基于剪枝算法的系统发生似然的Hessian计算及其应用。

Pub Date : 2012-09-25 DOI:10.1515/1544-6115.1779
Toby Kenney, Hong Gu
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引用次数: 18

摘要

在系统发育的最大似然方法中,我们解析地推导了似然的一阶和二阶导数。这些结果使牛顿-拉夫森方法能够用于最大化似然,这很重要,因为需要更快的方法来优化最大似然方法中的参数。此外,Hessian矩阵的计算也为标准似然理论的应用开辟了可能性,用于系统发育的推理和模型选择问题。黑森矩阵的另一个应用是局部影响分析,它可用于检测一些生物学上有趣的现象。修剪算法已被用于加速树的可能性计算。我们解释了如何使用它来加快关于分支长度和其他参数的一阶和二阶似然导数的计算。本文的结果不仅适用于分岔树,而且适用于一般的分岔树。我们将演示在上面列出的三个应用程序中使用我们的Hessian计算,并与这些应用程序的现有方法进行比较。
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Hessian calculation for phylogenetic likelihood based on the pruning algorithm and its applications.

We analytically derive the first and second derivatives of the likelihood in maximum likelihood methods for phylogeny. These results enable the Newton-Raphson method to be used for maximising likelihood, which is important because there is a need for faster methods for optimisation of parameters in maximum likelihood methods. Furthermore, the calculation of the Hessian matrix also opens up possibilities for standard likelihood theory to be applied, for inference in phylogeny and for model selection problems. Another application of the Hessian matrix is local influence analysis, which can be used for detecting a number of biologically interesting phenomena. The pruning algorithm has been used to speed up computation of likelihoods for a tree. We explain how it can be used to speed up the computation for the first and second derivatives of the likelihood with respect to branch lengths and other parameters. The results in this paper apply not only to bifurcating trees, but also to general multifurcating trees. We demonstrate the use of our Hessian calculation for the three applications listed above, and compare with existing methods for those applications.

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