Increasing Value of Information Implies Separable Utility (2510.11102v1)

Abstract: We consider decision-making under incomplete information about an unknown state of nature. Utility acts (that is, utility vectors indexed by states of nature) and beliefs (probability distributions over the states of nature) are naturally paired by bilinear duality, giving the expected utility. With this pairing, an expected utility maximizer (DM) is characterized by a continuous closed convex comprehensive set of utility acts (c-utility act set). We show that DM M values information more than DM L if and only if the c-utility act set of DM M is obtained by Minkowski addition from the cutility act set of DM L. In the classic setting of decision theory, this is interpreted as the equivalence between more valuable information, on the one hand, and multiplying decisions and adding utility, on the other hand (additively separable utility). We also introduce the algebraic structure of dioid to describe two operations between DMs: union (adding options) and fusion (multiplying options and adding utilities). We say that DM M is more exible by union (resp. by fusion) than DM L if DM M is obtained by union (resp. by fusion) from DM L. Our main result is that DM M values information more than DM L if and only if DM M is more exible by fusion than DM L. We also study when exibility by union can lead to more valuable information.