Article ID: | iaor20011906 |
Country: | United States |
Volume: | 47 |
Issue: | 7 |
Start Page Number: | 541 |
End Page Number: | 558 |
Publication Date: | Oct 2000 |
Journal: | Naval Research Logistics |
Authors: | Wiper M.P., Pettit L.I., Young K.D.S. |
Keywords: | statistics: regression |
We undertake inference for a stochastic form of the Lanchester combat model. In particular, given battle data, we assess the type of battle that occurred and whether or not it makes any difference to the number of casualties if an army is attacking or defending. Our approach is Bayesian and we use modern computational techniques to fit the model. We illustrate our method using data from the Ardennes campaign. We compare our results with previous analyses of these data by Bracken and Fricker. Our conclusions are somewhat different to those of Bracken. Where he suggests that linear law is appropriate, we show that the logarithmic or linear–logarithmic laws fit better. We note however that the basic Lanchester modeling assumptions do not hold for the Ardennes data. Using Fricker's modified data, we show that although his ‘super-logarithmic’ law fits best, the linear, linear–logarithmic, and logarithmic laws cannot be ruled out. We suggest that Bayesian methods can be used to make inference for battles in progress. We point out a number of advantages: Prior information from experts or previous battles can be incorporated; predictions of future casualties are easily made; more complex models can be analysed using stochastic simulation techniques.