Modelling host population support for combat adversaries
研究蓝、绿、红三方的对抗动力学模型,其中绿方分为支持蓝、支持红和中性三组,其支持影响双方战斗力,且支持度受人口容量限制,旨在分析反叛乱中维持战斗力与第三方支持平衡的制胜因素。
We consider a model of adversarial dynamics consisting of three populations, labelled Blue, Green, and Red, which evolve under a system of first order nonlinear differential equations. Red and Blue populations are adversaries and interact via a set of Lanchester combat laws. Green is divided into three sub-populations: Red supporters, Blue supporters, and Neutral. Green support for Red and Blue leads to more combat effectiveness for either side. From Green’s perspective, if either Red or Blue exceeds a size according to the capacity of the local population to facilitate or tolerate, then support for that side diminishes; the corresponding Green population reverts to the neutral sub-population, who do not contribute to combat effectiveness of either side. The mechanism for supporters deciding if either Blue or Red is too big is given by a logistic-type interaction term. The intent of the model is to examine the role of influence in complex adversarial situations typical in counter-insurgency, where victory requires a genuine balance between maintaining combat effectiveness and support from a third party whose backing is not always assured.