Jensen's model proposes another risk adjusted performance measure. This measure was developed by Michael C. Jensen and is sometimes referred to as the Differential return Method. This measure involves evaluation of the returns that the fund has generated vs. the returns actually expected out of the fund given the level of its systematic risk. The surplus between the two returns is called alpha, which measures the performance of a fund compared with the actual returns over the period. Required return of a fund at a given level of risk (Bi) can be calculated as:
Similar financial termsJensen index
Index that uses the capital asset pricing model to determine whether a money manager outperformed a market index. The alpha of an investment or investment manager.
The Black-Scholes model is the most commonly used formula when evaluating European call and put options. The equation was first published by economists Myron Scholes and the late Fisher Black in 1973. Later, Scholes and Robert Merton earned the Nobel Prize in Economics (1997) for the work done on the model and for its general contribution to the understanding of valuation of financial assets.
The formula makes some key assumptions that must be fulfilled in order to give the right answer ...
Yield curve option-pricing models
Models that can incorporate different volatility assumptions along the yield curve, such as the Black-Derman-Toy model. Also called arbitrage-free option-pricing models.
Two-state option pricing model
An option pricing model in which the underlying asset can take on only two possible (discrete) values in the next time period for each value it can take on in the preceding time period. Also called the binomial option pricing model.
Black's zero-beta version of the capital asset pricing model.
Liability-matching models that assume that the liability payments and the asset cash flows are uncertain.
Simple linear trend model
An extrapolative statistical model that asserts that earnings have a base level and grow at a constant amount each period.
Single index model
A model of stock returns that decomposes influences on returns into a systematic factor, as measured by the return on the broad market index, and firm specific factors.
Single factor model
A model of security returns that acknowledges only one common factor.
Pie model of capital structure
A model of the debt/equity ratio of the firms, graphically depicted in slices of a pie that represent the value of the firm in the capital markets.
The process of creating a depiction of reality, such as a graph, picture, or mathematical representation.
This relationship is sometimes called the single-index model. The market model says that the return on a security depends on the return on the market portfolio and the extent of the security's responsiveness as measured, by beta. In addition, the return will also depend on conditions that are unique to the firm. Graphically, the market model can be depicted as a line fitted to a plot of asset returns against returns on the market portfolio.
Binomial option pricing model
An option pricing model in which the underlying asset can take on only two possible, discrete values in the next time period for each value that it can take on in the preceding time period.
Also called the Gordon-Shapiro model, an application of the dividend discount model which assumes (a) a fixed growth rate for future dividends and (b) a single discount rate.
Extrapolative statistical models
Statistical models that apply a formula to historical data and project results for a future period. Such models include the simple linear trend model, the simple exponential model, and the simple autoregressive model.
Harrod-Domar growth model
An economic model which maintains that the growth rate of GDP depends upon the level of savings and the capital output ratio.
Ho-Lee Option Model
An arbitrage free model which uses an estimated spot curve to evaluate embedded options in credit or fixed income securities.