A mathematical model for the study of the behavior of a spatially distributed group of heterogeneous vehicles is introduced. We present a way to untangle the coupling between the assignment of any vehicle’s position and the assignment of all other vehicle positions by defining general sensing and moving conditions that guarantee that even when the vehicles’ motion and sensing are highly constrained, they ultimately achieve a stable emergent distribution. The achieved distribution is optimal in the sense that the proportion of vehicles allocated over each area matches the relative importance of being assigned to that area. Based on these conditions, we design a cooperative control scheme for a multivehicle surveillance problem and show how the vehicles’ maneuvering and sensing abilities, and the spatial characteristics of the region under surveillance, affect the desired distribution and the rate at which it is achieved.

1.
Radner
,
R.
, 1962, “
Team Decision Problems
,”
Ann. Math. Stat.
0003-4851,
33
, pp.
857
881
.
2.
Beard
,
R. W.
, and
McLain
,
T. W.
, 2003, “
Multiple UAV Cooperative Search Under Collision Avoidance and Limited Range Communication Constraints
,”
IEEE Conference on Decision and Control
,
HI
, pp.
25
30
.
3.
Castañon
,
D. A.
, and
Wu
,
C.
, 2003, “
Distributed Algorithms for Dynamic Reassignment
,”
IEEE Conference on Decision and Control
,
HI
, pp.
13
18
.
4.
Moore
,
B. J.
, and
Passino
,
K. M.
, 2004, “
Coping With Information Delays in the Assignment of Mobile Agents to Stationary Tasks
,”
IEEE Conference on Decision and Control
,
Paradise Island
,
Bahamas
, pp.
3339
3344
.
5.
Finke
,
J.
,
Passino
,
K.
, and
Sparks
,
A.
, 2006, “
Stable Task Load Balancing Strategies for Cooperative Control of Networked Autonomous Air Vehicles
,”
IEEE Trans. Control Syst. Technol.
1063-6536,
14
,
789
803
.
6.
Subramanian
,
S. K.
, and
Cruz
,
J. B.
, 2003, “
Adaptive Models of Pop-Up Threats for Multi-Agent Persistent Area Denial
,” in
IEEE Conference on Decision and Control
,
Maui, HI
, pp.
510
515
.
7.
Liu
,
Y.
, and
Cruz
,
J. B.
, 2004, “
Coordinating Networked Uninhabited Air Vehicles for Persistent Area Denial
,”
IEEE Conference on Decision and Control
,
Paradise Island
,
Bahamas
, pp.
3351
3356
.
8.
Moore
,
B. J.
, and
Passino
,
K. M.
, 2006, “
Spatial Balancing of Autonomous Vehicle Resources
,”
American Control Conference
,
Minneapolis
,
MN
, pp.
35
40
.
9.
Stone
,
L. D.
, 1989,
Theory of Optimal Search
,
ORSA
,
Arlington, VA
.
10.
Laporte
,
G.
, 1992, “
The Vehicle Routing Problem: An Overview of the Exact and Approximate Algorithms
,”
Eur. J. Oper. Res.
0377-2217,
59
, pp.
345
358
.
11.
Li
,
W.
, and
Cassandras
,
C. G.
, 2004, “
Stability Properties of a Receding Horizon Controller for Cooperating UAVs
,”
IEEE Conference on Decision and Control
,
Paradise Island
,
Bahamas
, pp.
2905
2910
.
12.
Hespanha
,
J.
, and
Kizilocak
,
H.
, 2002, “
Efficient Computation of Dynamic Probabilistic Maps
,”
Mediterranean Conference on Control and Automation
,
Lisbon, Portugal
.
13.
Fretwell
,
S. D.
, and
Lucas
,
H. L.
, 1970, “
On Territorial Behavior and Other Factors Influencing Distribution in Birds
,”
Acta Biotheor.
0001-5342,
19
,
16
36
.
14.
Finke
,
J.
, and
Passino
,
K.
, 2006, “
Stable Emergent Heterogeneous Agent Distributions in Noisy Environments
,”
American Control Conference
,
Minneapolis, MN
, pp.
2130
2135
.
15.
Finke
,
J.
, and
Passino
,
K. M.
, 2005, “
Stable Cooperative Multiagent Spatial Distributions
,”
IEEE Conference on Decision and Control
,
Seville
,
Spain
, pp.
3566
3571
.
16.
Bertsekas
,
D.
, and
Tsitsiklis
,
J.
, 1997,
Parallel and Distributed Computation: Numerical Methods
,
Athena Scientific
,
Belmont, MA
.
17.
Passino
,
K. M.
, and
Burgess
,
K. L.
, 1998,
Stability Analysis of Discrete Event Systems
,
Wiley
,
New York
.
18.
Burgess
,
K. L.
, and
Passino
,
K. M.
, 1995, “
Stability Analysis of Load Balancing Systems
,”
Int. J. Control
0020-7179,
61
, pp.
357
393
.
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