Admissible Trading Strategies under Transaction Costs

Abstract

A well known result in stochastic analysis reads as follows: for an R-valued super-martingale X = (Xt)0≤ t ≤ T such that the terminal value XT is non-negative, we have that the entire process X is non-negative. An analogous result holds true in the no arbitrage theory of mathematical finance: under the assumption of no arbitrage, a portfolio process x+(H· S) verifying x+(H· S)T≥ 0 also satisfies x+(H· S)t≥ 0, for all 0 ≤ t ≤ T. In the present paper we derive an analogous result in the presence of transaction costs. A counter-example reveals that the consideration of transaction costs makes things more delicate than in the frictionless setting.