Title :
Algebraic solution to a constrained rectilinear minimax location problem on the plane
Author :
Krivulin, Nikolai
Author_Institution :
Fac. of Math. & Mech., St. Petersburg State Univ., St. Petersburg, Russia
Abstract :
We consider a constrained minimax single facility location problem on the plane with rectilinear distance. The feasible set of location points is restricted to rectangles with sides oriented at a 45 degrees angle to the axes of Cartesian co ordinates. To solve the problem, an algebraic approach based on an extremal property of eigenvalues of irreducible matrices in idempotent algebra is applied. A new algebraic solution is given that reduces the problem to finding eigenvalues and eigenvectors of appropriately defined matrices.
Keywords :
algebra; computational geometry; eigenvalues and eigenfunctions; facility location; matrix algebra; minimax techniques; Cartesian coordinates; algebraic approach; algebraic solution; appropriately defined matrices; constrained minimax single facility location problem; constrained rectilinear minimax location problem; eigenvalues and eigenvectors; extremal property; idempotent algebra; irreducible matrices; location points; rectangles; rectilinear distance; eigenvalues and eigenvectors; idempotent semifield; minimax location problem; rectilinear metric;
Conference_Titel :
Multimedia Technology (ICMT), 2011 International Conference on
Conference_Location :
Hangzhou
Print_ISBN :
978-1-61284-771-9
DOI :
10.1109/ICMT.2011.6002526
