Rubbenstroth B. Game Options under Knightian Uncertainty in Discrete Time. Center for Mathematical Economics Working Papers. Vol 619. Bielefeld: Center for Mathematical Economics; 2019.This paper studies two player stopping games in a discrete time multiple prior framework with a finite time horizon. Optimal stopping times as well as recursive formulas for the value processes of the games are derived. These results are used to characterize the set of no-arbitrage prices for a game option. The notion of a no-arbitrage price for a game option is based on the idea to consider the payoff for fixed stopping times as an European option
2012-07-10This dissertation consists of three parts. We first study the continuous time non-zero-sum...
summary:This work is concerned with discrete-time Markov stopping games with two players. At each de...
Steg J-H, Thijssen J. Quick or Persistent? Strategic Investment Demanding Versatility. Center for Ma...
We first study an optimal stopping problem in which a player (an agent) uses a discrete stopping tim...
Li H. Optimal Multiple Stopping Problems Under g-expectation. Applied Mathematics and Optimization ....
This paper studies a two-player zero-sum Dynkin game arising from pricing an option on an asset whos...
Game (Israeli) options in a multi-asset market model with proportional transaction costs are studied...
This paper studies a 2-players zero-sum Dynkin game arising from pricing an option on an asset whose...
We study a class of two-player optimal stopping games (Dynkin games) of preemption type, with uncert...
Vorbrink J. American options with multiple priors in continuous time. Working Papers. Institute of M...
We study zero-sum optimal stopping games associated with perpetual convertible bonds in an extension...
Copyright © 2017 Applied Probability Trust. We study zero-sum optimal stopping games (Dynkin games) ...
The pricing, hedging, optimal exercise and optimal cancellation of game or Israeli options are consi...
summary:This work concerns a class of discrete-time, zero-sum games with two players and Markov tran...
Abstract. We study the problems of efficient hedging of game (Israeli) options when the initial capi...
2012-07-10This dissertation consists of three parts. We first study the continuous time non-zero-sum...
summary:This work is concerned with discrete-time Markov stopping games with two players. At each de...
Steg J-H, Thijssen J. Quick or Persistent? Strategic Investment Demanding Versatility. Center for Ma...
We first study an optimal stopping problem in which a player (an agent) uses a discrete stopping tim...
Li H. Optimal Multiple Stopping Problems Under g-expectation. Applied Mathematics and Optimization ....
This paper studies a two-player zero-sum Dynkin game arising from pricing an option on an asset whos...
Game (Israeli) options in a multi-asset market model with proportional transaction costs are studied...
This paper studies a 2-players zero-sum Dynkin game arising from pricing an option on an asset whose...
We study a class of two-player optimal stopping games (Dynkin games) of preemption type, with uncert...
Vorbrink J. American options with multiple priors in continuous time. Working Papers. Institute of M...
We study zero-sum optimal stopping games associated with perpetual convertible bonds in an extension...
Copyright © 2017 Applied Probability Trust. We study zero-sum optimal stopping games (Dynkin games) ...
The pricing, hedging, optimal exercise and optimal cancellation of game or Israeli options are consi...
summary:This work concerns a class of discrete-time, zero-sum games with two players and Markov tran...
Abstract. We study the problems of efficient hedging of game (Israeli) options when the initial capi...
2012-07-10This dissertation consists of three parts. We first study the continuous time non-zero-sum...
summary:This work is concerned with discrete-time Markov stopping games with two players. At each de...
Steg J-H, Thijssen J. Quick or Persistent? Strategic Investment Demanding Versatility. Center for Ma...