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Homogeneous of degree 1 |
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Homogeneous of degree 1The same as linearly homogeneous and, for a production function, constant returns to scale. See homogeneous of degree X.Similar MatchesHomogeneous of degree XHomogeneous of degree XA homogeneous function where the monotonic function is the constant raised to the exponent X: F(lV)=lXF(V). For X>1, see increasing returns to scale; for X<1, see decreasing returns to scale. Homogeneous of degree zeroHomogeneous of degree zeroThe property of a function that, if you scale all arguments by the same proportion, the value of the function does not change. See homogeneous of degree X. In the H-O Model, CRTS production functions imply that marginal products have this property, which is critical for FPE. Homogeneous expectations assumptionHomogeneous expectations assumptionAn assumption of Markowitz portfolio construction that investors have the same expectations with respect to the inputs that are used to derive efficient portfolios: asset returns, variances, and covariances. HomogeneousHomogeneousExhibiting a high degree of homogeneity. Homogeneous functionHomogeneous functionA function with the property that multiplying all arguments by a constant changes the value of the function by a monotonic function of that constant: F(lV)=g(l)F(V), where F(·) is the homogeneous function, V is a vector of arguments, l>0 is any constant, and g(·) is some strictly increasing positive function. Special cases include homogeneous of degree X and linearly homogeneous. Further SuggestionsZero degree homogeneousLinearly homogeneous Homogeneous product First degree homogeneous |
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