Add to ORKGThe strong Whitney topology on the sets of maps of smooth manifolds induces a topology on the set of preferences in euclidean space. We prove that the obtained space is not connected which implies that there is no continuous social choice function defined on a finite power of this space. We also show that the obtained space is not normal
The problem of endowing preferences with manifold structures emerged from discussions with Gerard D...
Existence of equilibrium of a continuous preference relation p or correspondence P on a compact topo...
In this paper we study a utility representation for preferences, and we price its continuity, using ...
AbstractThe existence of a social choice model on a preference space P is a topological, even homoto...
The topological approach to social choice was developed by Graciela Chichilnisky in the beginning of...
In this paper, we analyze the main topological properties of a relevant class of topologies associat...
The problem of endowing preferences with manifold structures emerged from discussions with Gerard De...
This paper characterizes continuity and upper and lower semicontinuity of preference relations, whic...
This paper characterizes continuity and upper and lower semicontinuity of preference relations, whic...
This paper revisits the aggregation theorem of Chichilnisky (1980), replacing the original smooth to...
Social choice theory is concerned with providing a rationale for social decisions when individuals h...
AbstractVarious topological results are examined in models of Zermelo-Fraenkel set theory that do no...
A preference relation is shown to be continuous with respect to some separable topology, if and only...
Abstract. We extend van Dalen and Wattel’s (1973) characterization of orderable spaces and their sub...
AbstractVarious types of continuity for preference relations on a metric space are examined construc...
The problem of endowing preferences with manifold structures emerged from discussions with Gerard D...
Existence of equilibrium of a continuous preference relation p or correspondence P on a compact topo...
In this paper we study a utility representation for preferences, and we price its continuity, using ...
AbstractThe existence of a social choice model on a preference space P is a topological, even homoto...
The topological approach to social choice was developed by Graciela Chichilnisky in the beginning of...
In this paper, we analyze the main topological properties of a relevant class of topologies associat...
The problem of endowing preferences with manifold structures emerged from discussions with Gerard De...
This paper characterizes continuity and upper and lower semicontinuity of preference relations, whic...
This paper characterizes continuity and upper and lower semicontinuity of preference relations, whic...
This paper revisits the aggregation theorem of Chichilnisky (1980), replacing the original smooth to...
Social choice theory is concerned with providing a rationale for social decisions when individuals h...
AbstractVarious topological results are examined in models of Zermelo-Fraenkel set theory that do no...
A preference relation is shown to be continuous with respect to some separable topology, if and only...
Abstract. We extend van Dalen and Wattel’s (1973) characterization of orderable spaces and their sub...
AbstractVarious types of continuity for preference relations on a metric space are examined construc...
The problem of endowing preferences with manifold structures emerged from discussions with Gerard D...
Existence of equilibrium of a continuous preference relation p or correspondence P on a compact topo...
In this paper we study a utility representation for preferences, and we price its continuity, using ...