Parsimonious Tensor Dimension Reduction

Xin Xing* Department of Statistics, Virginia TechORCID Iconhttps://orcid.org/0000-0001-9121-0086
ORCID Icon,
Peng Zeng† Department of Mathematics & Statistics, Auburn University
,
Youhui Ye* Department of Statistics, Virginia Tech
&
Wenxuan Zhong‡ Department of Statistics, University of Georgia.
Received 25 Sep 2023, Accepted 24 May 2024, Accepted author version posted online: 04 Jun 2024
Accepted author version

References

  • Aguet, F. and Muñoz Aguirre, M. (2017). Genetic effects on gene expression across human tissues. Nature, 550:204–213.
  • Bura, E. and Cook, R. D. (2001). Extending sliced inverse regression: the weighted chi-squared test. Journal of the American Statistical Association, 96:996–1003.
  • Chen, C.-H. and Li, K.-C. (1998). Can SIR be as popular as multiple linear regression? Statist. Sin., 8:289–316.
  • Cook, R. D. (1996). Graphics for regressions with a binary response. J. Amer. Statist. Assoc., 91:983–992.
  • Cook, R. D. (1998). Regression Graphics: Ideas for Studying Regressions through Graphics. John Wiley & Sons.
  • Cook, R. D. (2004). Testing predictor contributions in sufficient dimension reduction. The Annals of Statistics, 32(3):1062–1092.
  • Cook, R. D. and Ni, L. (2005). Sufficient dimension reduction via inverse regression. Journal of the American Statistical Association, 100:410–428.
  • Cook, R. D. and Weisberg, S. (1994). An Introduction to Regression Graphics. John Wiley & Sons.
  • Ding, S. and Cook, R. D. (2015). Tensor sliced inverse regression. Journal of Multivariate Analysis, 133:216–231.
  • Erola, P., Björkegren, J. L., and Michoel, T. (2020). Model-based clustering of multi-tissue gene expression data. Bioinformatics, 36(6):1807–1813.
  • Fung, W. K., He, X., Liu, L., and Shi, P. (2002). Dimension reduction based on canonical correlation. Statistica Sinica, 12:1093–1113.
  • Gamazon, E. R., Zwinderman, A. H., Cox, N. J., Denys, D., and Derks, E. M. (2019). Multi-tissue transcriptome analyses identify genetic mechanisms underlying neuropsychiatric traits. Nature genetics, 51(6):933–940.
  • Glastonbury, C. A., Viñuela, A., Buil, A., Halldorsson, G. H., Thorleifsson, G., Helgason, H., Thorsteinsdottir, U., Stefansson, K., Dermitzakis, E. T., Spector, T. D., et al. (2016). Adiposity-dependent regulatory effects on multi-tissue transcriptomes. The American Journal of Human Genetics, 99(3):567–579.
  • Grundberg, E., Small, K. S., Hedman, Å. K., Nica, A. C., Buil, A., Keildson, S., Bell, J. T., Yang, T.-P., Meduri, E., Barrett, A., et al. (2012). Mapping cis-and trans-regulatory effects across multiple tissues in twins. Nature genetics, 44(10):1084–1089.
  • Hall, P. and Li, K.-C. (1993). On almost linearity of low dimensional projections from high dimensional data. The Annals of Statistics, 21:867–889.
  • Harshman, R. and Lundy, M. (1984). The PARAFAC model for three-way factor analysis and multidimensional scaling. In Research Methods for Multimode Data Analysis, volume 46, pages 122–215.
  • Herrera, B. M., Keildson, S., and Lindgren, C. M. (2011). Genetics and epigenetics of obesity. Maturitas, 69(1):41–49.
  • Hooper, J. W. (1959). Simultaneous equations and canonical correlation theory. Econometrica: Journal of the Econometric Society, 27:245–256.
  • Hore, V., Viñuela, A., Buil, A., Knight, J., McCarthy, M. I., Small, K., and Marchini, J. (2016). Tensor decomposition for multiple-tissue gene expression experiments. Nature genetics, 48(9):1094–1100.
  • Kaminsky, Z., Tochigi, M., Jia, P., Pal, M., Mill, J., Kwan, A., Ioshikhes, I., Vincent, J., Kennedy, J., Strauss, J., et al. (2012). A multi-tissue analysis identifies hla complex group 9 gene methylation differences in bipolar disorder. Molecular psychiatry, 17(7):728–740.
  • Kessler, D. C., Taylor, J. A., and Dunson, D. B. (2014). Learning phenotype densities conditional on many interacting predictors. Bioinformatics, 30(11):1562–1568.
  • Kolda, T. and Bader, B. (2009). Tensor decompositions and applications. SIAM Review, 51(3):455–500.
  • Kolda, T. G. (2001). Orthogonal tensor decompositions. SIAM J. Matrix Anal. Appl., 23:243–255.
  • Li, B., Kim, M. K., and Altman, N. (2010). On dimension folding of matrix or array valued statistical objects. Ann. Statist., 38(8):1094–1121.
