The Borda count in n-dimensional issue space

We provide a natural extension of the Borda count to the n-dimensional spatial context, an algorithm to find the spatial Borda winner based on the notion of an inverse Borda count, the result that the Borda winner and the Condorcet winner coincide in unidimensional space when all alternatives on a line are feasible, results that show that in multi-dimensional space the Borda winner and the Condorcet winner (except under very implausible circumstances) will be distinct, and some results on the manipulability of outcomes under the Borda rule as a function of the domain of alternatives over which the Borda count is to be defined. Copyright Kluwer Academic Publishers 1988