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Vector spaces can be formed of vector subspaces.
Tatsuo Kimura has written: 'Introduction to prehomogeneous vector spaces' -- subject(s): Vector spaces
F. Brickell has written: 'Matrices and vector spaces' -- subject(s): Matrices, Problems, exercises, Vector spaces
Robert M. Thrall has written: 'Vector spaces and matrices' -- subject(s): Vector spaces, Matrices 'A generalisation of numerical utilities 1'
"Linear algebra is a branch of mathematics that studies vector spaces, also called linear spaces, along with linear functions that input one vector and output another." (from Wikipedia)
Jean Schmets has written: 'Spaces of vector-valued continuous functions' -- subject(s): Continuous Functions, Locally convex spaces, Vector valued functions
Paul Arnold Clement has written: 'Parallel vector spaces ..' -- subject(s): Vector analysis
Frederick Brickell has written: 'Matrices and vector spaces'
Paul R. Halmos has written: 'Measure theory' -- subject(s): Topology, Measure theory 'Lectures on ergodic theory' -- subject(s): Statistical mechanics, Ergodic theory 'Measure theory' 'Naive Set Theory' 'Invariant subspaces, 1969' -- subject(s): Hilbert space, Invariants, Generalized spaces 'Bounded integral operators on L(superior 2) spaces' -- subject(s): Hilbert space, Integral operators 'Naive set theory' -- subject(s): Set theory, Arithmetic, Foundations 'Lectures on boolean algebra' 'Entropy in ergodic theory' -- subject(s): Statistical mechanics, Information theory, Transformations (Mathematics) 'Finite-dimensional vector spaces' -- subject(s): Transformations (Mathematics), Vector analysis 'Algebraic logic' -- subject(s): Algebraic logic 'Introduction to Hilbert space and the theory of spectral multiplicity' 'Finite-dimensional vector spaces' -- subject(s): Vector spaces 'Selecta' -- subject(s): Mathematics, Operator theory 'Introduction to Hilbert space and the theory of spectral multiplicity' -- subject(s): Spectral theory (Mathematics) 'Measure Theory' 'A Hilbert space problem book' -- subject(s): Hilbert space 'Invariants of certain stochastic transformations' 'Finite Dimensional Vector Spaces. (AM-7) (Annals of Mathematics Studies)'
quantities that have direction. e.g motion if you go forward 3 spaces in a car = 3 , if you go backward 3 spaces = -3
An affine transformation is a linear transformation between vector spaces, followed by a translation.
Gilles Pisier has written: 'The operator Hilbert space OH, complex interpolation, and tensor norms' -- subject(s): Hilbert space, Interpolation spaces, Selfadjoint operators 'Non-commutative vector valued Lp-spaces and completeley p-summing maps' -- subject(s): Lp spaces 'Non-commutative vector valued Lp-spaces and completely p-summing maps' -- subject(s): Lp spaces