We investigate the geometry of finite datasets defined by equilibrium prices, income distributions, and total resources. We show that the equilibrium condition imposes no restrictions if total resources are collinear, a property that is robust to small perturbations. We also show that the set of equilibrium datasets is pathconnected when the equilibrium condition does impose restrictions on datasets, as for example when total resources are widely noncollinear.Equilibrium manifold Rationalizability Pathconnectedness
International audienceIn this paper, we introduce a new proximal algorithm for equilibrium problems ...
In a smooth pure exchange economy with fixed total resources we investigate whether the smooth selec...
The recent results in von Mouche and Quartieri (Econ Bull 35(2):1299-1305, 2015) on equilibrium (sem...
In this paper we consider a class of pure exchange economies in which the consumption plans may be ...
In this paper we consider a class of pure exchange economies in which the consumption plans may be ...
In a pure exchange smooth economy with fixed total resources, we de- fine the length between two re...
In this paper we prove that the social equilibrium set, of an exchange economy, with consumption spa...
Let E(r) be the equilibrium manifold associated to a smooth pure exchange economy with fixed total r...
In this paper we prove that the social equilibrium set, of an exchange economy, with consumption sp...
It is shown that the property that the equilibrium manifold keeps the memory of the individual deman...
We present a finite system of polynomial inequalities in unobservable variables and market data that ...
In this paper we propose the following conjecture: the equilibrium manifold E(r) is a minimal subman...
In a pure exchange smooth economy with fixed total resources, we construct a Riemannian metric on th...
International audienceThe second welfare theorem and the core-equivalence theorem have been proved t...
Abstract: In a pure exchange smooth economy with fixed total resources, we de-fine the length betwee...
International audienceIn this paper, we introduce a new proximal algorithm for equilibrium problems ...
In a smooth pure exchange economy with fixed total resources we investigate whether the smooth selec...
The recent results in von Mouche and Quartieri (Econ Bull 35(2):1299-1305, 2015) on equilibrium (sem...
In this paper we consider a class of pure exchange economies in which the consumption plans may be ...
In this paper we consider a class of pure exchange economies in which the consumption plans may be ...
In a pure exchange smooth economy with fixed total resources, we de- fine the length between two re...
In this paper we prove that the social equilibrium set, of an exchange economy, with consumption spa...
Let E(r) be the equilibrium manifold associated to a smooth pure exchange economy with fixed total r...
In this paper we prove that the social equilibrium set, of an exchange economy, with consumption sp...
It is shown that the property that the equilibrium manifold keeps the memory of the individual deman...
We present a finite system of polynomial inequalities in unobservable variables and market data that ...
In this paper we propose the following conjecture: the equilibrium manifold E(r) is a minimal subman...
In a pure exchange smooth economy with fixed total resources, we construct a Riemannian metric on th...
International audienceThe second welfare theorem and the core-equivalence theorem have been proved t...
Abstract: In a pure exchange smooth economy with fixed total resources, we de-fine the length betwee...
International audienceIn this paper, we introduce a new proximal algorithm for equilibrium problems ...
In a smooth pure exchange economy with fixed total resources we investigate whether the smooth selec...
The recent results in von Mouche and Quartieri (Econ Bull 35(2):1299-1305, 2015) on equilibrium (sem...
Add to ORKG