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Finite Dimensional Vector Spaces. (AM-7), Volume 7 / / Paul R. Halmos



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Autore: Halmos Paul R (Paul Richard), <1916-2006, > Visualizza persona
Titolo: Finite Dimensional Vector Spaces. (AM-7), Volume 7 / / Paul R. Halmos Visualizza cluster
Pubblicazione: Princeton, NJ : , : Princeton University Press, , [2016]
©1947
Descrizione fisica: 1 online resource (206 pages)
Disciplina: 512.52
Soggetto topico: Transformations (Mathematics)
Generalized spaces
Soggetto non controllato: Absolute value
Accuracy and precision
Addition
Affine space
Algebraic closure
Algebraic equation
Algebraic operation
Algebraically closed field
Associative property
Automorphism
Axiom
Banach space
Basis (linear algebra)
Bilinear form
Bounded operator
Cardinal number
Cayley transform
Characteristic equation
Characterization (mathematics)
Coefficient
Commutative property
Complex number
Complex plane
Computation
Congruence relation
Convex set
Coordinate system
Determinant
Diagonal matrix
Dimension (vector space)
Dimension
Dimensional analysis
Direct product
Direct proof
Direct sum
Division by zero
Dot product
Dual basis
Eigenvalues and eigenvectors
Elementary proof
Equation
Euclidean space
Existential quantification
Function of a real variable
Functional calculus
Fundamental theorem
Geometry
Gram–Schmidt process
Hermitian matrix
Hilbert space
Infimum and supremum
Jordan normal form
Lebesgue integration
Linear combination
Linear function
Linear independence
Linear map
Linear programming
Linearity
Manifold
Mathematical induction
Mathematics
Minimal polynomial (field theory)
Minor (linear algebra)
Monomial
Multiplication sign
Natural number
Nilpotent
Normal matrix
Normal operator
Number theory
Orthogonal basis
Orthogonal complement
Orthogonal coordinates
Orthogonality
Orthonormality
Polynomial
Quotient space (linear algebra)
Quotient space (topology)
Real number
Real variable
Scalar (physics)
Scientific notation
Series (mathematics)
Set (mathematics)
Sign (mathematics)
Special case
Spectral theorem
Spectral theory
Summation
Tensor calculus
Theorem
Topology
Transitive relation
Unbounded operator
Uncountable set
Unit sphere
Unitary transformation
Variable (mathematics)
Vector space
Note generali: "Lithoprinted."
Nota di bibliografia: Bibliography.
Nota di contenuto: PREFACE -- TABLE OP CONTENTS -- ERRATA -- Chapter I. SPACES -- Chapter II. TRANSFORMATIONS -- Chapter III. ORTHOGONALITY -- APPENDIX I. THE CLASSICAL CANONICAL FORM -- APPENDIX II. DIRECT PRODUCTS -- APPENDIX III. HILBERT SPACE -- BIBLIOGRAPHY -- LIST OF NOTATIONS -- INDEX OF DEFINITIONS
Sommario/riassunto: As a newly minted Ph.D., Paul Halmos came to the Institute for Advanced Study in 1938--even though he did not have a fellowship--to study among the many giants of mathematics who had recently joined the faculty. He eventually became John von Neumann's research assistant, and it was one of von Neumann's inspiring lectures that spurred Halmos to write Finite Dimensional Vector Spaces. The book brought him instant fame as an expositor of mathematics. Finite Dimensional Vector Spaces combines algebra and geometry to discuss the three-dimensional area where vectors can be plotted. The book broke ground as the first formal introduction to linear algebra, a branch of modern mathematics that studies vectors and vector spaces. The book continues to exert its influence sixty years after publication, as linear algebra is now widely used, not only in mathematics but also in the natural and social sciences, for studying such subjects as weather problems, traffic flow, electronic circuits, and population genetics. In 1983 Halmos received the coveted Steele Prize for exposition from the American Mathematical Society for "his many graduate texts in mathematics dealing with finite dimensional vector spaces, measure theory, ergodic theory, and Hilbert space."
Titolo autorizzato: Finite Dimensional Vector Spaces. (AM-7), Volume 7  Visualizza cluster
ISBN: 1-4008-8223-0
Formato: Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione: Inglese
Record Nr.: 9910154744503321
Lo trovi qui: Univ. Federico II
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Serie: Annals of mathematics studies ; ; no. 7.