The single-index model (SIM) is a simple

asset pricing In financial economics, asset pricing refers to a formal treatment and development of two main pricing principles, outlined below, together with the resultant models. There have been many models developed for different situations, but correspon ...

model to measure both the risk and the return of a

stock In finance, stock (also capital stock) consists of all the shares by which ownership of a corporation or company is divided.Longman Business English Dictionary: "stock - ''especially AmE'' one of the shares into which ownership of a company ...

. The model has been developed by William Sharpe in 1963 and is commonly used in the

finance Finance is the study and discipline of money, currency and capital assets. It is related to, but not synonymous with economics, the study of production, distribution, and consumption of money, assets, goods and services (the discipline of fina ...

industry. Mathematically the SIM is expressed as: :

r_ - r_f = \alpha_i + \beta_i(r_ - r_f) + \epsilon_ \,

\epsilon_ \sim N(0,\sigma_i^2) \,

where: : ''r_it'' is return to stock ''i'' in period ''t'' : ''r_f'' is the risk free rate (i.e. the interest rate on treasury bills) : ''r_mt'' is the return to the market portfolio in period ''t'' :

\alpha_i

is the stock's

alpha Alpha (uppercase , lowercase ; grc, ἄλφα, ''álpha'', or ell, άλφα, álfa) is the first letter of the Greek alphabet. In the system of Greek numerals, it has a value of one. Alpha is derived from the Phoenician letter aleph , whic ...

, or abnormal return :

\beta_i

is the stock's beta, or responsiveness to the market return : Note that

r_ - r_f

is called the excess return on the stock,

r_ - r_f

the excess return on the market :

\epsilon_

are the residual (random) returns, which are assumed independent normally distributed with mean zero and standard deviation

\sigma_i

These equations show that the stock return is influenced by the market (beta), has a firm specific expected value (alpha) and firm-specific unexpected component (residual). Each stock's performance is in relation to the performance of a market index (such as the

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). Security analysts often use the SIM for such functions as computing stock betas, evaluating stock selection skills, and conducting event studies.

Assumptions of the single-index model

To simplify analysis, the single-index model assumes that there is only 1 macroeconomic factor that causes the

systematic risk In finance and economics, systematic risk (in economics often called aggregate risk or undiversifiable risk) is vulnerability to events which affect aggregate outcomes such as broad market returns, total economy-wide resource holdings, or aggre ...

affecting all stock returns and this factor can be represented by the rate of return on a market index, such as the

S&P 500 The Standard and Poor's 500, or simply the S&P 500, is a stock market index tracking the stock performance of 500 large companies listed on stock exchanges in the United States. It is one of the most commonly followed equity indices. As of ...

. According to this model, the return of any stock can be decomposed into the expected excess return of the individual stock due to firm-specific factors, commonly denoted by its alpha coefficient (α), the return due to macroeconomic events that affect the market, and the unexpected microeconomic events that affect only the firm. The term

\beta_i(r_m-r_f)

represents the movement of the market modified by the stock's beta, while

\epsilon_

represents the unsystematic risk of the security due to firm-specific factors. Macroeconomic events, such as changes in interest rates or the cost of labor, causes the systematic risk that affects the returns of all stocks, and the firm-specific events are the unexpected microeconomic events that affect the returns of specific firms, such as the death of key people or the lowering of the firm's credit rating, that would affect the firm, but would have a negligible effect on the economy. In a portfolio, the unsystematic risk due to firm-specific factors can be reduced to zero by diversification. The index model is based on the following: * Most stocks have a positive covariance because they all respond similarly to macroeconomic factors. * However, some firms are more sensitive to these factors than others, and this firm-specific variance is typically denoted by its beta (β), which measures its variance compared to the market for one or more economic factors. * Covariance among securities result from differing responses to macroeconomic factors. Hence, the covariance of each stock can be found by multiplying their betas and the market variance: The single-index model assumes that once the market return is subtracted out the remaining returns are uncorrelated: :

E((R_ - \beta_i m_t) (R_ - \beta_k m_t)) = 0,

which gives :

Cov(R_i, R_k) = \beta_i\beta_k\sigma^2.

This is not really true, but it provides a simple model. A more detailed model would have multiple

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. This would require more computation, but still less than computing the covariance of each possible pair of securities in the portfolio. With this equation, only the betas of the individual securities and the market variance need to be estimated to calculate covariance. Hence, the index model greatly reduces the number of calculations that would otherwise have to be made to model a large portfolio of thousands of securities.

Assumptions of the single-index model

See also

Further reading