The noncrossing partitions with fixed points have been introduced and studied in the literature. In this paper, as their continuations, we derive expressions for \(f_m(x_1, 0^\mu, x_{\mu+2},0^\rho,x_{\mu+\mu+3},0^{m-\mu-\rho-3})\),and \(f_{m}(x_1,x_2, 0^\mu, x_{\mu+3},0^\rho,x_{\mu+\mu+3},0^{\rho+\mu+4},0^{m-\rho-\mu-4}\), are given,respectively. Moreover, we introduce noncrossing partitions with fixed points having specific property \(\mathcal{P}\) and describe their enumeration through a multivariable function \(f_m^\mathcal{P}(x_1, x_2, \ldots, x_m)\). Additionally, we obtain counting formulas for \(f_m^\mathcal{P}(x_1, 0^{m-1})\) and \(f_m^\mathcal{P}(x_1, x_2, 0^{m-2})\) for various properties \(\mathcal{P}\).
1970-2025 CP (Manitoba, Canada) unless otherwise stated.