Color science applications of the Binet–Cauchy theorem

Heuvers, K.J. and D.S. Moak, The solution of the Binet-Cauchy functional equation for square matrices, Discrete Mathematics 88 (1991) 21-32. It is shown that if f : M,(K)+ K is a nonconstant solution of the Binet-Cauchy functional equation for A, B E M,,(K) and if f(E) = 0 where E is the n x n matri

For a coherent E X -module M, Kashiwara and Schapira introduced the complex RHom EX (M, O X ) of holomorphic solutions to M. Very recently this complex was used by R. Ishimura (1998, J. Math. Pures Appl. 77, 647 654) to formulate and establish the Cauchy Kowalevski theorem for E-modules. In this pap

Ringel has shown that the set of vertices and regions of any norm:4 map on the sphere can be admissibly colored by six colors. In this paper, it is shown that the set of vertices, edges and regions of any normd map on the sphere tit? be admissibly colored with seven colors.

## Abstract A major event in 1976 was the announcement that the Four Color Conjecture (4CC) had at long last become the Four Color Theorem (4CT). The proof by W. Haken, K. Appel, and J. Koch is published in the __Illinois Journal of Mathematics__, and their two‐part article outlines the nature and

In this paper we shall study the relationships between the following three families of assertions: C(n): If G is a graph that does not induce & or KS-e and w(G) 6 n. then x(G)rn+l. C'(n): If M is a multigraph such that A(M)< n, p(M)<2 and M does not contain a S-sided triangle (i.e., a triangle with