When all the firms in an industry have equal market shares, H = N\left( \dfrac{1}{N} \right)^2 = \dfrac{1}{N}. The Herfindahl is correlated with the number of firms in an industry because its lower bound when there are
N firms is 1/
N. In the more general case of unequal market share, 1/
H is called "equivalent (or effective) number of firms in the industry",
Neqi or
Neff. An industry with 3 firms cannot have a lower Herfindahl than an industry with 20 firms when firms have equal market shares. But as market shares of the 20-firm industry diverge from equality the Herfindahl can exceed that of the equal-market-share 3-firm industry (e.g., if one firm has 81% of the market and the remaining 19 have 1% each, then H=0.658). A higher Herfindahl signifies a less competitive (i.e., more concentrated) industry.
Appearance in market structure It can be shown that the Herfindahl index arises as a natural consequence of assuming that a given market's structure is described by
Cournot competition. Suppose that we have a Cournot model for competition between n firms with different linear marginal costs and a homogeneous product. Then the profit of the i-th firm \pi_{i} is: \pi_{i} = P(Q)q_{i} - c_{i}q_{i}, \quad Q = \sum_{i=1}^{n}q_{i} where q_{i} is the quantity produced by each firm, c_{i} is the
marginal cost of production for each firm, and P(Q) is the price of the product. Taking the derivative of the firm's profit function with respect to its output to maximize its profit gives us: \frac{\partial\pi_i}{\partial q_i} = 0 \implies P'(Q)q_{i} + P(Q) - c_{i} = 0 \implies - \frac{dP}{dQ} q_{i} = P-c_{i} Dividing by P gives us each firm's
profit margin: {P-c_{i}\over{P}} = -{dP\over{dQ}}{q_{i}\over{P}} = -{dP/P\over{dQ/Q}} {q_{i}\over{Q}} = {s_{i}\over{\eta}} where s_{i} = q_{i}/Q is the market share and \eta = -d\log Q/d\log P is the
price elasticity of demand. Multiplying each firm's profit margin by its market share gives us: s_{1}\left( {P-c_{1}\over{P}} \right) + \cdots + s_{n}\left( {P-c_{n}\over{P}} \right) = {H\over{\eta}} where H is the Herfindahl index. Therefore, the Herfindahl index is directly related to the weighted average of the profit margins of firms under Cournot competition with linear marginal costs.
Effective assets in a portfolio The Herfindahl index is also a widely used metric for
portfolio concentration. In portfolio theory, the Herfindahl index is related to the effective number of positions N_{\text{eff}} = 1/H held in a portfolio, where H = \sum \ |w\ |^{2} is computed as the sum of the squares of the proportion of market value invested in each security. A low H-index implies a very diversified portfolio: as an example, a portfolio with H = 0.02 is equivalent to a portfolio with N_{\text{eff}} = 50 equally weighted positions. The H-index has been shown to be one of the most efficient measures of portfolio diversification. It may also be used as a
constraint to force a portfolio to hold a minimum number of effective assets: \ |w\ |^{2} \leq N_{\text{eff}}^{-1} For commonly used
portfolio optimization techniques, such as
mean-variance and
CVaR, the optimal solution may be found using
second-order cone programming. ==Decomposition==