Abstract
We consider the problem of optimally stopping a general one-dimensional stochastic differential equation (SDE) with generalised drift over an infinite time horizon. First, we derive a complete characterisation of the solution to this problem in terms of vari- ational inequalities. In particular, we prove that the problem’s value function is the difference of two convex functions and satisfies an appropriate variational inequality in the sense of distributions. We also establish a verification theorem that is the strongest one possible because it involves only the optimal stopping problem’s data. Next, we derive the complete explicit solution to the problem that arises when the state process is a skew geometric Brownian motion and the reward function is the one of a financial call option. In this case, we show that the optimal stopping strategy can take sev- eral qualitatively different forms, depending on parameter values. Furthermore, the explicit solution to this special case shows that the so-called “principle of smooth fit” does not hold in general for optimal stopping problems involving solutions to SDEs with generalised drift.
Highlights
We consider the optimal stopping of the one-dimensional stochastic differential equation (SDE) with generalised drift ι tXt = x + Lzt ν(dz) + σ(Xs) dWs, x ∈ ̊I, ι (1.1)Discretionary stopping of SDEs with generalised drift where Lz is the symmetric local time of X at level z, W is a standard one-dimensional Brownian motion andI = ]ι, ι[ is the interior of a given interval I ⊆ [−∞, ∞]
The objective of the optimal stopping problem that we study aims at maximising the performance criterion τ
The SDE (1.4), has a unique non-explosive strong solution. Given such a solution X, which exists on any given filtered probability space Ω, F, (Ft), P satisfying the usual conditions and supporting a standard onedimensional (Ft)-Brownian motion W, the value function of the discretionary stopping problem that we solve is defined by v(x) = sup E e−rτ (Xτ − K)+1{τ
Summary
We consider the optimal stopping of the one-dimensional SDE with generalised drift ι t. The SDE (1.4), has a unique non-explosive strong solution Given such a solution X, which exists on any given filtered probability space Ω, F , (Ft), P satisfying the usual conditions and supporting a standard onedimensional (Ft)-Brownian motion W , the value function of the discretionary stopping problem that we solve is defined by v(x) = sup E e−rτ (Xτ − K)+1{τ
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