Mathematical Foundations of Data Science (Texts in Computer Science) 1st ed. 2023 Edition
by Tomas Hrycej (Author), Bernhard Bermeitinger (Author), Matthias Cetto (Author), Siegfried Handschuh (Author)
Publisher Finelybook 出版社：Springer; 1st ed. 2023 edition (March 14, 2023)
pages 页数：226 pages
This textbook aims to point out the most important principles of data analysis from the mathematical point of view. Specifically, it selected these questions for exploring: Which are the principles necessary to understand the implications of an application, and which are necessary to understand the conditions for the success of methods used? Theory is presented only to the degree necessary to apply it properly, striving for the balance between excessive complexity and oversimplification. Its primary focus is on principles crucial for application success.
Topics and features:
Focuses on approaches supported by mathematical arguments, rather than sole computing experiences
Investigates conditions under which numerical algorithms used in data science operate, and what performance can be expected from them
Considers key data science problems: problem formulation including optimality measure; learning and generalization in relationships to training set size and number of free parameters; and convergence of numerical algorithms
Examines original mathematical disciplines (statistics, numerical mathematics, system theory) as they are specifically relevant to a given problem
Addresses the trade-off between model size and volume of data available for its identification and its consequences for model parametrization
Investigates the mathematical principles involves with natural language processing and computer vision
Keeps subject coverage intentionally compact, focusing on key issues of each topic to encourage full comprehension of the entire book
Although this core textbook aims directly at students of computer science and/or data science, it will be of real appeal, too, to researchers in the field who want to gain a proper understanding of the mathematical foundations “beyond” the sole computing experience.