Abstract
We study a new search problem in continuous time. In the traditional approach, the basic formulation is to maximize the expected (discounted) return obtained by taking a job, net of search cost incurred until the job is taken. Implicitly assumed in the traditional modeling is that the agent has no job at all during the search period or her decision on a new job is independent of the job situation she is currently engaged in. In contrast, we incorporate the fact that the agent has a job currently and starts searching a new job. Hence we can handle more realistic situation of the search problem. We provide optimal decision rules as to both quitting the current job and taking a new job as well as explicit solutions and proofs of optimality. Further, we extend to a situation where the agent’s current job satisfaction may be affected by sudden downward jumps (e.g., de-motivating events), where we also find an explicit solution; it is rather a rare case that one finds explicit solutions in control problems using a jump diffusion.
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The work of Mingxin Xu is supported by National Science Foundation under the grant SES-0518869 and John H. Biggs Faculty Fellowship. We are grateful to the referee for her/his comments and to Savas Dayanik for valuable discussions on Sect. 3.
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Egami, M., Xu, M. A continuous-time search model with job switch and jumps. Math Meth Oper Res 70, 241–267 (2009). https://doi.org/10.1007/s00186-008-0240-y
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DOI: https://doi.org/10.1007/s00186-008-0240-y