Slutsky equation

The Slutsky equation (or Slutsky identity) in economics, named after Eugen Slutsky, relates changes in Marshallian (uncompensated) demand to changes in Hicksian (compensated) demand, which is known as such since it compensates to maintain a fixed level of utility. There are two parts of the Slutsky equation, namely the substitution effect, and income effect. In general, the substitution effect is negative. He designed this formula to explore a consumer's response as the price changes. When the price increases, the budget set moves inward, which causes the quantity demanded to decrease. In contrast, when the price decreases, the budget set moves outward, which leads to an increase in the quantity demanded. The equation demonstrates that the change in the demand for a good, caused by a price change, is the result of two effects: The Slutsky equation (or Slutsky identity) in economics, named after Eugen Slutsky, relates changes in Marshallian (uncompensated) demand to changes in Hicksian (compensated) demand, which is known as such since it compensates to maintain a fixed level of utility. There are two parts of the Slutsky equation, namely the substitution effect, and income effect. In general, the substitution effect is negative. He designed this formula to explore a consumer's response as the price changes. When the price increases, the budget set moves inward, which causes the quantity demanded to decrease. In contrast, when the price decreases, the budget set moves outward, which leads to an increase in the quantity demanded. The equation demonstrates that the change in the demand for a good, caused by a price change, is the result of two effects: The Slutsky equation decomposes the change in demand for good i in response to a change in the price of good j: where h ( p , u ) {displaystyle h(mathbf {p} ,u)} is the Hicksian demand and x ( p , w ) {displaystyle x(mathbf {p} ,w)} is the Marshallian demand, at the vector of price levels p {displaystyle mathbf {p} } , wealth level (or, alternatively, income level) w {displaystyle w} , and fixed utility level u {displaystyle u} given by maximizing utility at the original price and income, formally given by the indirect utility function v ( p , w ) {displaystyle v(mathbf {p} ,w)} . The right-hand side of the equation is equal to the change in demand for good i holding utility fixed at u minus the quantity of good j demanded, multiplied by the change in demand for good i when wealth changes. The first term on the right-hand side represents the substitution effect, and the second term represents the income effect. Note that since utility is not observable, the substitution effect is not directly observable, but it can be calculated by reference to the other two terms in the Slutsky equation, which are observable. This process is sometimes known as the Hicks decomposition of a demand change. The equation can be rewritten in terms of elasticity: where εp is the (uncompensated) price elasticity, εph is the compensated price elasticity, εw,i the income elasticity of good i, and bj the budget share of good j.