This paper describes and analyzes sporadic model building, which can be used to enhance the efficiency of the hierarchical Bayesian optimization algorithm (hBOA) and other advanced estimation of distribution algorithms (EDAs) that use complex multivariate probabilistic models. With sporadic model building, the structure of the probabilistic model is updated once every few iterations (generations), whereas in the remaining iterations only model parameters (conditional and marginal probabilities) are updated. Since the time complexity of updating model parameters is much lower than the time complexity of learning the model structure, sporadic model building decreases the overall time complexity of model building. The paper shows that for boundedly difficult nearly decomposable and hierarchical optimization problems, sporadic model building leads to a significant model-building speedup that decreases the asymptotic time complexity of model building in hBOA by a factor of Θ(n0.26) to Θ(n0.5), where n is the problem size. On the other hand, sporadic model building also increases the number of evaluations until convergence; nonetheless, the evaluation slowdown is insignificant compared to the gains in the asymptotic complexity of model building.
展开▼
机译:本文介绍并分析了偶发模型构建,该模型可用于提高分层贝叶斯优化算法(hBOA)和其他使用复杂多元概率模型的分布算法(EDA)的其他高级估计的效率。通过零星模型构建,概率模型的结构每隔几个迭代(生成)更新一次,而在其余迭代中,仅更新模型参数(条件概率和边际概率)。由于更新模型参数的时间复杂度比学习模型结构的时间复杂度低得多,因此,零星的模型构建会降低模型构建的总体时间复杂度。本文表明,对于极为困难的几乎可分解的和分层的优化问题,零星的模型构建会导致显着的模型构建加速,从而将hBOA中模型构建的渐近时间复杂度降低Θ(< I> n 0.26 )到Θ( n 0.5 ),其中 n 是问题大小。另一方面,零星的模型构建也增加了评估的数量,直到收敛为止。尽管如此,与模型建立的渐进复杂性相比,评估速度微不足道。
展开▼
