Inner product space Guide, Meaning , Facts, Information and Description
In mathematics, an inner product space is a vector space with additional structure, an inner product, scalar product or dot product, which allows us to introduce geometrical notions such as angles and lengths of vectors. Inner product spaces are generalizations of Euclidean space (with the dot product as the inner product) and are studied in functional analysis. An inner product space is also called a pre-Hilbert space, since its completion with respect to the metric induced by its inner product is a Hilbert space.
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2 Examples 3 Norms on inner product spaces 4 Orthonormal sequences 5 Operators on inner product spaces 6 Degenerate inner products 7 References 8 See also |
In the following article, the field of scalars denoted F is either
the field of real numbers R or the field of complex numbers C.
Formally, an inner product space is a vector space V over the field F together with a bilinear form, called an inner product
Definitions
satisfying the following axioms:
- Nonnegativity:
- Nondegeneracy:
- Conjugate symmetry:
- Sesquilinearity:
Remark. Many mathematical authors require an inner product to be linear in the first argument and conjugate-linear in the second argument, contrary to the convention adopted above. This change is immaterial, but the definition above ensures a smoother connection to the bra-ket notation used by physicists in quantum mechanics and is now often used by mathematicians as well. Some authors adopt the convention that < , > is linear in the first component while < | > is linear in the second component, although this is by no means universal. For instance the G. Emch reference does not follow this convention.
In some cases we need to consider non-negative semi-definite sesquilinear forms. This means that <x, x> is only required to be non-negative. We show how to treat these below.
A trivial example are the real numbers with the standard multiplication as the inner product
Examples
More generally any Euclidean space Rn with the dot product is an inner product space
The article on Hilbert space has several examples of inner product spaces where the metric induced by the inner product yields a complete metric spaces. An example of an inner product which induces an incomplete metric is is the space C[a, b] of continuous complex valued functions on the interval [a,b]. The inner product is
- fk(t) is 1 for t in the subinterval [0, 1/2]
- fk(t) is 0 for t in the subinterval [1/2 + 1/k, 1]
- fk is affine in [1/2, 1/2 + 1/k]
Inner product spaces have a naturally defined norm
Norms on inner product spaces
This is well defined by the nonnegatity axiom of the definition of inner product space. The norm is thought of as the length of the vector x.
Directly from the axioms, we can prove the following:
with equality if and only if x and y are linearly dependent. This is one of the most important inequalities in mathematics. It is also known in the Russian mathematical literature as the Cauchy-Bunyakowski-Schwarz inequality.
Because of its importance, its short proof should be noted. To prove this inequality note it is trivial in the case y = 0. Thus we may assume
The geometric interpretation of the inner product in terms of angle and length, motivates much of the geometric terminology we use in regard to these spaces. Indeed, an immediate consequence of the Cauchy-Schwarz inequality is that it justifies defining the angle between two non-zero vectors x and y (at least in the case F = R) by the identity
- Homogeneity: for x an element of V an r a scalar
- Triangle inequality: for x, y elements of V
Because of the triangle inequality and because of axiom 2, we see that ||·|| is a norm which turns V into a normed vector space and hence also into a metric space. The most important inner product spaces are the ones which are complete with respect to this metric; they are called Hilbert spaces. Every inner product V space is a dense subspace of some Hilbert space. This Hilbert space is essentially uniquely determined by V and is constructed by completing V.
- Pythagorean theorem: Whenever x, y are in V and <x, y> = 0, then
An easy induction on the Pythagorean theorem yields:
- If x1, ..., xn are orthogonal vectors, that is, <xj, xk> = 0 for distinct indices j, k, then
In view of the Cauchy-Schwarz inequality, we also note that <·,·> is continuous from V x V to F. This allows us to extend Pythagoras' theorem to infinitely many summands:
- Parseval's Identity: Suppose V is a complete inner product space. If {xk} are mutually orthogonal vectors in V then
A sequence {ek}k is orthonormal iff it is orthogonal and each ek has norm 1. An orthornormal basis for an inner product space V is an orthonormal sequence whose algebraic span is V.
The Gram-Schmidt process is a canonical procedure that takes a linearly independent sequence {vk}k on an inner product space and produces an orthonormal sequence {ek}k such that for each n
Theorem. Any separable inner product space V has an orthonormal basis.
Parseval's identity leads immediately to the following theorem:
Theorem. Let V be a separable inner product space and {ek}k an orthonormal basis of V.
Then the map
This theorem can be regarded as an abstract form of Fourier series, in which an arbitrary orthornormal basis plays the role of the sequence of trigonometric polynomials. Note that the underlying index set can be taken to be any countable set (and in fact any set whatsoever, provided l2 is defined appropriately, as is explained in the article Hilbert space).
In particular, we obtain the following result in the theory of Fourier series:
Theorem. Let V be the inner product space C[-π,π]. Then the sequence (indexed on set of all integers) of continuous functions
Orthogonality of the sequence {ek}k follows immediately from the fact that if k ≠ j, then
Several types of linear maps A from an inner product space V to an inner product space W are of relevance:
If V is a vector space and < , > a semi-definite sesquilinear form,
then the function ||x|| = <x,x>1/2 makes sense and satisfies all the properties of norm except that ||x|| = 0 does not imply x = 0. We can produce an inner product space by considering the
quotient W = V/{x:||x|| = 0}. The sesquilinear form < , >
factors through W.
This construction is used in numerous contexts. The Gelfand-Naimark-Segal construction is a particularly important example of the use of this technique. Another example is the representation of semi-definite kernels on arbitrary sets.
This is an Article on Inner product space. Page Contains Information, Facts Details or Explanation Guide About Inner product space Orthonormal sequences
By the Gram-Schmidt orthonormalization process, one shows:
is an isometric linear map V → l2 with a dense image.
is an orthonormal basis of the space C[-π,π] with the L2 inner product. The mapping
is an isometric linear map with dense image.
Normality of the sequence is by design, that is, the coefficients are so chosen so that the norm comes out to 1. Finally the fact that the sequence has a dense algebraic span, in the inner product norm, follows from the fact that the sequence has a dense algebraic span, this time in the space of continuous periodic functions on [-π, π] with the uniform norm. This is the content of the Weierstrauss theorem on the uniform density of trigonometric polynomials.Operators on inner product spaces
Ax|
>, where x ranges over the closed unit ball of V, is bounded.
Degenerate inner products
References
See also
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