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Hyperbolic geometry / James...

Hyperbolic geometry

Anderson, James W. (1964-)

Springer 1999

"The geometry of the hyperbolic plane has been an active and fascinating field of mathematical inquiry for most of the past two centuries. This book provides a self-contained introduction to the subject, taking the approach that hyperbolic geometry consists of the study of those quantities invariant under the action of a natural group of transformations." "The style and level of the book, which assumes few mathematical prerequisites, make it an ideal introduction to this subject and provide the reader with a firm grasp of the concepts and techniques of this beautiful area of mathematics."--Jacket

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monografia Rebiun30218025 https://catalogo.rebiun.org/rebiun/record/Rebiun30218025 m o d cr un||||a|a|| 100809s1999 enka ob 001 0 eng d 1086539236 1112980064 1149412036 1262681256 1294307595 9781447139874 electronic bk.) 1447139879 electronic bk.) 1852331569 alk. paper) 9781852331566 alk. paper) 9781846282201 electronic bk.) 1846282209 electronic bk.) 10.1007/978-1-4471-3987-4 doi AU@ 000057641356 AU@ 000065496605 NZ1 15181520 OCLCE eng pn OCLCE OCLCQ GW5XE OCLCQ OCLCF OCLCQ YDX UAB OCLCQ U3W TKN OCLCQ LEAUB UKBTH INARC OCLCQ UKAHL VT2 OCLCQ OCLCO N$T OCLCO QA lcco PBM bicssc MAT012000 bisacsh PBM thema 516.85 516.9 21 Anderson, James W. 1964-) Hyperbolic geometry James W. Anderson London New York Springer 1999 London New York London New York Springer 1 online resource (ix, 230 pages) illustrations 1 online resource (ix, 230 pages) Text txt rdacontent computer c rdamedia online resource cr rdacarrier text file PDF Springer undergraduate mathematics series Includes bibliographical references (pages 221-224) and index 1.) The Basic Spaces -- 2.) The General Mobius Group -- 3.) Length and Distance in H -- 4.) Other Models of the Hyperbolic Plane -- 5.) Convexity, Area, and Trigonometry -- 6.) Groups Acting on H. "The geometry of the hyperbolic plane has been an active and fascinating field of mathematical inquiry for most of the past two centuries. This book provides a self-contained introduction to the subject, taking the approach that hyperbolic geometry consists of the study of those quantities invariant under the action of a natural group of transformations." "The style and level of the book, which assumes few mathematical prerequisites, make it an ideal introduction to this subject and provide the reader with a firm grasp of the concepts and techniques of this beautiful area of mathematics."--Jacket English Geometry, Hyperbolic Géométrie hyperbolique Geometry, Hyperbolic GEOMETRIA HIPERBÓLICA. Geometry, Hyperbolic Géométrie hyperbolique Electronic books Print version Anderson, James W., 1964-. Hyperbolic geometry. London ; New York : Springer, 1999 (DLC) 99037719 (OCoLC)41674361 Springer undergraduate mathematics series

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monografia Rebiun30218025 https://catalogo.rebiun.org/rebiun/record/Rebiun30218025 m o d cr un||||a|a|| 100809s1999 enka ob 001 0 eng d 1086539236 1112980064 1149412036 1262681256 1294307595 9781447139874 electronic bk.) 1447139879 electronic bk.) 1852331569 alk. paper) 9781852331566 alk. paper) 9781846282201 electronic bk.) 1846282209 electronic bk.) 10.1007/978-1-4471-3987-4 doi AU@ 000057641356 AU@ 000065496605 NZ1 15181520 OCLCE eng pn OCLCE OCLCQ GW5XE OCLCQ OCLCF OCLCQ YDX UAB OCLCQ U3W TKN OCLCQ LEAUB UKBTH INARC OCLCQ UKAHL VT2 OCLCQ OCLCO N$T OCLCO QA lcco PBM bicssc MAT012000 bisacsh PBM thema 516.85 516.9 21 Anderson, James W. 1964-) Hyperbolic geometry James W. Anderson London New York Springer 1999 London New York London New York Springer 1 online resource (ix, 230 pages) illustrations 1 online resource (ix, 230 pages) Text txt rdacontent computer c rdamedia online resource cr rdacarrier text file PDF Springer undergraduate mathematics series Includes bibliographical references (pages 221-224) and index 1.) The Basic Spaces -- 2.) The General Mobius Group -- 3.) Length and Distance in H -- 4.) Other Models of the Hyperbolic Plane -- 5.) Convexity, Area, and Trigonometry -- 6.) Groups Acting on H. "The geometry of the hyperbolic plane has been an active and fascinating field of mathematical inquiry for most of the past two centuries. This book provides a self-contained introduction to the subject, taking the approach that hyperbolic geometry consists of the study of those quantities invariant under the action of a natural group of transformations." "The style and level of the book, which assumes few mathematical prerequisites, make it an ideal introduction to this subject and provide the reader with a firm grasp of the concepts and techniques of this beautiful area of mathematics."--Jacket English Geometry, Hyperbolic Géométrie hyperbolique Geometry, Hyperbolic GEOMETRIA HIPERBÓLICA. Geometry, Hyperbolic Géométrie hyperbolique Electronic books Print version Anderson, James W., 1964-. Hyperbolic geometry. London ; New York : Springer, 1999 (DLC) 99037719 (OCoLC)41674361 Springer undergraduate mathematics series