Jones-Balakrishnan Property for Matrix Variate Beta Distributions

Let X and Y be independent m × m symmetric positive definite random matrices. Assume that X follows a matrix variate beta distribution with parameters a and b and that Y has a matrix variate beta distribution with parameters a + b and c. Define R = I m − Y + Y 1 / 2 X Y 1 / 2 − 1 / 2 Y 1 / 2 X Y 1 / 2 $\boldsymbol {R}= \left (\boldsymbol {I}_{m} - \boldsymbol {Y} + \boldsymbol {Y}^{1/2} \boldsymbol {X} \boldsymbol {Y}^{1/2}\right )^{-1/2} \boldsymbol {Y}^{1/2} \boldsymbol {X} \boldsymbol {Y}^{1/2}$ I m − Y + Y 1 / 2 X Y 1 / 2 − 1 / 2 $ \left (\boldsymbol {I}_{m} - \boldsymbol {Y} + \boldsymbol {Y}^{1/2} \boldsymbol {X} \boldsymbol {Y}^{1/2}\right )^{-1/2} $ and S = I m − Y + Y 1 / 2 X Y 1 / 2 $\boldsymbol {S}= \boldsymbol {I}_{m} - \boldsymbol {Y} + \boldsymbol {Y}^{1/2} \boldsymbol {X} \boldsymbol {Y}^{1/2}$ , where Im is an identity matrix and A1/2 is the unique symmetric positive definite square root of A. In this paper, we have shown that random matrices R and S are independent and follow matrix variate beta distributions generalizing an independence property established by Jones and Balakrishnan (Statistics and Probability Letters, 170 (2021), article id 109011) in the univariate case.