Factor Price Equalization : Geometrical Conditions
スポンサーリンク
概要
- 論文の詳細を見る
This paper presents a geometrical approach to the univalence problem for a system of cost functions. We present a natural (almost tautological) extension of a geometrical theorem due to McKenzie: our sufficient condition is related to the non-separability of two cones formed by convex combinations of the rows of the Jacobian matrix. This means that the cones spanned by the rows of Jacobian matrix (i.e., production coefficients) do not move wildly so that the two cones corresponding to the two end points (i.e., factor price vectors) cannot be separated by the hyperplane orthogonal to the vector of changes in factor prices. Unlike most ofthe previous propositions, our condition can naturally include as a special case such linear systems as having a non-singular matrix. We also give an alternative condition employing the concept of monotone functions. Dual to the above result is one more condition, which is shown to beclosely connected with Kuhn's WARP-like requirement when the given functions are concave as well as homogeneous of degree one.
- 岡山大学の論文
著者
関連論文
- A Univalence Theorem for Nonlinear Mappings: An Elementary Approach
- A Note on Qualitative Economics for Univalence of Nonlinear Mappings
- The Schur Complements and the Le Chatelier-Braun Principle
- A Tentative Model of Development Based on SEWA Philosophy
- The Weak Hawkins-Simon Property after a Suitable Permutation of Columns : Dual Sufficient Conditions
- Factor Price Equalization : Geometrical Conditions
- 学外研究者受け入れについての報告
- A Geometrical Essence of Nonsubstitution Theorems
- Sufficient Conditions for the Weak Hawkins-Simon Property after a Suitable Permutation of Columns
- On durability of consumer goods
- The Effect of Inner Mobility of Shops on Tax Revenue
- Consensus Formation between Two Experts: More Theorems and a Discrete Case