What is Vector space: Definition and 539 Discussions

A vector space (also called a linear space) is a set of objects called vectors, which may be added together and multiplied ("scaled") by numbers, called scalars. Scalars are often taken to be real numbers, but there are also vector spaces with scalar multiplication by complex numbers, rational numbers, or generally any field. The operations of vector addition and scalar multiplication must satisfy certain requirements, called vector axioms (listed below in § Definition). To specify that the scalars are real or complex numbers, the terms real vector space and complex vector space are often used.
Certain sets of Euclidean vectors are common examples of a vector space. They represent physical quantities such as forces, where any two forces (of the same type) can be added to yield a third, and the multiplication of a force vector by a real multiplier is another force vector. In the same way (but in a more geometric sense), vectors representing displacements in the plane or three-dimensional space also form vector spaces. Vectors in vector spaces do not necessarily have to be arrow-like objects as they appear in the mentioned examples: vectors are regarded as abstract mathematical objects with particular properties, which in some cases can be visualized as arrows.
Vector spaces are the subject of linear algebra and are well characterized by their dimension, which, roughly speaking, specifies the number of independent directions in the space. Infinite-dimensional vector spaces arise naturally in mathematical analysis as function spaces, whose vectors are functions. These vector spaces are generally endowed with some additional structure such as a topology, which allows the consideration of issues of proximity and continuity. Among these topologies, those that are defined by a norm or inner product are more commonly used (being equipped with a notion of distance between two vectors). This is particularly the case of Banach spaces and Hilbert spaces, which are fundamental in mathematical analysis.
Historically, the first ideas leading to vector spaces can be traced back as far as the 17th century's analytic geometry, matrices, systems of linear equations and Euclidean vectors. The modern, more abstract treatment, first formulated by Giuseppe Peano in 1888, encompasses more general objects than Euclidean space, but much of the theory can be seen as an extension of classical geometric ideas like lines, planes and their higher-dimensional analogs.
Today, vector spaces are applied throughout mathematics, science and engineering. They are the appropriate linear-algebraic notion to deal with systems of linear equations. They offer a framework for Fourier expansion, which is employed in image compression routines, and they provide an environment that can be used for solution techniques for partial differential equations. Furthermore, vector spaces furnish an abstract, coordinate-free way of dealing with geometrical and physical objects such as tensors. This in turn allows the examination of local properties of manifolds by linearization techniques. Vector spaces may be generalized in several ways, leading to more advanced notions in geometry and abstract algebra.
This article deals mainly with finite-dimensional vector spaces. However, many of the principles are also valid for infinite-dimensional vector spaces.

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  1. H

    Proving that S is a Basis for the n-Dimensional Vector Space V

    1 Suppose S is a set of n linearly independet in the n-dimensional vectorspace V. Prove that S is a basis for V. My try at this proof is: For S to be a basis for V it has to span V and the vectors in S needs to be linearly independent. But they have allreade sad that the vectors in S are...
  2. A

    Question about the definition of a vector space

    Suppose V is a vector space over a field F that has multiplicative identity 1. Do we have to take, as an axiom, that 1\vec{v} = \vec v 1= \vec{v} for every \vec v\in V, or is this a direct consequence of other, more rudimentary vector space axioms?
  3. Saladsamurai

    Verify that F^n is a vector space over F

    I that this is probably another really simple question, but I would like some help learning how one starts a 'verification problem.' Verify that Fn is a vector space over F. I know that I just have to show that commutativity and scalar multiplication etc. are satisfied. But I am not used to...
  4. J

    Linear Algebra: Show it's a vector space question

    Homework Statement Define V =R with vector addition a+b=ab and scalar multiplication za=a^z. Show that V is a vector space. Homework Equations a+b=ab, za=a^z The Attempt at a Solution I was able to check all the axioms but one, the additive inverse axiom where for all v in...
  5. M

    Determining if set is a real vector space

    Homework Statement The set R^2 with addition defined by <x,y>+<a,b>=<x+a+1,y+b>, and scalar multiplication defined by r<x,y>= <rx+r-1,ry>. The answer in the back of the book says it is a vector space, but I am having trouble proving that 0+v=v and v+(-v)=0 Homework Equations The...
  6. A

    Proving Vector Space of 3-Tuples Fulfilling 3x1 - x2 + 5x3 = 0

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  7. Д

    Vector space several questions

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  8. J

    A linear operator T on a finite-dimensional vector space

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  9. Z

    Is the Set of Solutions to a Homogeneous Differential Equation a Vector Space?

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  10. Z

    Little bit confuse on vector space

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  11. R

    Difference between vector and vector space?

    can any1 pls tell me or explain the following..? 1.wat is the meaning of trivial solution? 2.wat is the difference between vector and vector space? 3.wat is vector space...? 4.why is the element in a field is called scalar? 5.how to illustrate a vector space over a field? 6.wat is...
  12. A

    Vector Space Dimension: Real vs Complex Coefficients

    Homework Statement Let V be a vector space over C of dimenson n . We view V also as a vector space over R by restricting the scalar multiplication of C on V to R .Show that dimR(V) = 2n Homework Equations The Attempt at a Solution I have to show that if x1,...xn form a basis of V...
  13. A

    Vector Space Problem: Maximal Linear Independence & Minimal Spanning Set

    Homework Statement Let V be a vector space over a field F and let x1,...xn \inV.Suppose that x1,...xn form a maximal linearly independent subset of V. Show that x1,...xn form a minimal spanning set of V. Homework Equations The Attempt at a Solution I knew that x1,...xn are linear...
  14. K

    Dimension of a set of symmetric matrices & prove it's a vector space

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  15. P

    Basis of the vector space of solutions to a differential equation.

