Let $M$ be von Neumann algebra, $p$ be semiefinite projection and $q$ be projection in $M$ such that $Z(q)=Z(p)$.
( $p$ is semifinite projection if every nonzero subprojection of $p$ contains a nonzero finite subprojection)
I want to show that $q$ is semifinite. I have proved it by generalized comparability theorem but I have a simple problem.
Proof:
$0 \neq q_{1}\leq q \Longrightarrow \exists z \in P(Z(M)): q_{1}z\lesssim pz \ , \ (1-z)p\lesssim (1-z)q_{1}$
Since $p$ is finite, $q_1 z$ is also.
If $0\neq q_1 z$ then $0 \neq q_{1}z\leq q_{1}\leq q$ and $q_{1}z$ is finite.
Q: What should I do, If $q_{1}z=0$?
