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Galois' dream : group theory and differential equations

Galois' dream : group theory and differential equations (Loan 15 times)

Material type
단행본
Personal Author
Kuga, Michio, 1928-1990.
Title Statement
Galois' dream : group theory and differential equations / Michio Kuga ; Susan Addington, Motohico Mulase, translators.
Publication, Distribution, etc
Boston :   Birkhauser,   c1993.  
Physical Medium
ix, 150 p. : ill. ; 26 cm.
ISBN
0817636889 (alk. paper) 3764336889 (alk. paper)
Bibliography, Etc. Note
Includes bibliographical references (p. 141) and index.
Subject Added Entry-Topical Term
Galois theory. Differential equations. Monodromy groups.
000 00921camuuu200289 a 4500
001 000000531609
005 19980703113645.0
008 921104s1993 maua b 001 0 eng
010 ▼a 92041486
020 ▼a 0817636889 (alk. paper)
020 ▼a 3764336889 (alk. paper)
040 ▼a DLC ▼c DLC
041 1 ▼a eng ▼h jpn
049 1 ▼l 121002749 ▼f 과학
050 0 0 ▼a QA174.2 ▼b .K8413 1993
082 0 0 ▼a 512/.3 ▼2 20
090 ▼a 512.3 ▼b K95g
100 1 ▼a Kuga, Michio, ▼d 1928-1990.
240 1 0 ▼a Garoa no yume. ▼l English
245 1 0 ▼a Galois' dream : ▼b group theory and differential equations / ▼c Michio Kuga ; Susan Addington, Motohico Mulase, translators.
260 ▼a Boston : ▼b Birkhauser, ▼c c1993.
300 ▼a ix, 150 p. : ▼b ill. ; ▼c 26 cm.
504 ▼a Includes bibliographical references (p. 141) and index.
650 0 ▼a Galois theory.
650 0 ▼a Differential equations.
650 0 ▼a Monodromy groups.

Holdings Information

No. Location Call Number Accession No. Availability Due Date Make a Reservation Service
No. 1 Location Science & Engineering Library/Sci-Info(Stacks2)/ Call Number 512.3 K95g Accession No. 121002749 Availability Available Due Date Make a Reservation Service B M

Contents information

Table of Contents

Preface.-Pre-Mathematics.-No Prerequisites.-Sets and Maps.-Equivalence Classes.-The Story of Free Groups.-Heave Ho! (Pull it Tight).-Fundamental Groups of Surfaces.-Fundamental Groups.-Examples of Fundamental Groups.-Examples of Fundamental Groups, Continued.-Men Who Don’t Realize That Their Wives Have Been Interchanged.-Coverings.-Covering surfaces and Fundamental Groups.-Covering Surfaces and Fundamental Groups, Continued.-The Group of Covering Transformations.-Everyone has a Tail.-The Universal Covering Space.-The Correspondence Between Coverings of (D;O) and Subgroups of pi1(D;O).-Seeing Galois Theory.-Continuous Functions of Covering Surfaces.-Solvable or Not?.-Differential Equations.-Elementary methods of Solving Differential Equations.-Regular Singularities.-Differential Equations of Fuchsian Type.-References.-Notation.-Index.


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