Measure transformed canonical correlation analysis with application to financial data

In this paper, a new nonlinear generalization of linear canonical correlation analysis (LCCA) is derived. This framework, called measure transformed canonical correlation analysis (MTCCA), applies LCCA to the considered pair of random vectors after transformation of their joint probability distribution. The proposed transform is structured by a pair of nonnegative functions called the MT-functions. It preserves statistical independence and maps the joint probability distribution into a set of joint probability measures on the joint observation space. Specification of MT-functions in the exponential family, leads to MTCCA, which, in contrast to LCCA, is capable of detecting nonlinear dependencies. In the paper, MTCCA is illustrated for recovery of a nonlinear system with known structure, and for construction of networks that analyze long-term associations between companies traded in the NASDAQ and NYSE stock markets.

[1]  Josef Kittler,et al.  Discriminative Learning and Recognition of Image Set Classes Using Canonical Correlations , 2007, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[2]  Touradj Ebrahimi,et al.  Audio-visual synchronization recovery in multimedia content , 2011, 2011 IEEE International Conference on Acoustics, Speech and Signal Processing (ICASSP).

[3]  Arie Yeredor,et al.  Blind source separation via the second characteristic function , 2000, Signal Process..

[4]  Vince D. Calhoun,et al.  Canonical Correlation Analysis for Data Fusion and Group Inferences , 2010, IEEE Signal Processing Magazine.

[5]  H. Hotelling Relations Between Two Sets of Variates , 1936 .

[6]  Alfred O. Hero,et al.  On Measure Transformed Canonical Correlation Analysis , 2011, IEEE Transactions on Signal Processing.

[7]  Xiangrong Yin,et al.  Canonical correlation analysis based on information theory , 2004 .

[8]  Anirban DasGupta,et al.  Fundamentals of Probability: A First Course , 2010 .

[9]  Vince D. Calhoun,et al.  Joint Blind Source Separation by Multiset Canonical Correlation Analysis , 2009, IEEE Transactions on Signal Processing.

[10]  Kellen Petersen August Real Analysis , 2009 .

[11]  Gaoming Huang,et al.  Canonical Correlation Analysis Using for DOA Estimation of Multiple Audio Sources , 2005, IWANN.

[12]  Anja Vogler,et al.  An Introduction to Multivariate Statistical Analysis , 2004 .

[13]  Shotaro Akaho,et al.  A kernel method for canonical correlation analysis , 2006, ArXiv.