序列化信息瓶颈(Sequential information bottleneck,sIB)算法是一种广泛使用的聚类算法。该算法采用联合概率模型表示数据,对样本和属性的相关性有较好的表达能力。但是sIB算法采用的联合概率模型假设数据各个属性对聚类的贡献度相同,...序列化信息瓶颈(Sequential information bottleneck,sIB)算法是一种广泛使用的聚类算法。该算法采用联合概率模型表示数据,对样本和属性的相关性有较好的表达能力。但是sIB算法采用的联合概率模型假设数据各个属性对聚类的贡献度相同,从而削弱了聚类效果。本文提出了赋权联合概率模型概念,采用互信息度量属性重要度,并构建赋权联合概率模型来优化数据表示,从而达到突出代表性属性、抑制冗余属性的目的。UCI数据集上的实验表明,基于赋权联合概率模型的WJPM_sIB算法优于sIB算法,在F1评价下,WJPM_sIB算法聚类结果比sIB算法提高了5.90%。展开更多
A new hybrid optimization algorithm was presented by integrating the gravitational search algorithm (GSA) with the sequential quadratic programming (SQP), namely GSA-SQP, for solving global optimization problems a...A new hybrid optimization algorithm was presented by integrating the gravitational search algorithm (GSA) with the sequential quadratic programming (SQP), namely GSA-SQP, for solving global optimization problems and minimization of factor of safety in slope stability analysis. The new algorithm combines the global exploration ability of the GSA to converge rapidly to a near optimum solution. In addition, it uses the accurate local exploitation ability of the SQP to accelerate the search process and find an accurate solution. A set of five well-known benchmark optimization problems was used to validate the performance of the GSA-SQP as a global optimization algorithm and facilitate comparison with the classical GSA. In addition, the effectiveness of the proposed method for slope stability analysis was investigated using three ease studies of slope stability problems from the literature. The factor of safety of earth slopes was evaluated using the Morgenstern-Price method. The numerical experiments demonstrate that the hybrid algorithm converges faster to a significantly more accurate final solution for a variety of benchmark test functions and slope stability problems.展开更多
文摘序列化信息瓶颈(Sequential information bottleneck,sIB)算法是一种广泛使用的聚类算法。该算法采用联合概率模型表示数据,对样本和属性的相关性有较好的表达能力。但是sIB算法采用的联合概率模型假设数据各个属性对聚类的贡献度相同,从而削弱了聚类效果。本文提出了赋权联合概率模型概念,采用互信息度量属性重要度,并构建赋权联合概率模型来优化数据表示,从而达到突出代表性属性、抑制冗余属性的目的。UCI数据集上的实验表明,基于赋权联合概率模型的WJPM_sIB算法优于sIB算法,在F1评价下,WJPM_sIB算法聚类结果比sIB算法提高了5.90%。
文摘A new hybrid optimization algorithm was presented by integrating the gravitational search algorithm (GSA) with the sequential quadratic programming (SQP), namely GSA-SQP, for solving global optimization problems and minimization of factor of safety in slope stability analysis. The new algorithm combines the global exploration ability of the GSA to converge rapidly to a near optimum solution. In addition, it uses the accurate local exploitation ability of the SQP to accelerate the search process and find an accurate solution. A set of five well-known benchmark optimization problems was used to validate the performance of the GSA-SQP as a global optimization algorithm and facilitate comparison with the classical GSA. In addition, the effectiveness of the proposed method for slope stability analysis was investigated using three ease studies of slope stability problems from the literature. The factor of safety of earth slopes was evaluated using the Morgenstern-Price method. The numerical experiments demonstrate that the hybrid algorithm converges faster to a significantly more accurate final solution for a variety of benchmark test functions and slope stability problems.
