[ Download ] ➶ An Introduction to Differentiable Manifolds and Riemannian Geometry, Revised: Volume 120 (Pure and Applied Mathematics) Author William M Boothby – Tactical-player.co.uk

The Second Edition Of This Text Has Sold Over , Copies Since Publication In And This Revision Will Make It Even Useful This Is The Only Book Available That Is Approachable By Beginners In This Subject It Has Become An Essential Introduction To The Subject For Mathematics Students, Engineers, Physicists, And Economists Who Need To Learn How To Apply These Vital Methods It Is Also The Only Book That Thoroughly Reviews Certain Areas Of Advanced Calculus That Are Necessary To Understand The Subject An Introduction to Differentiable Manifolds and Riemannian Geometry, Revised: Volume 120 (Pure and Applied Mathematics)


About the Author: William M Boothby

Is a well-known author, some of his books are a fascination for readers like in the An Introduction to Differentiable Manifolds and Riemannian Geometry, Revised: Volume 120 (Pure and Applied Mathematics) book, this is one of the most wanted William M Boothby author readers around the world.



5 thoughts on “An Introduction to Differentiable Manifolds and Riemannian Geometry, Revised: Volume 120 (Pure and Applied Mathematics)

  1. says:

    Boothby s book is now a classic It serves best for an absolutely reliable reference book of an undergraduate course in Differential Geometry of manifolds For a graduate course, it is rather insufficient newer books can play this role much better but still, one has to have Boothby next to them.The older edition had numerous typos this has been corrected substantially.


  2. says:

    so so


  3. says:

    This book is a standard reference on the subject of differential manifolds and Riemannian geometry in many somewhat applied fields, such as mine control theory Having used it as a reference for many years, I finally decided to read it cover to cover I m not done yet but went through than half The process of reading the book in a continuous fashion, while certainly rewarding, has also led to significant disappointment I often find flaws in the pace at which the book proceeds, in the sense


  4. says:

    When I was a doctoral student, I studied geometry and topology At the time, I learnt about differentiable manifolds and Riemannian geometry not as a knowledge necessity, but as a background My specialty was group theory.Groups and spaces are intimately related In the sense, studying group theory means studying geometry an area in mathematics studying properties of spaces Another related area to group theory is knot theory Although knot theory is not my specialty, I have been interested in kno


  5. says:

    This book is masterfully written and excels for its clearness and elementary conception of every detail It starts reviewing the necessary tools of analysis inverse and implicit function theorems, constant rank theorem, existence and unicity of ordinary differential equations Then, it dedicates much attention to motivate and construct the concept of a manifold M and the definition of the tangent space at a point of M this is much harder to do for an abstract manifold than for a submanifold of the


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