Add to ORKGSteg J-H. Symmetric equilibria in stochastic timing games. Center for Mathematical Economics Working Papers. Vol 543. Bielefeld: Center for Mathematical Economics; 2015.We construct subgame-perfect equilibria with mixed strategies for symmetric stochastic timing games with arbitrary strategic incentives. The strategies are qualitatively different for local first- or second-mover advantages, which we analyse in turn. When there is a local second-mover advantage, the players may conduct a war of attrition with stopping rates that we characterize in terms of the Snell envelope from the general theory of optimal stopping, which is very general but provides a clear interpretation. With a local first-mover advantage, stopping typically results fr...
This paper considers a real options model with incomplete information in a duopoly setting. I show t...
Steg J-H. On preemption in discrete and continuous time. Center for Mathematical Economics Working P...
Steg J-H. Preemptive Investment under Uncertainty. Center for Mathematical Economics Working Papers....
Steg J-H. Symmetric equilibria in stochastic timing games. Center for Mathematical Economics Working...
Riedel F, Steg J-H. Subgame-Perfect Equilibria in Stochastic Timing Games. Center for Mathematical E...
Abstract: We develop a notion of subgames and the related notion of subgame-perfect equilibrium – po...
We study a generic family of two-player continuous-time nonzero-sum stopping games modeling a war of...
This paper studies strongly symmetric equilibria (SSE) in continuous-time games of strategic experim...
This paper studies strongly symmetric equilibria (SSE) in continuous-time games of strategic experim...
We define a new solution concept for an undiscounted dynamic game - a perfect uniform normal-form co...
This paper considers the problem of investment timing under uncertainty in a duopoly framework. When...
We study games of optimal stopping (Dynkin games). A Dynkin game is a mathematical model involving s...
Steg J-H, Thijssen J. Quick or Persistent? Strategic Investment Demanding Versatility. Center for Ma...
AbstractStrategies in a stochastic game are δ-perfect if the induced one-stage games have certain δ-...
This paper considers the problem of investment timing under uncertainty in a duopoly framework.When ...
This paper considers a real options model with incomplete information in a duopoly setting. I show t...
Steg J-H. On preemption in discrete and continuous time. Center for Mathematical Economics Working P...
Steg J-H. Preemptive Investment under Uncertainty. Center for Mathematical Economics Working Papers....
Steg J-H. Symmetric equilibria in stochastic timing games. Center for Mathematical Economics Working...
Riedel F, Steg J-H. Subgame-Perfect Equilibria in Stochastic Timing Games. Center for Mathematical E...
Abstract: We develop a notion of subgames and the related notion of subgame-perfect equilibrium – po...
We study a generic family of two-player continuous-time nonzero-sum stopping games modeling a war of...
This paper studies strongly symmetric equilibria (SSE) in continuous-time games of strategic experim...
This paper studies strongly symmetric equilibria (SSE) in continuous-time games of strategic experim...
We define a new solution concept for an undiscounted dynamic game - a perfect uniform normal-form co...
This paper considers the problem of investment timing under uncertainty in a duopoly framework. When...
We study games of optimal stopping (Dynkin games). A Dynkin game is a mathematical model involving s...
Steg J-H, Thijssen J. Quick or Persistent? Strategic Investment Demanding Versatility. Center for Ma...
AbstractStrategies in a stochastic game are δ-perfect if the induced one-stage games have certain δ-...
This paper considers the problem of investment timing under uncertainty in a duopoly framework.When ...
This paper considers a real options model with incomplete information in a duopoly setting. I show t...
Steg J-H. On preemption in discrete and continuous time. Center for Mathematical Economics Working P...
Steg J-H. Preemptive Investment under Uncertainty. Center for Mathematical Economics Working Papers....