A primal-dual approximation algorithm for a two depot heterogeneous traveling salesman problem

Surveillance applications require a collection of heterogeneous vehicles to visit a set of targets. We consider a fundamental routing problem that arises in these applications involving two vehicles. Specifically, we consider a routing problem where there are two heterogeneous vehicles that start from distinct initial locations and a set of targets. The objective is to find a tour for each vehicle such that each of the targets is visited at least once by a vehicle and the sum of the distances traveled by the vehicles is minimal. We consider an important special case of this routing problem where the travel costs satisfy the triangle inequality and the following monotonicity property: the first vehicle’s cost of traveling between any two targets is at most equal to the second vehicle’s cost of traveling between the same targets. We present a primal-dual algorithm for this case that provides an approximation ratio of 2.

[1]  L. Shepp,et al.  OPTIMAL PATHS FOR A CAR THAT GOES BOTH FORWARDS AND BACKWARDS , 1990 .

[2]  Nicos Christofides Worst-Case Analysis of a New Heuristic for the Travelling Salesman Problem , 1976, Operations Research Forum.

[3]  Gerhard J. Woeginger,et al.  Complexity and approximation of an area packing problem , 2012, Optim. Lett..

[4]  Inge Li Gørtz,et al.  Capacitated Vehicle Routing with Non-Uniform Speeds , 2010, IPCO.

[5]  Raja Sengupta,et al.  3/2-approximation algorithm for two variants of a 2-depot Hamiltonian path problem , 2010, Oper. Res. Lett..

[6]  Sivakumar Rathinam,et al.  An Approximation Algorithm for a Heterogeneous Traveling Salesman Problem , 2011 .

[7]  David P. Williamson,et al.  A general approximation technique for constrained forest problems , 1992, SODA '92.

[8]  Raja Sengupta,et al.  A Resource Allocation Algorithm for Multivehicle Systems With Nonholonomic Constraints , 2007, IEEE Transactions on Automation Science and Engineering.

[9]  Vijay V. Vazirani,et al.  Approximation Algorithms , 2001, Springer Berlin Heidelberg.

[10]  Swaroop Darbha,et al.  An approximation algorithm for a symmetric Generalized Multiple Depot, Multiple Travelling Salesman Problem , 2007, Oper. Res. Lett..

[11]  Swaroop Darbha,et al.  3-Approximation algorithm for a two depot, heterogeneous traveling salesman problem , 2012, Optim. Lett..

[12]  Kaarthik Sundar,et al.  Algorithms for Routing an Unmanned Aerial Vehicle in the Presence of Refueling Depots , 2013, IEEE Transactions on Automation Science and Engineering.

[13]  Gregory L Feitshans,et al.  Vigilant Spirit Control Station (VSCS) "The Face of COUNTER" , 2008 .

[14]  Inge Li Gørtz,et al.  Capacitated Vehicle Routing with Nonuniform Speeds , 2016, Math. Oper. Res..