  • Li, B. and Wang, S. (2007). On directional regresssion for dimension reduction. jasa, 102:997–1008.
  • Li, K.-C. (1991). Sliced inverse regression for dimension reduction. J. Amer. Statist. Assoc., 86:316–327.
  • Lonsdale, J., Thomas, J., Salvatore, M., Phillips, R., Lo, E., Shad, S., Hasz, R., Walters, G., Garcia, F., Young, N., et al. (2013). The genotype-tissue expression (gtex) project. Nature genetics, 45(6):580–585.
  • Merris, R. (1997). Multilinear Algebra. CRC Press.
  • Moody, H. R. and Sasser, J. R. (2020). Aging: Concepts and controversies. Sage publications.
  • Nilsson, J., Sha, F., and Jordan, M. I. (2007). Regression on manifolds using kernel dimension reduction. In Proceedings of the 24th international conference on Machine learning, pages 697–704.
  • Rocke, D. M. and Woodruff, D. L. (1996). Identification of outliers in multivariate data. Journal of the American Statistical Association, 91(435):1047–1061.
  • Sam, S. and Mazzone, T. (2014). Adipose tissue changes in obesity and the impact on metabolic function. Translational Research, 164(4):284–292.
  • Sanyal, D. and Raychaudhuri, M. (2016). Hypothyroidism and obesity: An intriguing link. Indian Journal of Endocrinology and Metabolism, 20(4):554–557.
  • Serfling, R. J. (1980). Approximation Theorems of Mathematical Statistics. John Wiley & Sons.
  • Smilde, A., Bro, R., and Geladi, P. (2004). Multi-way Analysis with Applications in the Chemical Sciences. John Wiley & Sons.
  • Song, R.-h., Wang, B., Yao, Q.-m., Li, Q., Jia, X., and Zhang, J.-a. (2019). The impact of obesity on thyroid autoimmunity and dysfunction: a systematic review and meta-analysis. Frontiers in immunology, 10:2349.
  • Szilard, L. (1959). On the nature of the aging process. Proceedings of the National Academy of Sciences of the United States of America, 45(1):30.
  • Talukdar, H. A., Asl, H. F., Jain, R. K., Ermel, R., Ruusalepp, A., Franzén, O., Kidd, B. A., Readhead, B., Giannarelli, C., Kovacic, J. C., et al. (2016). Cross-tissue regulatory gene networks in coronary artery disease. Cell systems, 2(3):196–208.
  • Tucker, L. (1951). A method for synthesis of factor analysis studies. Personnel Research Section,, Report 984(Dept. of Army).
  • Tucker, L. (1966). Some mathematical notes on three-mode factor analysis. Psychometrika, 31(3):279–311.
  • Valenzuela, P. L., Maffiuletti, N. A., Tringali, G., De Col, A., and Sartorio, A. (2020). Obesity-associated poor muscle quality: prevalence and association with age, sex, and body mass index. BMC Musculoskelet Disord, 21:1–8.
  • Walker, R. F., Pakula, L. C., Sutcliffe, M. J., Kruk, P. A., Graakjaer, J., and Shay, J. W. (2009). A case study of “disorganized development” and its possible relevance to genetic determinants of aging. Mechanisms of ageing and development, 130(5):350–356.
  • Xia, Y. (2008). A multiple-index model and dimension reduction. Journal of the American Statistical Association, 103(484):1631–1640.
  • Yang, J., Huang, T., Petralia, F., Long, Q., Zhang, B., Argmann, C., Zhao, Y., Mobbs, C. V., Schadt, E. E., Zhu, J., et al. (2015). Synchronized age-related gene expression changes across multiple tissues in human and the link to complex diseases. Scientific reports, 5(1):1–16.
  • Ye, Z. and Weiss, R. E. (2003). Using the bootstrap to select one of a new class of dimension reduction methods. Journal of the American Statistical Association, 98(464):968–979.
  • Zeng, P. (2008). Determining the dimension of the central subspace and central mean subspace. Biometrika, 95:469–479.
  • Zhong, W., Zeng, P., Ma, P., Liu, J. S., and Zhu, Y. (2005). Rsir: regularized sliced inverse regression for motif discovery. Bioinformatics, 21(22):4169–4175.
  • Zhong, W., Zhang, T., Zhu, Y., and Liu, J. (2012). Correlation pursuit: forward stepwise variable selection for index model. J. Roy. Statist. Soc. Ser. B, 74:849–870.
  • Zhou, H. and Li, L. (2014). Regularized matrix regression. J. Roy. Statist. Soc. Ser. B, 76:463–483.
  • Zhou, H., Li, L., and Zhu, H. (2013). Tensor regression with applications in neuroimaging data analysis. J. Amer. Statist. Assoc., 108:540–552.
  • Zhu, L.-X. and Ng, K. W. (1995). Asymptotics of sliced inverse regression. Statistica Sinica, pages 727–736.

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