Master your Minecraft
 
 

Special Offers see all

Enter to WIN a $100 Credit

Subscribe to PowellsBooks.news
for a chance to win.
Privacy Policy

Tour our stores


    Recently Viewed clear list


    Original Essays | November 7, 2014

    Karelia Stetz-Waters: IMG The Hot Sex Tip Cosmo Won't Tell You



    Cosmopolitan Magazine recently released an article titled "28 Mind-Blowing Lesbian Sex Positions." Where was this vital information when I was a... Continue »

    spacer
Qualifying orders ship free.
$329.50
New Hardcover
Ships in 1 to 3 days
Add to Wishlist
available for shipping or prepaid pickup only
Available for In-store Pickup
in 7 to 12 days
Qty Store Section
25 Remote Warehouse Health and Medicine- General

Limit Theorems for Random Fields with Singular Spectrum

by

Limit Theorems for Random Fields with Singular Spectrum Cover

 

Synopses & Reviews

Publisher Comments:

This book presents limit theorems for nonlinear functionals of random fields with singular spectrum on the basis of various asymptotic expansions. The first chapter treats basic concepts of the spectral theory of random fields, some important examples of random processes and fields with singular spectrum, and Tauberian and Abelian theorems for covariance function of long-memory random fields. Chapter 2 is devoted to limit theorems for spherical averages of nonlinear transformations of Gaussian and chi-square random fields. Chapter 3 summarises some limit theorems for geometric type functionals of random fields. Limit theorems for the solutions of Burgers' equation with random data via parabolic and hyperbolic rescaling are demonstrated in Chapter 4. Lastly, Chapter 5 deals with some problems for statistical analysis of random fields with singular spectrum. Audience: This book will be of interest to mathematicians who use random fields in engineering or other applications.

Description:

Includes bibliographical references (p. 357-393) and index.

Table of Contents

1. Second-Order Analysis of Random Fields. 2. Limit Theorems for Non-Linear Transformations of Random Fields. 3. Asymptotic Distributions of Geometric Functionals of Random Fields. 4. Limit Theorems for Solutions of the Burgers' Equation with Random Data. 5. Statistical Problems for Random Fields with Singular Spectrum. Comments. Bibliography. Index.

Product Details

ISBN:
9780792356356
Author:
Leonenko, Nikolai N.
Author:
Leonenko, N. N.
Author:
Leonenko, Nicolai
Author:
Leonenko, M.
Publisher:
Springer
Location:
Dordrecht ;
Subject:
General
Subject:
Spectral theory (Mathematics)
Subject:
Random fields
Subject:
Spectral theory
Subject:
Limit theorems
Subject:
Probability & Statistics - General
Subject:
Statistics
Subject:
Probability Theory and Stochastic Processes
Subject:
Statistics/General
Subject:
Fluid- and Aerodynamics
Subject:
APPLICATIONS OF MATHEMATICS
Subject:
Health and Medicine-General
Copyright:
Edition Description:
Book
Series:
Mathematics and Its Applications (closed)
Series Volume:
v. 465
Publication Date:
19990228
Binding:
HARDCOVER
Language:
English
Pages:
14
Dimensions:
240 x 160 mm 798 gr

Related Subjects

Health and Self-Help » Health and Medicine » General
Health and Self-Help » Health and Medicine » General Medicine
Health and Self-Help » Psychology » General
Science and Mathematics » Mathematics » Analysis General
Science and Mathematics » Mathematics » Applied
Science and Mathematics » Mathematics » Probability and Statistics » General
Science and Mathematics » Mathematics » Probability and Statistics » Statistics
Science and Mathematics » Mathematics » Reference
Travel » General

Limit Theorems for Random Fields with Singular Spectrum New Hardcover
0 stars - 0 reviews
$329.50 In Stock
Product details 14 pages Kluwer Academic Publishers - English 9780792356356 Reviews:
spacer
spacer
  • back to top

FOLLOW US ON...

     
Powell's City of Books is an independent bookstore in Portland, Oregon, that fills a whole city block with more than a million new, used, and out of print books. Shop those shelves — plus literally millions more books, DVDs, and gifts — here at Powells.com.