[1] 1. Schrbdinger, E., Space-time structure. (Cambridge University Press, 1963). Google Scholar

[2] 2. Rund, H., Invariant theory of variational problems for geometric objects. Tensor (N. S.) 18 (1967) 239–258. Google Scholar

[3] 3. Lovelock, D., The uniqueness of the Einstein field equations in a four-dimensional space. Arch. Rational Mech. Anal. 33 (1969) 54–70. Google Scholar

[4] 4. Lovelock, D., Divergence-free tensorial concomitants. Aequationes Mathematicae (to appear, 1970). Google Scholar

[5] 5. Lovelock, D., Degenerate Lagrange densities for vector and tensor fields. Joint Math. Coll., Universities of South Africa and Witwatersrand. (1967) 237–269. Google Scholar

[1] 1. Bass, H., Finistic dimension and a homological generalization of semi-primary rings. Trans. Amer. Math. Soc. 95 (1960) 466–488. Google Scholar

[2] 2. V. Dlab, Matrix representation of perfect rings. Google Scholar

[3] 3. Eilenberg, S., Homological dimension and syzygies. Ann. of Math. 64 (1956) 328–336. Google Scholar

[1] 1. Brualdi, R.A., Parter, S. V. and Schneider, H., The diagonal equivalence of a nonnegative matrix to a stochastic matrix. J. Math. Anal, and Appl. 16 (1966) 31–50. Google Scholar

[2] 2. Marcus, M. and Mine, H., A survey of matrix theory and matrix inequalities. (Allyn and Bacon, Boston, 1964). Google Scholar

[3] 3. Perfect, Hazel and Mir sky, L., The distribution of positive elements in doubly stochastic matrices. J. Lon. Math. Soc. 40 (1965) 689–698. Google Scholar

[4] 4. Sinkhorn, R. and Nopp, P . V., Concerning nonnegative matrices and doubly stochastic matrices. Pacific J. Math. 21 (1967) 343–348. Google Scholar