Work of the giants

Hello mathematician!

I am working my way through a curious monologue: Groups acting on Graphs (by Dicks & Dunwoody). Dunwoody is one of the giants of Group Theory and low dimensional topology. His style of writing is reminiscent of Serre (another stalwart in this field). Dunwoody's algebra is clean, notations and definitions are exhaustive and examples are abundant.

Dunwoody reminds me of classical texts in Euclidean geometry where one would painstakingly make ner way through axioms, definitions, and theorems in a sequential manner. This trend of writing mathematics was rekindled by Bourbaki in the last century.

There is another trend of 'writing' mathematics. This can be loosely described as the 'populist' method. Its roots can be traced back to French mathematician Alexis Claude Clairaut. His book on geometry (Elements de Geometrie, 1741) was a clear departure from medieval geometry texts. The rule of the day was to mention all axioms, definitions, and theorems in a deductive continuity.

Clairaut did not care about this 'rigor'. He would quickly enter realms of 'reality' after loosely describing the initial ideas. For example, he would quickly move to the descriptions of Canal engineering, from the definition of parallel lines.

Some historiographers of mathematics are of the opinion that this departure from rigor actually led to the discovery of non-euclidean geometry. If this is true, then it would earmark one of the most astounding connections between reality and abstraction.

This style of writing was later adopted by other giants of mathematics. Two of the absolute masterpieces of this genre are:

Three-dimensional geometry and topology by Thurston
Geometry and Imagination by Hilbert

Both of these works quickly move from 'initial ideas' to 'applications' and 'examples'. However, these applications and examples are more mathematical in nature (compared to canal engineering). Both authors are not worried about 'taking care of all initial ideas' before they embark upon the exciting mathematical expedition. They freely use 'rigorously unexplained' words and concepts.

This is in stark contrast to what Dunwoody does in his work.

Some authors have taken a 'middle path'. Recently Dr. Chakraborty's Real Analysis (in Bengali) is an example to the point. It has a more conversational and expositional temper though he is careful enough to maintain 'completeness'. Hatcher's Algebraic Topology does something similar. Excursion into Mathematics (Beck, Crowe, and Bleicher) is yet another example from pre-college mathematics.

Personally, I am unsure about my preference. Though the informal tone of Hilbert and Thurston is more inviting in the beginning, one quickly seeks more rigor to reaffirm one's own theoretical understanding of the subject. One should probably work hard on a rigorously presented idea and keep an informal masterpiece as an interlude in ner journey.

This week we hope to see you in classes. We have some beautiful formal and informal adventures in mathematics waiting for you.

Cheenta Weekly Schedule - December 10 to 16, 2018

All the best!

Ashani Dasgupta
Cheenta Team

Passion for mathematics.

ISI - CMI entrance Book List

If you are starting with the course, then you may buy the books in the Miscellaneous Section only. Later, your faculty will prescribe other books in class.

A word about Solution Manuals:

No one learned Mathematics by reading solutions. Instead, try sequential hints. Cheenta website has many such discussion on problems from past papers of I.S.I. & C.M.I. We are also in the process of transforming existing solutions into sequential hints:

Problem Center

Books

Here is a PDF copy of the book - list: ISI - CMI entrance booklist

Miscellaneous

Challenges and Thrills of Pre-College Mathematics by Venkatchala
Mathematical Circles, a Russian experience by Fomin
Excursion in Mathematics by Bhaskaracharya Pratishthana
Test of Mathematics at 10+2 Level by East West Press

Also see

I.S.I. and C.M.I. Entrance Program (live, online) at Cheenta

Number Theory

Excursion in Mathematics; Challenges and Thrills of Pre-College Mathematics
Elementary Number Theory by David Burton

Combinatorics

Principles and Techniques in Combinatorics by Chen Chuan Chong and Koh Khee Meng

Algebra

Excursion in Mathematics;
Challenges and Thrills of Pre-College Mathematics

Geometry

Challenges and Thrills of Pre-College Mathematics

Trigonometry

Trigonometry by S.L. Loney
101 Problems in Trigonometry by Titu Andreescu

Inequality

Inequality by Little Mathematical Library

Complex Numbers

Complex Numbers from A to Z

Coordinate Geometry

Coordinate Geometry by S.L. Loney

Calculus

Pre-Calculus by Tarasov
Single Variable Calculus by I.A. Maron
Play with Graphs (Arihant Publication)

Video Series

Cheenta produces videos related to I.S.I. & C.M.I. Entrance at a regular interval.

Here is a playlist (consider subscribing to Cheenta in youtube to get updates):

A great Book List for Math Majors (College and University)

At the college (and university), on each topic, there are simply too many good books to choose from. It is easy to get overwhelmed.

Then there are the tests. For semester exams, there are simply no substitute for class notes. But what about the entrance tests like GRE Math Subject Test or TIFR, M.Math and IIT JAM? What books will be most efficient for the preparation for these tests?

There is also a conflict between beauty and efficiency. Our heart desires to read beautiful expositions, but our mind seeks technical sophistication.

This book list can be regarded as the First Layer or Common Minimum Requirement. They provide both beautiful exposition and efficient problem solving skills. They are 'easier' than some of the cult classics.

It is important to completely solve atleast one book per topic before going into the harder ones. You do not need to solve hard books for all topics. It is mostly likely that you will doing research in a particular subtopic in future. Hence it is intelligent to choose a harder book in one subject of your liking in the second round while gaining moderate vocabulary and idea on broad set of subjects in the first layer.

With the above points in consideration, here goes the book list:

Linear Algebra

Chapter 0 of Serge Lang's Introduction Linear Algebra

and then

Introduction to Linear Algebra by Gilbert Strang

Abstract Algebra

Contemporary Abstract Algebra by Gallian

and

SAGE Math (computation software)

Real Analysis

Introduction to Real Analysis by Bartle Sherbet

Problems in Real Analysis by Kaczor

Topology

Topology of Metric Spaces by Kumaresan

Vector Calculus and Differential Equation

Calculus, Early Transcendentals by James Stewart

Math 18.02C course in MIT OCW (contains notes and problem sets)

(also for Vector Calculus, use notes from mathinsights.org and software like Geogebra)

Test of Mathematics in 10+2 Level (to keep high school topics familiar; especially skills in elementary number theory and high school calculus are inportant for Tests like GRE Math Subject Test and M.Math objective test)

Cult classics that we deliberately omitted from this list includes Rudin, Herstein, Artin, Hoffman Kunz, Munkres etc. We also omitted modern jewels like Christenson, Tao, Dummit Foote.

The bottom line is: make sure you completely work on at least one book per topic before hunting for another book on the same topic. No book will have everything that you seek.

Visit Also: College Mathematics Program