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Noobieschool said:
Although I am a bit confused by the format of your response, I thank you for your help!
Mathwonk was recommending an excellent and widely used algebra textbook: Michael Artin,
Algebra, Prentice Hall, 1991. MA is a leading mathematician; his father Emil is the father of "Galois-theory-as-you-know-it".
As for the book by Paul R. Halmos,
Finite-Dimensional Vector Spaces, Springer, 1974, that is the book from which I taught myself linear algebra (by reading, not a course). Needless to say I highly recommend it--- I think it is a brilliant and very clear book. Halmos was not only a legendary expositor of mathematics (his style is both memorable and inimitable) but also a leading researcher, remembered as a father of functional analysis and to the spectral approach to ergodic theory. The interesting thing is that these topics involve
infinite dimensional vector spaces; Halmos says in the preface of his textbook that he wanted to prepare students to learn what parts of the finite dimensional theory generalize to infinite dimensions (with appropriate elaboration, of course).
But if you like the look of the textbook by Artin, well, that is an excellent book also. There are a large number of other books on "abstract" linear algebra, but these are the two which come to mind first. To be precise: I might recommend that you read the appropriate portions of the classic by Birkhoff and Mac Lane,
Modern Algebra (which also covers groups, rings, and modules) and that you finish your reading by studying Herstein,
Topics in Algebra. Some others here feel that the latter book is not a good first book, but it was the textbook used in the modern algebra course I took as an undergraduate at Cornell, and again I feel it has much to recommend it. Just recently we had cause to quote it in discussing the generalization to SO(n) of the familiar fact that rotations in SO(3) are specified by giving an axis (two real numbers) and an angle (one real number); the generalization is terribly imporant but not even mentioned in other textbooks! See Terry Tao's remark in
http://terrytao.wordpress.com/2007/09/29/ratners-theorems/ on a one-dimensional subgroup which is dense in the two-dimensional abelian subgroup of SO(4) and which is not a circle--- this is actually an illustration of something cool in ergodic theory; see above!--- and see
John Baez's occasional discussions of maximal tori in compact simple Lie groups.
