Partial ordering in L-underdeterminate sets

## L dimension may be chosen within each of the subspaces L in the set S that are ''in general position.'' For example, in the real projective space of dimension 3, consider a plane , a line r not belonging to , the point P [ r l , and two distinct points Q, R both different from P, lying on the l

We call a partially ordered set A sharply transitive if its group of order automorphisms is sharply transitive on A, that is, if it is transitive on A and every non-trivial automorphism has no fixed points. We show that the direct product of any finite group with an infinite cyclic group is the auto

An [a,/3)-normal poset with (a,/3)-logarithmic concave Whitney numbers is a normal poset with logarithmic concave Whitney numbers, with the additional condition that, without mentioning trivial cases, in the definitional inequalities for normality and logarithmic concavity equality can only hold in

Let P be a ranked partially ordered set. An h-family is a subset of P such that no h + 1 elements of the family lie on any single chain. P has the strong h-family property, if each maximal h-family in P is the union of h complete levels. Sufficient conditions for the strong h-family property are giv

The average height of an element x in a finite poset P is the expected number of elements below x in a random linear extension of P. We prove a number of theorems about average height, some intuitive and some not, using a recent result of L.A. Shepp. Let P be an arbitrary finite poset having n elem