Pareto optimal allocations of nonconvex economies in locally convex spaces
From MaRDI portal
Publication:3823378
DOI10.1016/0362-546X(88)90076-4zbMath0669.90022MaRDI QIDQ3823378
Publication date: 1988
Published in: Nonlinear Analysis: Theory, Methods & Applications (Search for Journal in Brave)
nonsmooth analysisPareto optimal allocationssecond welfare theoremepi- Lipschitzian setshypertangent conesnonconvex economies in locally convex spaces
Nonlinear programming (90C30) Nonsmooth analysis (49J52) General equilibrium theory (91B50) General theory of locally convex spaces (46A03)
Related Items
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 ⋮ Valuation equilibrium and Pareto optimum in non-convex economies ⋮ A second welfare theorem in a non-convex economy: the case of antichain-convexity ⋮ Ioffe's normal cone and the foundations of welfare economics: an example ⋮ Ioffe's normal cone and the foundations of welfare economics: The infinite dimensional theory ⋮ The supremum argument in the new approach to the existence of equilibrium in vector lattices ⋮ On Pareto dominance in decomposably antichain-convex sets ⋮ Prices and Pareto optima ⋮ Characterizations of the Free Disposal Condition for Nonconvex Economies on Infinite Dimensional Commodity Spaces
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- A model of equilibrium with differentiated commodities
- An Extension of the Second Welfare Theorem to Economies with Nonconvexities and Public Goods
- Generalized Directional Derivatives and Subgradients of Nonconvex Functions
- Generalized Gradients and Applications
- Pareto Optimality in Non-Convex Economies
- 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
