TY - GEN ID - cogprints304 UR - http://cogprints.org/304/ A1 - Smith, B. Y1 - 1997/// N2 - When national borders in the modern sense first began to be established in early modern Europe, non-contiguous and perforated nations were a commonplace. According to the conception of the shapes of nations that is currently preferred, however, nations must conform to the topological model of (approximate) circularity; their borders must guarantee contiguity and simple connectedness, and such borders must as far as possible conform to existing topographical features on the ground. The striving to conform to this model can be seen at work today in Quebec and in Ireland, it underpins much of the rhetoric of the P.L.O., and was certainly to some degree involved as a motivating factor in much of the ethnic cleansing which took place in Bosnia in recent times. The question to be addressed in what follows is: to what extent could inter-group disputes be more peacefully resolved, and ethnic cleansing avoided, if political leaders, diplomats and others involved in the resolution of such disputes could be brought to accept weaker geometrical constraints on the shapes of nations? A number of associated questions then present themselves: What sorts of administrative and logistical problems have been encountered by existing non contiguous nations (such as the United States) and by perforated nations (such as Italy, which circumcludes the Vatican and the Republic of San Marino, and South Africa, which circumcludes Lesotho), and by other nations deviating in different ways from the received geometrical ideal? To what degree is the desire for continuity and simple connectedness a rational desire (based for example on well-founded military or economic considerations), and to what degree does it rest on species of political rhetoric which might be countered by, for example, philosophical argument? These and a series of related questions will form the subject-matter of the present essay PB - Vienna: Holder-Pichler-Tempsky TI - The Cognitive Geometry of War SP - 394 AV - public EP - 403 ER -