The Demand for Information: More Heat than Light
37 Pages Posted: 24 Feb 2005
Date Written: January 2005
Abstract
This paper produces a comprehensive theory of the value of Bayesian information and its static demand. Our key insight is to assume 'natural units' corresponding to the sample size of conditionally i.i.d. signals - focusing on the smooth nearby model of the precision of an observation of a Brownian motion with uncertain drift. In a two state world, this produces the heat equation from physics, and leads to a tractable theory. We derive explicit formulas that harmonize the known small and large sample properties of information, and reveal some fundamental properties of demand: (a) Value 'non-concavity': The marginal value of information is initially zero; (b) The marginal value is convex/rising, concave/peaking, then convex/falling; (c) 'Lumpiness': As prices rise, demand suddenly chokes off (drops to 0); (d) The minimum information costs on average exceed 2.5% of the payoff stakes; (e) Information demand is hill-shaped in beliefs, highest when most uncertain; (f) Information demand is initially elastic at interior beliefs; (g) Demand elasticity is globally falling in price, and approaches 0 as prices vanish; and (h) The marginal value vanishes exponentially fast in price, yielding log demand. Our results are exact for the Brownian case, and approximately true for weak discrete informative signals. We prove this with a new Bayesian approximation result.
Keywords: Value of information, Non-concavity, Heat equation, Demand, Bayesian analysis
JEL Classification: D81, D83
Suggested Citation: Suggested Citation
Do you have a job opening that you would like to promote on SSRN?
Recommended Papers
-
The Optimal Level of Experimentation
By Giuseppe Moscarini and Lones Smith
-
The Optimal Level of Experimentation
By Giuseppe Moscarini and Lones Smith
-
Another Look at the Radner-Stiglitz Nonconcavity in the Value of Information
By Hector Chade and Edward E. Schlee
-
Investment Timing Under Incomplete Information
By J. P. Decamps, Thomas Mariotti, ...
-
Investment Timing Under Incomplete Information
By Jean-paul Decamps, Thomas Mariotti, ...
-
The Law of Large Demand for Information
By Lones Smith and Giuseppe Moscarini
-
The Law of Large Demand for Information
By Giuseppe Moscarini and Lones Smith
-
Expected Consumer's Surplus as an Approximate Welfare Measure
-
Optimal Electoral Timing: Exercise Wisely and You May Live Longer
By Jussi Keppo, Lones Smith, ...
-
Time-Consistent Optimal Stopping
By Lones Smith