    Apologies, have solved this question. Answer if useful for anyone: Basis= {e^(5x),e^(-10x)}. Homework Statement Consider the differential equation (2nd derivative of y wrt x) + 5(1st derivative of y wrt x) - 50y =0 Find a basis of the vector space of solutions of the above differential...
  16. R

    What is the meaning of det V and det V* in Generalised Complex geometry?

    Hi, I'm a reading a thesis on Generalised Complex geometry and it mentions an object " det V" and "det V*", for a real vector space V, and its dual V*. Could anyone tell me what this notation means? I've been unable to find anything mentioning a determinant of an entire vector space, so I'm...
  17. A

    Showing V^S is a Vector Space over F

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  18. C

    How to show set of functions is a vector space?

    Homework Statement Let S be a set and V a vector space over the field k. Show that the set of functions f: S --> k, under function addition and multiplication by a constant is a vector space. Homework Equations I think I need to show that (f+g)(x) = f(x) + g(x) and that (rf)(x) = rf(x)...
  19. A

    Basis - Complex Vector Space and Real Vector Space

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  20. F

    Prove this is a Real Vector Space

    Homework Statement Let V be the real functions y=f(x) satisfying d^2(y)/(dx^2) + 9y=0. a. Prove that V is a 2-dimensional real vector space. b. In V define (y,z) = integral (from 0 to pi) yz dx. Find an orthonormal basis in V. The Attempt at a Solution part A: I integrated and got...
  21. F

    Annihilator of Subspaces in Finite-Dimensional Vector Spaces

    Homework Statement If W1 and W2 are subspaces of V, which is finite-dimensional, describe A(W1+W2) in terms of A(W1) and A(W2). Describe A(W1 intersect W2) in terms of A(W1) and A(W2). A(W) is the annihilator of W (W a subspace of vector space V). A(W)={f in dual space of V such that f(w)=0...
  22. W

    Tensor Product of V1 and V2 in Vector Space V: 0 Intersection Required?

    If V1 and V2 are both subspaces of a vector space V, then in order for their tensor product to be defined, does the intersection of V1 and V2 have to be 0?
  23. I

    Proof of the collections of sequences are linear spaces or vector space.

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  24. A

    Vector Space Proof: A Complete Solution to α*f(-2) + β*f(5) = 0

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  25. L

    Proving Vector Space Relationships in WU{A} and WU{B}

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  26. P

    Find basis for vector space consisting of linear transformations

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  27. B

    Vector space, basis, linear operator

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  28. C

    Vector Space Proof: Proving Set S is a Basis

    Homework Statement Let V be a vector space over a field K. Let S be a set of vectors of V, S= {e_i : i in J} (i.e e_i in V for each i in J) where J is an index set. Prove that if S satisfies the following property, then S must be a basis. The property is: For every vector space W over...
  29. O

    Surds as a vector space, but really an analysis question I think

    I guess this is a bit of an interdisciplinary post... a friend of mine was looking at surds as a way of making a vector space with a basis as the prime numbers. Here's the construction: V = {Surds} = {qr|q is rational and positive, r is rational} The field that V is over is Q And we...
  30. C

    Normed Vector Space: Proving L1, L2, and L-Infinity are Norms

    Homework Statement I have to show that l1, l2 and linfinity are norms The Attempt at a Solution Do you just go through the conditions for norm spaces ie: 1. ||x||>0, ||x|| = 0 iff x = 0 2.triangle inequality 3.||cx|| < |c|||x|| if the space satisfies these conditions it is a norm??
  31. Z

    Vector Space, dimensions and kernal rank

    Please could someone help me with this question, thank you. Find dim[Ker(D^2 -D: P_3(F_3) ==>P_3(F_3))] Where dim is dimension, Ker is kernal D is the matrix 0100 0020 0003 0000 D^2 is the derivative of D is it equals 0020 0006 0000 0000 And F_3 is the field subscript3...
  32. H

    Isomorphism beetwenn vector space and sub space

    Hi, I have to find a vector space V with a real sub space U and a bijective linear map. Here my Ideas and my questions: If the linear map is bijective, than dim V = dim U Because U is a real sub space the only way to valid this constraint is if the dimension is infinity. I wrote...
  33. W

    Decomposition of a complex vector space into 2 T-invariant subspaces

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  34. F

    Proving Linear Independence of Basis for Vector Space - How to Finish the Proof?

