textabstractThe median problem is a classical problem in Location Theory: one searches for a location that minimizes the average distance to the sites of the clients. This is for desired facilities as a distribution center for a set of warehouses. More recently, for obnoxious facilities, the antimedian was studied. Here one maximizes the average distance to the clients. In this paper the mixed case is studied. Clients are represented by a profile, which is a sequence of vertices with repetitions allowed. In a signed profile each element is provided with a sign from {+,-}. Thus one can take into account whether the client prefers the facility (with a + sign) or rejects it (with a - sign). The graphs for which all median sets, or all antimed...
textabstractAn antimedian of a profile $\\pi = (x_1, x_2, \\ldots , x_k)$ of vertices of a graph $G$...
__Abstract__ A median (antimedian) of a profile of vertices on a graph G is a vertex that minimiz...
textabstractThe Majority Strategy for finding medians of a set of clients on a graph can be relaxed ...
textabstractThe median problem is a classical problem in Location Theory: one searches for a locati...
textabstractFollowing the Majority Strategy in graphs, other consensus strategies, namely Plurality ...
This report is a preprint. It is not a formal publication in any way, and it will be published elsew...
markdownabstract__Abstract__ A location problem can often be phrased as a consensus problem or a ...
AbstractThe median of a profile π=(u1,…,uk) of vertices of a graph G is the set of vertices x that m...
textabstractA profile = (x1, ..., xk), of length k, in a finite connected graph G is a sequence of v...
__Abstract__ A median (antimedian) of a profile of vertices on a graph $G$ is a vertex that minim...
textabstractThe general problem in location theory deals with functions that find sites on a graph (...
AbstractThe general problem in location theory deals with functions that find sites to minimize some...
AbstractIn a tree one can find the median set of a profile simply by starting at an arbitrary vertex...
The median of a profile = (u1, . . . , uk ) of vertices of a graph G is the set of vertices x that...
The median (antimedian) set of a profile ss = (u1,..., uk) of vertices ofa graph G is the set of ver...
textabstractAn antimedian of a profile $\\pi = (x_1, x_2, \\ldots , x_k)$ of vertices of a graph $G$...
__Abstract__ A median (antimedian) of a profile of vertices on a graph G is a vertex that minimiz...
textabstractThe Majority Strategy for finding medians of a set of clients on a graph can be relaxed ...
textabstractThe median problem is a classical problem in Location Theory: one searches for a locati...
textabstractFollowing the Majority Strategy in graphs, other consensus strategies, namely Plurality ...
This report is a preprint. It is not a formal publication in any way, and it will be published elsew...
markdownabstract__Abstract__ A location problem can often be phrased as a consensus problem or a ...
AbstractThe median of a profile π=(u1,…,uk) of vertices of a graph G is the set of vertices x that m...
textabstractA profile = (x1, ..., xk), of length k, in a finite connected graph G is a sequence of v...
__Abstract__ A median (antimedian) of a profile of vertices on a graph $G$ is a vertex that minim...
textabstractThe general problem in location theory deals with functions that find sites on a graph (...
AbstractThe general problem in location theory deals with functions that find sites to minimize some...
AbstractIn a tree one can find the median set of a profile simply by starting at an arbitrary vertex...
The median of a profile = (u1, . . . , uk ) of vertices of a graph G is the set of vertices x that...
The median (antimedian) set of a profile ss = (u1,..., uk) of vertices ofa graph G is the set of ver...
textabstractAn antimedian of a profile $\\pi = (x_1, x_2, \\ldots , x_k)$ of vertices of a graph $G$...
__Abstract__ A median (antimedian) of a profile of vertices on a graph G is a vertex that minimiz...
textabstractThe Majority Strategy for finding medians of a set of clients on a graph can be relaxed ...