论文信息 - A bound on the financial value of information

A bound on the financial value of information

It is shown that each bit of information at most doubles the resulting wealth in the general stock-market setup. This information bound on the growth of wealth is actually attained for certain probability distributions on the market investigated by J. Kelly (1956). The bound is shown to be a special case of the result that the increase in exponential growth of wealth achieved with true knowledge of the stock market distribution F over that achieved with incorrect knowledge G is bounded above by the entropy of F relative to G. >

Andrew R. Barron | Thomas M. Cover | T. Cover | A. Barron

[1] H. Chernoff. LARGE-SAMPLE THEORY: PARAMETRIC CASE' , 1956 .

[2] John L. Kelly,et al. A new interpretation of information rate , 1956, IRE Trans. Inf. Theory.

[3] L. Breiman. Optimal Gambling Systems for Favorable Games , 1962 .

[4] Robert M. Bell,et al. Competitive Optimality of Logarithmic Investment , 1980, Math. Oper. Res..

[5] M. Finkelstein,et al. Optimal strategies for repeated games , 1981, Advances in Applied Probability.

[6] Thomas M. Cover,et al. An algorithm for maximizing expected log investment return , 1984, IEEE Trans. Inf. Theory.

[7] Thomas M. Cover,et al. Empirical Bayes stock market portfolios , 1986 .

[8] A. Barron. Are Bayes Rules Consistent in Information , 1987 .

[9] T. Cover,et al. Asymptotic optimality and asymptotic equipartition properties of log-optimum investment , 1988 .

[10] T. Cover,et al. Game-theoretic optimal portfolios , 1988 .