語系:
繁體中文
English
日文
簡体中文
說明(常見問題)
登入
回首頁
切換:
標籤
|
MARC模式
|
ISBD
General relativity :an introduction ...
~
Efstathiou, George.
General relativity :an introduction for physicists /
紀錄類型:
書目-語言資料,印刷品 : Monograph/item
杜威分類號:
530.11
書名/作者:
General relativity : : an introduction for physicists // M.P. Hobson, G.P. Efstathiou and A.N. Lasenby.
作者:
Hobson, M. P.
其他作者:
Efstathiou, George.
面頁冊數:
1 online resource (xviii, 572 pages) : : digital, PDF file(s).
附註:
Title from publisher's bibliographic system (viewed on 18 Jul 2016).
標題:
General relativity (Physics)
ISBN:
9780511790904 (ebook)
內容註:
The spacetime of special relativity -- Manifolds and coordinates -- Vector calculus on manifolds -- Tensor calculus on manifolds -- Special relativity revisited -- Electromagnetism -- The equivalence principle and spacetime curvature -- The gravitational field equations -- The Schwarzschild geometry -- Experimental tests of general relativity -- Schwarzschild black holes -- Further spherically symmetric geometries -- The Kerr geometry -- The Friedmann-Robertson-Walker geometry -- Cosmological models -- Inflationary cosmology -- Linearised general relativity -- Gravitational waves -- A variational approach to general relativity.
摘要、提要註:
General Relativity: An Introduction for Physicists provides a clear mathematical introduction to Einstein's theory of general relativity. It presents a wide range of applications of the theory, concentrating on its physical consequences. After reviewing the basic concepts, the authors present a clear and intuitive discussion of the mathematical background, including the necessary tools of tensor calculus and differential geometry. These tools are then used to develop the topic of special relativity and to discuss electromagnetism in Minkowski spacetime. Gravitation as spacetime curvature is then introduced and the field equations of general relativity derived. After applying the theory to a wide range of physical situations, the book concludes with a brief discussion of classical field theory and the derivation of general relativity from a variational principle. Written for advanced undergraduate and graduate students, this approachable textbook contains over 300 exercises to illuminate and extend the discussion in the text.
電子資源:
http://dx.doi.org/10.1017/CBO9780511790904
General relativity :an introduction for physicists /
Hobson, M. P.1967-
General relativity :
an introduction for physicists /M.P. Hobson, G.P. Efstathiou and A.N. Lasenby. - 1 online resource (xviii, 572 pages) :digital, PDF file(s).
Title from publisher's bibliographic system (viewed on 18 Jul 2016).
The spacetime of special relativity -- Manifolds and coordinates -- Vector calculus on manifolds -- Tensor calculus on manifolds -- Special relativity revisited -- Electromagnetism -- The equivalence principle and spacetime curvature -- The gravitational field equations -- The Schwarzschild geometry -- Experimental tests of general relativity -- Schwarzschild black holes -- Further spherically symmetric geometries -- The Kerr geometry -- The Friedmann-Robertson-Walker geometry -- Cosmological models -- Inflationary cosmology -- Linearised general relativity -- Gravitational waves -- A variational approach to general relativity.
General Relativity: An Introduction for Physicists provides a clear mathematical introduction to Einstein's theory of general relativity. It presents a wide range of applications of the theory, concentrating on its physical consequences. After reviewing the basic concepts, the authors present a clear and intuitive discussion of the mathematical background, including the necessary tools of tensor calculus and differential geometry. These tools are then used to develop the topic of special relativity and to discuss electromagnetism in Minkowski spacetime. Gravitation as spacetime curvature is then introduced and the field equations of general relativity derived. After applying the theory to a wide range of physical situations, the book concludes with a brief discussion of classical field theory and the derivation of general relativity from a variational principle. Written for advanced undergraduate and graduate students, this approachable textbook contains over 300 exercises to illuminate and extend the discussion in the text.
ISBN: 9780511790904 (ebook)Subjects--Topical Terms:
192815
General relativity (Physics)
LC Class. No.: QC173.6 / .H63 2006
Dewey Class. No.: 530.11
General relativity :an introduction for physicists /
LDR
:02726nam a22003018i 4500
001
449767
003
UkCbUP
005
20160811115532.0
006
m|||||o||d||||||||
007
cr||||||||||||
008
161201s2006||||enk o ||1 0|eng|d
020
$a
9780511790904 (ebook)
020
$z
9780521829519 (hardback)
020
$z
9780521536394 (paperback)
035
$a
CR9780511790904
040
$a
UkCbUP
$b
eng
$e
rda
$c
UkCbUP
050
0 0
$a
QC173.6
$b
.H63 2006
082
0 0
$a
530.11
$2
22
100
1
$a
Hobson, M. P.
$q
(Michael Paul),
$d
1967-
$e
author.
$3
645811
245
1 0
$a
General relativity :
$b
an introduction for physicists /
$c
M.P. Hobson, G.P. Efstathiou and A.N. Lasenby.
264
1
$a
Cambridge :
$b
Cambridge University Press,
$c
2006.
300
$a
1 online resource (xviii, 572 pages) :
$b
digital, PDF file(s).
336
$a
text
$b
txt
$2
rdacontent
337
$a
computer
$b
c
$2
rdamedia
338
$a
online resource
$b
cr
$2
rdacarrier
500
$a
Title from publisher's bibliographic system (viewed on 18 Jul 2016).
505
0
$a
The spacetime of special relativity -- Manifolds and coordinates -- Vector calculus on manifolds -- Tensor calculus on manifolds -- Special relativity revisited -- Electromagnetism -- The equivalence principle and spacetime curvature -- The gravitational field equations -- The Schwarzschild geometry -- Experimental tests of general relativity -- Schwarzschild black holes -- Further spherically symmetric geometries -- The Kerr geometry -- The Friedmann-Robertson-Walker geometry -- Cosmological models -- Inflationary cosmology -- Linearised general relativity -- Gravitational waves -- A variational approach to general relativity.
520
$a
General Relativity: An Introduction for Physicists provides a clear mathematical introduction to Einstein's theory of general relativity. It presents a wide range of applications of the theory, concentrating on its physical consequences. After reviewing the basic concepts, the authors present a clear and intuitive discussion of the mathematical background, including the necessary tools of tensor calculus and differential geometry. These tools are then used to develop the topic of special relativity and to discuss electromagnetism in Minkowski spacetime. Gravitation as spacetime curvature is then introduced and the field equations of general relativity derived. After applying the theory to a wide range of physical situations, the book concludes with a brief discussion of classical field theory and the derivation of general relativity from a variational principle. Written for advanced undergraduate and graduate students, this approachable textbook contains over 300 exercises to illuminate and extend the discussion in the text.
650
0
$a
General relativity (Physics)
$3
192815
700
1
$a
Efstathiou, George.
$3
645812
700
1
$a
Lasenby, A. N.
$q
(Anthony N.),
$d
1954-
$e
author.
$3
645813
776
0 8
$i
Print version:
$z
9780521829519
856
4 0
$u
http://dx.doi.org/10.1017/CBO9780511790904
筆 0 讀者評論
多媒體
多媒體檔案
http://dx.doi.org/10.1017/CBO9780511790904
評論
新增評論
分享你的心得
Export
取書館別
處理中
...
變更密碼
登入