Abstract
In this paper we study a discrete-time optimal switching problem on a finite horizon. The underlying model has a running reward, terminal reward, and signed (positive and negative) switching costs. Using optimal stopping theory for discrete-parameter stochastic processes, we extend a well-known explicit dynamic programming method for computing the value function and the optimal strategy to the case of signed switching costs.
Citation
R. Martyr. "Dynamic programming for discrete-time finite-horizon optimal switching problems with negative switching costs." Adv. in Appl. Probab. 48 (3) 832 - 847, September 2016.
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