{ "item_title" : "Principal Component Analysis and Randomness Tests for Big Data Analysis", "item_author" : [" Mieko Tanaka "], "item_description" : "This book presents the novel approach of analyzing large-sized rectangular-shaped numerical data (so-called big data). The essence of this approach is to grasp the meaning of the data instantly, without getting into the details of individual data. Unlike conventional approaches of principal component analysis, randomness tests, and visualization methods, the authors' approach has the benefits of universality and simplicity of data analysis, regardless of data types, structures, or specific field of science.First, mathematical preparation is described. The RMT-PCA and the RMT-test utilize the cross-correlation matrix of time series, C = XXT, where Xrepresents a rectangular matrix of N rows and L columns and XT represents the transverse matrix of X. Because C is symmetric, namely, C = CT, it can be converted to a diagonal matrix of eigenvalues by a similarity transformation-1 = SCST using an orthogonal matrix S. When N is significantly large, the histogram of the eigenvalue distribution can be compared to the theoretical formula derived in the context of the random matrix theory (RMT, in abbreviation).Then the RMT-PCA applied to high-frequency stock prices in Japanese and American markets is dealt with. This approach proves its effectiveness in extracting trendy business sectors of the financial market over the prescribed time scale. In this case, X consists of N stock- prices of lengthL, and the correlation matrix C is an N by N square matrix, whose element at the i-th row and j-th column is the inner product of the price time series of the length L of the i-th stock and the j-th stock of the equal length L.Next, the RMT-test is applied to measure randomness of various random number generators, including algorithmically generated random numbers and physically generated random numbers.The book concludes by demonstrating two application of the RMT-test: (1) a comparison of hash functions, and (2) stock prediction by means of randomness.", "item_img_path" : "https://covers4.booksamillion.com/covers/bam/4/43/155/904/4431559043_b.jpg", "price_data" : { "retail_price" : "139.00", "online_price" : "139.00", "our_price" : "139.00", "club_price" : "139.00", "savings_pct" : "0", "savings_amt" : "0.00", "club_savings_pct" : "0", "club_savings_amt" : "0.00", "discount_pct" : "10", "store_price" : "" } }

Principal Component Analysis and Randomness Tests for Big Data Analysis

by Mieko Tanaka

Ship to Me

On Order. Usually ships in 2-4 weeks

FREE Shipping for Club Members

In-Store Pickup

Overview

This book presents the novel approach of analyzing large-sized rectangular-shaped numerical data (so-called big data). The essence of this approach is to grasp the "meaning" of the data instantly, without getting into the details of individual data. Unlike conventional approaches of principal component analysis, randomness tests, and visualization methods, the authors' approach has the benefits of universality and simplicity of data analysis, regardless of data types, structures, or specific field of science.

First, mathematical preparation is described. The RMT-PCA and the RMT-test utilize the cross-correlation matrix of time series, C = XX^T, where Xrepresents a rectangular matrix of N rows and L columns and X^T represents the transverse matrix of X. Because C is symmetric, namely, C = C^T, it can be converted to a diagonal matrix of eigenvalues by a similarity transformation^-1 = SCS^T using an orthogonal matrix S. When N is significantly large, the histogram of the eigenvalue distribution can be compared to the theoretical formula derived in the context of the random matrix theory (RMT, in abbreviation).

Then the RMT-PCA applied to high-frequency stock prices in Japanese and American markets is dealt with. This approach proves its effectiveness in extracting "trendy" business sectors of the financial market over the prescribed time scale. In this case, X consists of N stock- prices of lengthL, and the correlation matrix C is an N by N square matrix, whose element at the i-th row and j-th column is the inner product of the price time series of the length L of the i-th stock and the j-th stock of the equal length L.

Next, the RMT-test is applied to measure randomness of various random number generators, including algorithmically generated random numbers and physically generated random numbers.

The book concludes by demonstrating two application of the RMT-test: (1) a comparison of hash functions, and (2) stock prediction by means of randomness.

This item is Non-Returnable

Customers Also Bought

Details

ISBN-13: 9784431559047
ISBN-10: 4431559043
Publisher: Springer
Publish Date: March 2022

Related Categories

Favorites

What We Recommend

Featured

Shop by Category

Fiction

Nonfiction

Shop By Format

More Information

Favorites

Featured

Shop By Author A-G

Shop by Author G-L

Shop By Author L-R

Shop by Author R-Z

Shop By Series A-G

Shop By Series H-M

Shop By Series N-Z

Customers Also Liked

More in Manga

Favorites

Favorite Characters

Kids Fiction

Nonfiction

Shop by Age

Top Authors

Educational Resources

More Categories

Favorites

Popular Authors

Bestselling Series A-K

Bestselling Series L-Z

Favorites

Music

Featured

Page to Screen

Tabletop Role-playing

Fandoms

LEGO

Bestsellers

Games & Puzzles

Favorites

Best Books of 2026

#BookTok

Best Gifts for Kids

Toys & Games

For Teens & Young Adults

Pop Culture & Fandoms

Pen to Paper Shop

Faith-Based Gifts

Bargains in Fiction

Bargains in Nonfiction

Bargains in Young Adult Books

Bargains in Kids Fiction

Bargains in Kids Nonfiction

Bargains in Faith & Inspiration

Bargain Favorites

Principal Component Analysis and Randomness Tests for Big Data Analysis

Overview

Customers Also Bought

Details

You May Also Like...

BAM Customer Reviews