A maximum entropy approach to the newsvendor problem with partial information
Working paper
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Date
2011-08Metadata
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- Discussion papers (FOR) [568]
Abstract
In this paper, we consider the newsvendor model under partial information, i.e., where
the demand distribution D is partly unknown. We focus on the classical case where the
retailer only knows the expectation and variance of D. The standard approach is then to
determine the order quantity using conservative rules such as minimax regret or Scarf's rule.
We compute instead the most likely demand distribution in the sense of maximum entropy.
We then compare the performance of the maximum entropy approach with minimax regret
and Scarf's rule on large samples of randomly drawn demand distributions. We show that
the average performance of the maximum entropy approach is considerably better than either
alternative, and more surprisingly, that it is in most cases a better hedge against bad results.