Stability of routing strategies for the maximum lifetime problem in ad-hoc wireless networks

Abstract

We solve the maximum lifetime problem for a one-dimensional, regular ad-hoc wireless network with one data collector LN for any data transmission cost energy matrix which elements Ei,j are superadditive functions, i.e., satisfy the inequality ∀i≤ j≤ k\;Ei,j+Ej,k≤ Ei,k. We analyze stability of the solution under modification of two sets of parameters, the amount of data Qi, i∈ [1,N] generated by each node and location of the nodes xi in the network. We assume, that the data transmission cost energy matrix Ei,j is a function of a distance between network nodes and thus the change of the node location causes change of Ei,j. We say, that a solution q(t0) of the maximum network lifetime problem is stable under modification of a given parameter t0 in the stability region U(t0), if the data flow matrix q(t) is a solution of the problem for any t∈ U(t0). In the paper we estimate the size of the stability region U(Q0,d0) for the solution of the maximum network lifetime problem for the LN network in the neighborhoods of the points Q0i=1, d0i=0, where di∈ (-1,1) describes the shift of the nodes from their initial location xi0=i, i.e., xi=i-di.