Coarse-graining and the Blackwell order

Abstract

Suppose we have a pair of information channels, 1,2, with a common input. The Blackwell order is a partial order over channels that compares 1 and 2 by the maximal expected utility an agent can obtain when decisions are based on the channel outputs. Equivalently, 1 is said to be Blackwell-inferior to 2 if and only if 1 can be constructed by garbling the output of 2. A related partial order stipulates that 2 is more capable than 1 if the mutual information between the input and output is larger for 2 than for 1 for any distribution over inputs. A Blackwell-inferior channel is necessarily less capable. However, examples are known where 1 is less capable than 2 but not Blackwell-inferior. We show that this may even happen when 1 is constructed by coarse-graining the inputs of 2. Such a coarse-graining is a special kind of "pre-garbling" of the channel inputs. This example directly establishes that the expected value of the shared utility function for the coarse-grained channel is larger than it is for the non-coarse-grained channel. This contradicts the intuition that coarse-graining can only destroy information and lead to inferior channels. We also discuss our results in the context of information decompositions.