A computational approach to statistical learning / Taylor Arnold, Michael Kane and Bryan W. Lewis

Includes bibliographical references and index.

Introduction
Linear models
Ridge regression and principal component analysis
Linear smoothers
Generalized linear models
Additive models
Penalized regression models
Neural networks
Dimensionality reduction
Computation in practice
Linear algebra and matrices
Floating point arithmetic and numerical computation

A Computational Approach to Statistical Learning gives a novel introduction to predictive modeling by focusing on the algorithmic and numeric motivations behind popular statistical methods. The text contains annotated code to over 80 original reference functions. These functions provide minimal working implementations of common statistical learning algorithms. Every chapter concludes with a fully worked out application that illustrates predictive modeling tasks using a real-world dataset. The text begins with a detailed analysis of linear models and ordinary least squares. Subsequent chapters explore extensions such as ridge regression, generalized linear models, and additive models. The second half focuses on the use of general-purpose algorithms for convex optimization and their application to tasks in statistical learning. Models covered include the elastic net, dense neural networks, convolutional neural networks (CNNs), and spectral clustering. A unifying theme throughout the text is the use of optimization theory in the description of predictive models, with a particular focus on the singular value decomposition (SVD). Through this theme, the computational approach motivates and clarifies the relationships between various predictive models. -- Provided by publisher