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Analysis I
This two-volume introduction to real analysis is intended for honours undergraduates, who have already been exposed to calculus. The emphasis is on rigour and on foundations. The course material is deeply intertwined with the exercises, as it is intended for the student to actively learn the material and to practice thinking and writing rigorously.
420 pages, Paperback
First published January 1, 2006
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About the author
Terence Tao
48 books219 followersTerence "Terry" Tao FAA FRS (simplified Chinese: 陶哲轩; traditional Chinese: 陶哲軒; pinyin: Táo Zhéxuān) is an Australian-American mathematician who has worked in various areas of mathematics. He currently focuses on harmonic analysis, partial differential equations, algebraic combinatorics, arithmetic combinatorics, geometric combinatorics, compressed sensing and analytic number theory. As of 2015, he holds the James and Carol Collins chair in mathematics at the University of California, Los Angeles. Tao was a co-recipient of the 2006 Fields Medal and the 2014 Breakthrough Prize in Mathematics.
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Displaying 1 - 15 of 15 reviews
April 26, 2020
Tao has taken a very literal approach to teaching by first principles.
It is typical for Analysis books to begin by constructing the Reals. Not for Tao though, he takes a unique approach. He starts at nothing. This is very much a Definition-Therom-Lemma-Proof book, but a large part of that is because he refuses to use anything that he first hasn't constructed from the ground up! After starting at the Peano Axioms to create the Natural numbers Tao moves on to construct what is ZFC set theory then to the integers and finally rationals. But before he constructs the reals he has to first construct the notion of a sequence and a limit.
This is not a reference book. You begin from the start and work your way through page by page. A phenomenal introduction to the subject.
It is typical for Analysis books to begin by constructing the Reals. Not for Tao though, he takes a unique approach. He starts at nothing. This is very much a Definition-Therom-Lemma-Proof book, but a large part of that is because he refuses to use anything that he first hasn't constructed from the ground up! After starting at the Peano Axioms to create the Natural numbers Tao moves on to construct what is ZFC set theory then to the integers and finally rationals. But before he constructs the reals he has to first construct the notion of a sequence and a limit.
This is not a reference book. You begin from the start and work your way through page by page. A phenomenal introduction to the subject.
May 22, 2020
Grueling. The amount of work required of the reader per page is daunting. You could easily spend an average of 2 days per page on this book.
Once you get accustomed to the pace, it's great. You can't really get lost as it really does start at the beginning and lays out each step meticulously.
Specific issues
1. Despite this being the 3rd edition, there are still a handful of minor errors.
2. Lack of solutions to questions. Solutions are key for self-study in my opinion. There are many answers scattered around the internet, but it is a pain to find them when I was checking my work or stuck on something.
Maybe I'm wrong to give only 4/5, but when I look over at the book on the shelf, it's not really an affectionate feeling I have. More like how you might look at a spin class instructor of a particularly punishing class. I feel like that's not really the optimal vibe for a book.
Once you get accustomed to the pace, it's great. You can't really get lost as it really does start at the beginning and lays out each step meticulously.
Specific issues
1. Despite this being the 3rd edition, there are still a handful of minor errors.
2. Lack of solutions to questions. Solutions are key for self-study in my opinion. There are many answers scattered around the internet, but it is a pain to find them when I was checking my work or stuck on something.
Maybe I'm wrong to give only 4/5, but when I look over at the book on the shelf, it's not really an affectionate feeling I have. More like how you might look at a spin class instructor of a particularly punishing class. I feel like that's not really the optimal vibe for a book.
July 23, 2017
I did not read through the whole book, I must confess, since I picked it up for the purpose of finding interesting homework problems for my students. I believes it gives a good general impression of things, but it would not be my main choice for learning real analysis.
May 2, 2021
I have a mixed feeling about this book. This is a very rigorous treatment to the mathematical analysts. Unfortunately, most chapters consist of the definitions and theorems without any proofs. I’m guessing It would be absolutely amazing resource for a lecturer or an instructor of the subject, or as a course material when you have a chance to review your homework in the class. But for the self study, you would need to refer to other books.
So if you are new to the math analysis, there are much better books like Abbotts’ Understanding Analysis or Baby Rudin to name a few.
So if you are new to the math analysis, there are much better books like Abbotts’ Understanding Analysis or Baby Rudin to name a few.
April 4, 2021
In a year to fully read the book. Really clear and detailed content written in the book. Expecting to finish the II book, but maybe need a while to absolutely digest the theorems and text in the I one.
June 7, 2024
The best book that exists to change the perception of a newbie and introduce pure mathematics through the eyes of one of the best mathematicians of our time, Terence Tao. This book wasn't easy to go through, real anaylsis isn't in the beginning, but it was so much different than other introductory anaylsis books and so much better!
May 12, 2021
this book is perfect for you if you want a taste of the meticulous mathematical rigor. the author's remarks are very helpful. many important propositions are left as exercises ( but they are not so hard to be proved as there are also quite a lot of hints).
June 20, 2022
this has to be one of the best books I've ever read for mathematics. not only are the problems absolutely amazing, the writing as a whole is absolutely beautiful. more math books should focus on readability! overall Terence tao's analysis 1 was a very wonderful read.
June 4, 2020
Terry is too smart for the rest of us but to be honest I did find this book helpful on multiple occasions during infi 1 and 2.
Not enough detail, please elaborate more.
Not enough detail, please elaborate more.
January 9, 2021
Eye-opening, but also - not gonna lie - too wild in some places. Last chapter (or two) were too fast. Probably the second volume will clear things up.
May 22, 2025
Ağabey cevapları vereydin ben malım illa kıyaslamam lazım
May 29, 2025
odd to say perhaps, but this is a life changing book
June 29, 2024
Terrence Tao has published an incredibly comprehensive textbook that serves as a wonderful introduction to the subject for interested outsiders and undergrad students in mathematics. The work demonstrates Mr. Taos unique ability to combine his other worldly mathematical skill set with writing that is crisp and engaging. Motivating the study of analysis via the construction of the number systems vis vi peano arithmetic, provides the reader with a road map for properly conducting mathematical reasoning in highly abstract and proof based settings. Thereafter, Mr. Tao provides excellent treatment of sequences, series, and continuity. We are then introduced to the world of derivatives and integrals. Along the way Mr. Tao deals in quotes, anecdotes, and mathematical history with prose that you rarely find in mathematics textbooks of this calibre. This book was my introduction to the world of pure mathematics and it served me wonderfully. Mr. Tao truly is not just a mathematical genius, but a fully rounded savant. It wasn’t mathematics that found Tao, but rather that Tao found mathematics.
November 10, 2020
Tao's ability to explain concepts is unparalleled in the realm of undergraduate-level analysis texts.
Displaying 1 - 15 of 15 reviews