Mathematical Methods in Data Science
- Length: 258 pages
- Edition: 1
- Language: English
- Publisher: Elsevier
- Publication Date: 2023-02-03
- ISBN-10: 0443186790
- ISBN-13: 9780443186790
- Sales Rank: #0 (See Top 100 Books)
Mathematical Methods in Data Science introduces a new approach based on network analysis to integrate big data into the framework of ordinary and partial differential equations for data analysis and prediction. The mathematics is accompanied with examples and problems arising in data science to demonstrate advanced mathematics, in particular, data-driven differential equations used. Chapters also cover network analysis, ordinary and partial differential equations based on recent published and unpublished results. Finally, the book introduces a new approach based on network analysis to integrate big data into the framework of ordinary and partial differential equations for data analysis and prediction.
There are a number of books on mathematical methods in data science. Currently, all these related books primarily focus on linear algebra, optimization and statistical methods. However, network analysis, ordinary and partial differential equation models play an increasingly important role in data science. With the availability of unprecedented amount of clinical, epidemiological and social COVID-19 data, data-driven differential equation models have become more useful for infection prediction and analysis.
Combines a broad spectrum of mathematics, including linear algebra, optimization, network analysis and ordinary and partial differential equations for data science Written by two researchers who are actively applying mathematical and statistical methods as well as ODE and PDE for data analysis and prediction Highly interdisciplinary, with content spanning mathematics, data science, social media analysis, network science, financial markets, and more Presents a wide spectrum of topics in a logical order, including probability, linear algebra, calculus and optimization, networks, ordinary differential and partial differential equations
Cover image Title page Table of Contents Copyright Preface Acknowledgments Chapter 1: Linear algebra Abstract 1.1. Introduction 1.2. Elements of linear algebra 1.3. Linear regression 1.4. Principal component analysis Bibliography Chapter 2: Probability Abstract 2.1. Introduction 2.2. Probability distribution 2.3. Independent variables and random samples 2.4. Maximum likelihood estimation Bibliography Chapter 3: Calculus and optimization Abstract 3.1. Introduction 3.2. Continuity and differentiation 3.3. Unconstrained optimization 3.4. Logistic regression 3.5. K-means 3.6. Support vector machine 3.7. Neural networks Bibliography Chapter 4: Network analysis Abstract 4.1. Introduction 4.2. Graph modeling 4.3. Spectral graph bipartitioning 4.4. Network embedding 4.5. Network based influenza prediction Bibliography Chapter 5: Ordinary differential equations Abstract 5.1. Introduction 5.2. Basic differential equation models 5.3. Prediction of daily PM2.5 concentration 5.4. Analysis of COVID-19 5.5. Analysis of COVID-19 in Arizona Bibliography Chapter 6: Partial differential equations Abstract 6.1. Introduction 6.2. Formulation of partial differential equation models 6.3. Bitcoin price prediction 6.4. Prediction of PM2.5 in China 6.5. Prediction of COVID-19 in Arizona 6.6. Compliance with COVID-19 mitigation policies in the US Bibliography Bibliography Bibliography Index
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