RDP 8601: Classical Models and Unobserved Aggregates Equation

\begin{array}{l} a_{1} = α / (1 + α) & a_{2} = 1 / (1 + α) \\ a_{3} = δ + γ & a_{4} = 1 + γ \\ a_{5} = δ + (α β + γ) / (1 + α) & a_{6} = 1 + (α β + γ) / (1 + α) \\ a_{7} = (α β + γ) / (1 + α) & a_{8} = (β - γ) / (1 + α) \\ c_{1} = θ + π + ρ (δ + γ) & f_{1} = ω + ψ \\ c_{2} = τ + π + ρ (1 + γ) & f_{2} = φ + ψ \\ c_{3} = θ + λ (α / (1 + α)) + π (1 / (1 + α)) + ρ (δ + β (α / (1 + α)) + γ (1 / (1 + α))) & f_{3} = ω + χ (α / (1 + α)) + ψ (1 / (1 + α)) \\ c_{4} = τ + λ (α / (1 + α)) + π (1 / (1 + α)) + ρ (1 + β (α / (1 + α)) + γ (1 + α))) - τ (1 - ({(σ / σ_{μ})}^{2}) - ((σ / σ_{d}))) & f_{4} = φ + χ (α / (1 + α)) + ψ (1 / (1 + α)) - φ (1 - ({(σ / σ_{μ})}^{2}) - ({(σ / σ_{d})}^{2})) \\ c_{5} = λ (α / (1 + α)) + π (1 / (1 + α)) + ρ (β (α / (1 + α)) + γ (1 / (1 + α))) + τ ({(σ / σ_{d})}^{2}) & f_{5} = χ (α / (1 + α)) + ψ (1 / (1 + α) + φ ({(σ / σ_{d})}^{2}) \\ c_{6} = (λ - π) (1 / (1 + α)) + ρ (β - γ) (1 / (1 + α) & f_{6} = (χ - ψ) (1 / (1 + α)) \\ c_{7} = ρ + τ ({(σ / σ_{μ})}^{2}) & f_{7} = φ ({(σ / σ_{μ})}^{2}) \\ f_{8} = φ (1 - ({(σ / σ_{μ})}^{2}) - ({(σ / σ_{d})}^{2})) \\ f_{9} = φ ({(σ / σ_{d})}^{2}) \end{array}