We study diffusion of hardcore particles on a one dimensional periodic lattice subjected to a constraint that the separation between any two consecutive particles does not increase beyond a fixed value $(n+1);$ initial separation larger than $(n+1)$ can however decrease. These models undergo an absorbing state phase transition when the conserved particle density of the system falls bellow a critical threshold $\rho_c= 1/(n+1).$ We find that $\phi_k$s, the density of $0$-clusters ($0$ representing vacancies) of size $0\le kComment: 6 pages, 6 eps figures, epl2.cls style