论文信息 - The role of measurability in game-theoretic probability

The role of measurability in game-theoretic probability

This paper argues that the requirement of measurability (imposed on trading strategies) is indispensable in continuous-time game-theoretic probability. The necessity of the requirement of measurability in measure theory is demonstrated by results such as the Banach–Tarski paradox and is inherited by measure-theoretic probability. The situation in game-theoretic probability turns out to be somewhat similar in that dropping the requirement of measurability allows a trader in a financial security with a non-trivial price path to become infinitely rich while risking only one monetary unit.

Vladimir Vovk

[1] Christopher S. Hardin,et al. The Mathematics of Coordinated Inference: A Study of Generalized Hat Problems , 2013 .

[2] Stan Wagon,et al. The Banach-Tarski paradox , 1985 .

[3] Christopher S. Hardin,et al. The Mathematics of Coordinated Inference , 2013 .

[4] P. Meyer,et al. Probabilités et potentiel , 1966 .

[5] Vladimir Vovk,et al. Rough paths in idealized financial markets , 2010, 1005.0279.

[6] Vladimir Vovk,et al. Continuous-time trading and the emergence of probability , 2009, Finance and Stochastics.

[7] G. Shafer,et al. Probability and Finance: It's Only a Game! , 2001 .

[8] Daniel J. Velleman,et al. Anonymity in Predicting the Future , 2015 .

[9] Nicolas Perkowski,et al. Pathwise stochastic integrals for model free finance , 2013, 1311.6187.

[10] Christopher S. Hardin,et al. A Peculiar Connection Between the Axiom of Choice and Predicting the Future , 2008, Am. Math. Mon..