Electronic Transactions on Numerical Analysis
its book of mathematics on numerical analysis.
Mathematical Analysis I
This text covers the basic topics of undergraduate real analysis including metric spaces, open and closed sets, convergent sequences, function limits and continuity, compact sets, sequences and series of functions, power series, differentiation and integration, Taylor's theorem, total variation, rectifiable arcs, and sufficient conditions of integrability. Well over 500 exercises (many with extensive hints) assist students through the material. The text also contains background material on set theory, the real numbers (including consequences of the completeness axiom), and Euclidean and vector spaces,taken from the author's Basic Concepts of Mathematics.
This text is designed to be used as early as possible in the undergraduate curriculum; indeed, it was used for many years as the text for a two-semester class for second-year mathematics majors at the University of Windsor. If desired, the material can easily be specialized to n-dimensional (or even two-dimensional) Euclidean space.
: Mathematical Foundations of Computer Science
: Mathematical Foundations of Computer Science
The Limits of Mathematics
This book is the final version of a course on algorithmic information theory and the epistemology of mathematics and physics. It discusses Einstein and Goedel's views on the nature of mathematics in the light of information theory, and sustains the thesis that mathematics is quasi-empirical. There is a foreword by Cris Calude of the University of Auckland, and supplementary material is available at the author's web site. The special feature of this book is that it presents a new 'hands on' didatic approach using LISP and Mathematica software. The reader will be able to derive an understanding of the close relationship between mathematics and physics. 'The Limits of Mathematics is a very personal and idiosyncratic account of Greg Chaitin's entire career in developing algorithmic information theory.
Fundamentals of probability
This is a textbook on probability theory. It explains difficult topics such as Lebesgue integration in an intuitive manner.
Calculus Instructors Manual Chapter 16
Author : Gilbert Strang Type : pdf
Calculus Instructors Manual Chapter 2
Author : Gilbert Strang Type : pdf
An Introduction To Statistical Inference And Data
Author : Michael W. Trosset Type : pdf
An Introduction To Statistical Signal Processing
Author : Michael W. Trosset Language : English Copyrights : United States
Analyst
Author : George Berkeley Type : pdf
The Unknowable (Discrete Mathematics and Theoretical Computer Science) - Free eBook The Unknowable (Discrete Mathematics and Theoretical Computer Science) - Download ebook The Unknowable (Discrete Mathematics and Theoretical Computer Science) free
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