Ioffe's normal cone and the foundations of welfare economics: The infinite dimensional theory
From MaRDI portal
Publication:1190335
DOI10.1016/0022-247X(91)90376-BzbMath0747.90009MaRDI QIDQ1190335
Publication date: 27 September 1992
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
Related Items (6)
Nonlinear prices in nonconvex economies with classical Pareto and strong Pareto optimal allocations ⋮ Supporting weakly Pareto optimal allocations in infinite dimensional nonconvex economies ⋮ The Dubovickij-Miljutin lemma and characterizations of optimal allocations in non-smooth economies ⋮ General equilibrium theory and increasing returns ⋮ Variational analysis and mathematical economics 1: Subdifferential calculus and the second theorem of welfare economics ⋮ An abstract extremal principle with applications to welfare economics
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Ioffe's normal cone and the foundations of welfare economics: an example
- Valuation equilibrium and Pareto optimum in non-convex economies
- An Extension of the Second Welfare Theorem to Economies with Nonconvexities and Public Goods
- Approximate Subdifferentials and Applications. I: The Finite Dimensional Theory
- Characterization of Clarke's tangent and normal cones in finite and infinite dimensions
- Nonsmooth Milyutin-Dubovitskii Theory and Clarke's Tangent Cone
- Approximate subdifferentials and applications II
- Pareto optimal allocations of nonconvex economies in locally convex spaces
- Clarke's tangent cones and the boundaries of closed sets in Rn
- Generalized Directional Derivatives and Subgradients of Nonconvex Functions
- Generalized Gradients and Applications
- Directionally Lipschitzian Functions and Subdifferential Calculus
- Lindahl's Solution and the Core of an Economy with Public Goods
- The Coefficient of Resource Utilization
- VALUATION EQUILIBRIUM AND PARETO OPTIMUM
This page was built for publication: Ioffe's normal cone and the foundations of welfare economics: The infinite dimensional theory