    Homework Statement Let V be a vector space, and suppose {v_1,...,v_n} (all vectors) form a basis for V. Let V* denote the set of all linear transformations from V to R. (I know from previous work that V* is a vector space). Define f_i as an element of V* by: f_i(a_1*v_1 + a_*v_2 + ...
  35. M

    Unit Lower Triangular Matrices as Vector Spaces | Proof & Properties

    Homework Statement Is the following a vector space? The set of all unit lower triangular 3 x 3 matrices [1 0 0] [a 1 0] [b c 1] Homework Equations Properties of vector spacesThe Attempt at a Solution I checked the properties of vector space (usual addition and scalar multiplication). I...
  36. M

    Is singular matrix is a subspace of vector space V?

    Homework Statement S is a subset of vector space V, If V is an 2x2 matrix and S={A|A is singular}, a)is S closed under addition? b) is S closed under scalar multiplication? Homework Equations S is a subspace of V if it is closed under addition and scalar multiplication...
  37. A

    Basis of a real hermitian matrix vector space with complex entries

    Homework Statement Let V be the \mathbb{R}-vector space \mbox{Herm}_n( \mathbb{C} ). Find \dim_{\mathbb{R}} V. The Attempt at a Solution I'd say the dimension is 2n(n-1)+n=2n^2-n, because all entries not on the main diagonal are complex, so you have n(n-1) entries which you have to...
  38. R

    Vector space of the product of two matrices

    I'm trying to prove (as part of a larger proof) that the product of a m x n matrix M with column space R^m and a n x o matrix N with column space R^n, MN, has column space R^m. I'm not sure where to begin. What I'm thinking should be the right approach is to show that any solution to M augmented...
  39. W

    Position operator in infinte vector space

    Homework Statement Find an expression for <P|X|P> in terms of P(x) defined as <x|P> (and possibly P*(x) ) Homework Equations X|P> = x|P> Identity operator: integral of |x><x| dx The Attempt at a Solution Ok...<P|X|P> add the identity = Integral [ <P|X|x> <x|P> dx ] = Integral [<P|x|x>...
  40. A

    Basis of a real vector space with complex vectors

    Homework Statement Find a basis for V=\mathbb{C}^1, where the field is the real numbers. The Attempt at a Solution I'd say \vec{e}_1=(1,0), \vec{e}_2=(i,0) is a basis, because it seems to me that \vec{u}=a+bi \in V can be written as...
  41. D

    Cross product and vector space

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  42. M

    Finding the Right Vector Space Books to Learn From

    Recommend some good books to study vector space .
  43. N

    Dimension of vector space problem

    Homework Statement Suppose V1 (dim. n1) and V29dim. n2) are two vector subspaces such that any element in V1 is orthogonal to any element in V2.Show that the dimensionality of V1+V2 is n1+n2 Homework Equations The Attempt at a Solution The subspace V1 is spanned by n1 linearly...
  44. N

    Vector Space Problem: Does it Form a Vector Space?

    Homework Statement Do functions that vanish at the end points x=0 and x= L form a vector space? What about periodic functions obeying f(0)=f(L)?How about functions that obey f(0)=4 Homework Equations The Attempt at a Solution We consider functions defined at 0<x<L.We define scalar...
  45. A

    Do Functions with Specific Boundary Conditions Form a Vector Space?

    Homework Statement "Consider all functions f(x) defined in an interval 0\leqx\leqL. We define scalar multiplication by a simply as af(x) and addition as pointwise addition: the sum of two functions f and g has the value f(x)+g(x) at the point x. The null function is simply zero everywhere...
  46. J

    Infinite Dimensional Vector Space

    Homework Statement Prove that V is infinite dimensional if and only if there is a sequence v_1, v_2,... of vectors in V such that (v_1,...,v_n) is linearly independent for every positive integer n. Homework Equations A vector space is finite dimensional if some list of vectors in it...
  47. D

    Finding Linear Transformations in Polynomial Vector Spaces

    [/b]1. Homework Statement [/b] Let P_2 be the set of all real polynomials of degree no greater than 2. Show that both B:={1, t, t^2} and B':= {1, 1-t, 1-t-t^2} are bases for P_2. If we regard a polynomial p as defining a function R --> R, x |--> p(x), then p is differentiable, and D: P_2 -->...
  48. A

    Sum of Vector Spaces U & W in Linear Algebra Done Right

    The sum of two subspaces seems a simple enough concept to me, but I must be misunderstanding it since I don't understand why Axler gives an answer he does in Linear Algebra Done Right. Suppose U and W are subspaces of some vector space V. U = \{(x, 0, 0) \in \textbf{F}^3 : x \in...
  49. T

    Difference between a vector space and a field

    One book defined a vector space as a set of objects that can undergo the laws of algebra "over" the field of scalars. But doesn't the laws of algebra also hold in a field? If so, wouldn't a field be a vector space also? Wouldn't that make the definition of a vector space meaningless as it uses...
  50. M

    Proving that the solution of Ax=0 is a vector space

    Here is my attempt to answer this guys, i'd really appreciate any corrections. a vector space has the 0 vector the vector space is closed under vector addition and scalar multiplication (AKA for every vector u, v in the subspace, there exists a vector u + v in the subspace) Here we go...
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