An Optimal Stopping Problem with Two Decision Makers

Abstract: We investigate in this paper an optimal stopping problem where two decision makers are involved in the selection of a single offer. Suppose that n offers are examined one at a time by both decision makers. At each stage, a decision must be taken: accept the current offer and stop the selection process, or discard it and examine the next offer. We assume that no recall of previously examined offers is allowed. A conflict arises when one decision maker decides to accept a currently inspected offer and the second… Show more

“…In [30] a multiple objective optimal stopping problem is solved. The authors proposed to stop the selection process of the Bilateral Optimal Selection Problem (BOSP) if either DM decides to stop.…”

“…where Ev p (i, 1, k p ) is the maximum expected utility of DM p by following the optimal strategy when the ith offer, with relative ranks k p and k p is examined, Ev p c (i) is the expected utility of DM p when postponing the decision to the next stage and Ev p s (i, 1, k p ) is the expected utility of DM p when stopping at stage i and selecting the current offer with relative ranks k p and k p . In [30] the authors developed the game formulation of the problem through the backward recursive equations of each DM. Then, they studied the problem for a specific case of the proposed utility and they showed how each DM should foresee his opponent's individual decision.…”

Dynamic programming and optimal control for vector-valued functions: A state-of-the-art review

“…In [30] a multiple objective optimal stopping problem is solved. The authors proposed to stop the selection process of the Bilateral Optimal Selection Problem (BOSP) if either DM decides to stop.…”

“…where Ev p (i, 1, k p ) is the maximum expected utility of DM p by following the optimal strategy when the ith offer, with relative ranks k p and k p is examined, Ev p c (i) is the expected utility of DM p when postponing the decision to the next stage and Ev p s (i, 1, k p ) is the expected utility of DM p when stopping at stage i and selecting the current offer with relative ranks k p and k p . In [30] the authors developed the game formulation of the problem through the backward recursive equations of each DM. Then, they studied the problem for a specific case of the proposed utility and they showed how each DM should foresee his opponent's individual decision.…”

Dynamic programming and optimal control for vector-valued functions: A state-of-the-art review

An Experimental Investigation of the Optimal Selection Problem with Two Decision Makers

Multi-criteria optimal stopping methods applied to the portfolio optimisation problem