Journal of Advances in Mathematics and Computer Science

Tobin's one-fund theorem states that, when a portfolio is consisting of some risky assets and a riskless asset (with return rc), then every ecient portfolio in the Mean-Variance optimization is a combination of the tangency portfolio and the riskless asset. We introduce the notion of free asset, which is an uncorrelated risky asset, and convert the problem for determining the tangency portfolio to a problem with lower complexity, which requires smaller portfolio, by excluding free assets with mean return rc from initial portfolio. We show that a set of free assets, with the same mean return, can be replaced by one particular free asset with the mean return to obtain the same results. We also show that free assets (or a set of free assets) with mean return rc and the riskless asset have a close connection and under special conditions, they almost have the same role in Mean-Variance portfolio selection problems.