We consider a discretionary stopping problem that arises in the context of pricing a class of perpetual American-type call options, which include the perpetual American, Russian and lookback-American call options as special cases. We solve this genuinely two-dimensional optimal stopping problem by means of an explicit construction of its value function. In particular, we fully characterise the free-boundary that provides the optimal strategy, and which involves the analysis of a highly nonlinear ordinary differential equation (ODE). In accordance with other optimal stopping problems involving a running maximum process that have been studied in the literature, it turns out that the associated variational inequality has an uncountable set of ...
The maximality principle [6] is shown to be valid in some examples of discounted optimal stopping pr...
We show how the change-of-variable formula with local time on curves derived recently in Peskir (200...
We consider the problem of pricing the perpetual American call on the time-average of the stock. We ...
We consider a discretionary stopping problem that arises in the context of pricing a class of perpet...
AbstractWe consider a discretionary stopping problem that arises in the context of pricing a class o...
We consider a discretionary stopping problem that arises in the context of pricing a class of perpet...
We study optimal stopping problems related to the pricing of perpetual American options in an extens...
We show that the problem of pricing the American put is equivalent to solving an optimal stopping pr...
We introduce a class of optimal stopping problems in which the gain is at least a fraction of the in...
We show that the optimal stopping boundary for the Russian option with finite horizon can be charact...
Solving optimal stopping problems driven by Lévy processes has been a challenging task and has foun...
Abstract. We show that the optimal stopping boundary for the Russian option with finite horizon can ...
We give a complete and self-contained proof of the existence of a strong solution to the free bounda...
We consider an optimal stopping problem for a Hilbert-space valued diffusion. We prove that the valu...
Optimal stopping and mathematical finance are intimately connected since the value of an American op...
The maximality principle [6] is shown to be valid in some examples of discounted optimal stopping pr...
We show how the change-of-variable formula with local time on curves derived recently in Peskir (200...
We consider the problem of pricing the perpetual American call on the time-average of the stock. We ...
We consider a discretionary stopping problem that arises in the context of pricing a class of perpet...
AbstractWe consider a discretionary stopping problem that arises in the context of pricing a class o...
We consider a discretionary stopping problem that arises in the context of pricing a class of perpet...
We study optimal stopping problems related to the pricing of perpetual American options in an extens...
We show that the problem of pricing the American put is equivalent to solving an optimal stopping pr...
We introduce a class of optimal stopping problems in which the gain is at least a fraction of the in...
We show that the optimal stopping boundary for the Russian option with finite horizon can be charact...
Solving optimal stopping problems driven by Lévy processes has been a challenging task and has foun...
Abstract. We show that the optimal stopping boundary for the Russian option with finite horizon can ...
We give a complete and self-contained proof of the existence of a strong solution to the free bounda...
We consider an optimal stopping problem for a Hilbert-space valued diffusion. We prove that the valu...
Optimal stopping and mathematical finance are intimately connected since the value of an American op...
The maximality principle [6] is shown to be valid in some examples of discounted optimal stopping pr...
We show how the change-of-variable formula with local time on curves derived recently in Peskir (200...
We consider the problem of pricing the perpetual American call on the time-average of the stock. We ...