Tree representations of ternary relations

This paper considers representations of ternary matroids over fields other than GF(3). It is shown that a 3-connected ternary matroid representable over a finite field F has at most IFI -2 inequivalent representations over F. This resolves a special case of a conjecture of Kahn in the affirmative.

Block and Marschak (1960, in Olkin et al. (Eds.) , Contributions to probability and statistics (pp. 97 132). Stanford, CA: Stanford Univ. Press) discussed the relationship between a probability distribution over the strict linear rankings on a finite set C and a family of jointly distributed random

Let X be a finite set and let d be a function from X = X into an arbitrary group G G. An example of such a function arises by taking a tree T whose vertices Ž include X, assigning two elements of G G to each edge of T one for each . Ž . orientation of the edge , and setting d i, j equal to the produ