2 881 703 libros electrónicos en 110 idiomas
¿No le conviene? No hay problema. Puedes devolver los artículos hasta 30 días
No se equivocará con un vale de regalo. El destinatario puede elegir cualquier producto de nuestra oferta.
Hasta 30 días para devoluciones
This book provides a coherent framework for understanding shrinkage estimation in statistics. The term refers to creating a new, more centralized estimate by shrinking an original raw estimate towards a truer mean. This results in more stable estimates for population parameters, reduced sampling and non-sampling errors, and smoothed spatial fluctuations. The book focuses primarily on point and loss estimation for the mean vector for multivariate normal and spherically symmetric distributions. Chapter 1 introduces the statistical and decision theoretic terminology and results that will be used throughout the book. Chapter 2 is concerned with estimating the p-dimensional mean vector of a multivariate normal distribution under quadratic loss from a frequentist perspective. In Chapter 3 the authors take a Bayesian view of shrinkage estimation. Chapter 4 introduces the general class of spherically symmetric distributions. Point estimation for this broad class is studied in subsequent chapters. In particular, Chapter 5 extends many of the results from Chapters 2 and 3 to spherically symmetric distributions. Chapter 6 considers the general linear model with spherically symmetric error distributions when a residual vector is available. Chapter 7 then considers the problem of estimating a location vector which is constrained to lie in a convex subset of Rp. Much of the chapter is devoted to one of two types of constraint sets, balls and polyhedral cones. In Chapter 8 the authors switch gears away from location parameter estimation and focus on loss estimation and data-dependent evidence reports. Appendices then cover Weakly Differentiable Functions; Examples of Weakly Differentiable Functions; Vanishing Of the Bracketed Term in Stein's Identity; Examples of Settings Where Stein's Identity Does Not Hold; Stein's Lemma and Stokes' Theorem for Smooth Boundaries; An Expression Of the Haff Operator; Harmonic, Superharmonic and Subharmonic Functions; Differentiation of Marginal Densities; Results on Expectation and Integrals; and Modified Bessel Functions.
¡Hola! Soy Libroamiko, tu asesor de libros.
¿Cómo puedo ayudarte?