The stochastic Mitra–Wan forestry model: risk neutral and risk averse cases

Abstract: We extend the classic Mitra and Wan forestry model by assuming that prices follow a geometric Brownian motion. We move one step further in the model with stochastic prices and include risk aversion in the objective function. We prove that, as in the deterministic case, the optimal program is periodic both in the risk neutral and risk averse frameworks, when the benefit function is linear. We find the optimal rotation ages in both stochastic cases and show that they may differ significantly from the determinist… Show more

“…Finally we define the cut-off function ψ ∈ C ∞ ([0, S]; R + ) such that for fixed s, s 1 , s 2 , with 0 <s < s 1 < s 2 < S, ψ ≡ 1 on [0, s 1 ], ψ ≡ 0 on [s 2 , S], ψ decreasing on [s 1 , s 2 ]. 3 As pointed out to us by a referee, a monotonicy results for the Faustmann cutting age in discrete time is reported in a forthcoming paper (see Piazza and Pagnoncelli [38]). …”

“…The proof follows from Lemma A.6 using density of step-functions approximating g and satisfying (38). 2…”

On the Mitra–Wan forest management problem in continuous time

“…Finally we define the cut-off function ψ ∈ C ∞ ([0, S]; R + ) such that for fixed s, s 1 , s 2 , with 0 <s < s 1 < s 2 < S, ψ ≡ 1 on [0, s 1 ], ψ ≡ 0 on [s 2 , S], ψ decreasing on [s 1 , s 2 ]. 3 As pointed out to us by a referee, a monotonicy results for the Faustmann cutting age in discrete time is reported in a forthcoming paper (see Piazza and Pagnoncelli [38]). …”

“…The proof follows from Lemma A.6 using density of step-functions approximating g and satisfying (38). 2…”

On the Mitra–Wan forest management problem in continuous time

Stochastic Mitra–Wan forestry models analyzed as a mean field optimal control problem

The optimal harvesting problem under price uncertainty: the risk averse case