数学
一般化
奇点理论
统计学习理论
边际似然
信息几何学
背景(考古学)
统计理论
似然函数
人工智能
应用数学
计算机科学
算法
贝叶斯概率
奇点
估计理论
几何学
数学分析
统计
支持向量机
生物
古生物学
标量曲率
曲率
出处
期刊:Cambridge University Press eBooks
[Cambridge University Press]
日期:2009-08-13
被引量:332
标识
DOI:10.1017/cbo9780511800474
摘要
Sure to be influential, this book lays the foundations for the use of algebraic geometry in statistical learning theory. Many widely used statistical models and learning machines applied to information science have a parameter space that is singular: mixture models, neural networks, HMMs, Bayesian networks, and stochastic context-free grammars are major examples. Algebraic geometry and singularity theory provide the necessary tools for studying such non-smooth models. Four main formulas are established: 1. the log likelihood function can be given a common standard form using resolution of singularities, even applied to more complex models; 2. the asymptotic behaviour of the marginal likelihood or 'the evidence' is derived based on zeta function theory; 3. new methods are derived to estimate the generalization errors in Bayes and Gibbs estimations from training errors; 4. the generalization errors of maximum likelihood and a posteriori methods are clarified by empirical process theory on algebraic varieties.
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