Let Ld=(Zd,Ed) be the d-dimensional lattice, suppose that each edge of Ld be oriented in a random direction, i.e., each edge being independently oriented positive direction along the coordinate axises with probability p and negative direction otherwise. Let Pp be the percolation measure, �(p) be the probability that there exists an infinite oriented path from the origin. In this paper, we first prove �(p) � �(p) for d da12 � p � 1, where �(p) is the percolation probability of bond model; then, as corollaries,we get �( 12 ) = 0 for d = 2 and dc( 12 ) = 2, where dc( 12 ) = sup{d : �( 12 ) = 0}. Next, basedon BK Inequality for arbitrary events in percolation (see[2]), two inequalities are proved,which can be used as FKG Inequality in many cases (note that FKG Inequality is absentfor Random-Oriented model). Finally, we prove the uniqueness of infinite cluster and a theorem on geometry of the infinite cluster (similar to theorem (6.127) in [1] for bond percolation).
