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Author:   Michio Kuga ,  Susan Addington ,  Motohico Mulase
Publisher:   Birkhauser Boston Inc
Imprint:   Birkhauser Boston Inc
Edition:   1st ed. 1993. Corr. 2nd printing 1994
Dimensions:   Width: 17.80cm , Height: 0.80cm , Length: 25.40cm
Weight:   0.553kg
ISBN:  

9780817636883

ISBN 10:   0817636889
Pages:   150
Publication Date:   05 February 1993
Audience:   College/higher education ,  Professional and scholarly ,  Undergraduate ,  Postgraduate, Research & Scholarly
Format:   Hardback
Publisher's Status:   Active
Availability:   Awaiting stock  
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Table of Contents

Pre-Mathematics.- 0th Week No prerequisites.- 1st Week Sets and Maps.- 2nd Week Equivalence Classes.- 3rd Week The Story of Free Groups.- Heave Ho! (Pull it Tight).- 4th Week Fundamental Groups of Surfaces.- 5th Week Fundamental Groups.- 6th Week Examples of Fundamental Groups.- 7th Week Examples of Fundamental Groups, continued.- Men Who Don’t Realize That Their Wives Have Been Interchanged.- 8th Week Coverings.- 9th Week Covering Surfaces and Fundamental Groups.- 10th Week Covering Surfaces and Fundamental Groups, continued.- 11th Week The Group of Covering Transformations.- Everyone Has a Tail.- 12th Week The Universal Covering Space.- 13th Week The Correspondence Between Coverings of (D; O) and Subgroups of ?1 (D; O).- Seeing Galois Theory.- 14th Week Continuous Functions on Covering Surfaces.- 15th Week Function Theory on Covering Surfaces.- Solvable or Not?.- 16th Week Differential Equations.- 17th Week Elementary Methods of Solving Differential Equations.- 18th Week Regular Singularities.- 19th Week Differential Equations of Fuchsian Type.- References.- Notation.

Reviews

Galois' theory of equations remains the standard culmination of advanced undergraduate algebra courses...and Kuga makes this the basis for an idiosyncratic geometric exposition of Galois theory... There is nothing like this book in the literature. Highly recommended. <p>a CHOICE

"""Galois' theory of equations remains the standard culmination of advanced undergraduate algebra courses...and Kuga makes this the basis for an idiosyncratic geometric exposition of Galois theory... There is nothing like this book in the literature. Highly recommended."" --CHOICE"

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