1. Agler, J., Helton, J. W., McCullough, S., Rodman, S. (1988). Positive semidefinite matrices with a given sparsity pattern. Linear Algebra and its Applications, 107, 101–149.

2. Anderson, T. W. (1970). Estimation of covariance matrices which are linear combinations or whose inverses are linear combinations of given matrices. In R. C. Bose, I. M. Chakravati, P. C. Mahalanobis, C. R. Rao, K. J. C. Smith (Eds.), Essays in probability and statistics (pp. 1–24). Chapel Hill: University of North Carolina Press.

3. Barrett, W., Johnson, C., Tarazaga, P. (1993). The real positive definite completion problem for a simple cycle. Linear Algebra and its Applications, 192, 3–31.

4. Barrett, W., Johnson, C., Loewy, R. (1996). The real positive definite completion problem: Cycle completability. Memoirs of the American Mathematical Society, 584, 69.

5. Brown, L. D. (1986). Fundamentals of statistical exponential families. IMS monographs (Vol. IX). Hayward: Institute of Mathematical Statistics.