Indefinite inner product space

(Redirected from Pontryagin space)

In mathematics, in the field of functional analysis, an indefinite inner product space

is an infinite-dimensional complex vector space equipped with both an indefinite inner product

and a positive semi-definite inner product

where the metric operator is an endomorphism of obeying

The indefinite inner product space itself is not necessarily a Hilbert space; but the existence of a positive semi-definite inner product on implies that one can form a quotient space on which there is a positive definite inner product. Given a strong enough topology on this quotient space, it has the structure of a Hilbert space, and many objects of interest in typical applications fall into this quotient space.

An indefinite inner product space is called a Krein space (or -space) if is positive definite and possesses a majorant topology. Krein spaces are named in honor of the Soviet mathematician Mark Grigorievich Krein.

Inner products and the metric operator

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Consider a complex vector space   equipped with an indefinite hermitian form  . In the theory of Krein spaces it is common to call such an hermitian form an indefinite inner product. The following subsets are defined in terms of the square norm induced by the indefinite inner product:

  ("neutral")
  ("positive")
  ("negative")
  ("non-negative")
  ("non-positive")

A subspace   lying within   is called a neutral subspace. Similarly, a subspace lying within   ( ) is called positive (negative) semi-definite, and a subspace lying within   ( ) is called positive (negative) definite. A subspace in any of the above categories may be called semi-definite, and any subspace that is not semi-definite is called indefinite.

Let our indefinite inner product space also be equipped with a decomposition into a pair of subspaces  , called the fundamental decomposition, which respects the complex structure on  . Hence the corresponding linear projection operators   coincide with the identity on   and annihilate  , and they commute with multiplication by the   of the complex structure. If this decomposition is such that   and  , then   is called an indefinite inner product space; if  , then   is called a Krein space, subject to the existence of a majorant topology on   (a locally convex topology where the inner product is jointly continuous).

The operator   is called the (real phase) metric operator or fundamental symmetry, and may be used to define the Hilbert inner product  :

 

On a Krein space, the Hilbert inner product is positive definite, giving   the structure of a Hilbert space (under a suitable topology). Under the weaker constraint  , some elements of the neutral subspace   may still be neutral in the Hilbert inner product, but many are not. For instance, the subspaces   are part of the neutral subspace of the Hilbert inner product, because an element   obeys  . But an element   ( ) which happens to lie in   because   will have a positive square norm under the Hilbert inner product.

We note that the definition of the indefinite inner product as a Hermitian form implies that:

 

(Note: This is not correct for complex-valued Hermitian forms. It only gives the real part.) Therefore the indefinite inner product of any two elements   which differ only by an element   is equal to the square norm of their average  . Consequently, the inner product of any non-zero element   with any other element   must be zero, lest we should be able to construct some   whose inner product with   has the wrong sign to be the square norm of  .

Similar arguments about the Hilbert inner product (which can be demonstrated to be a Hermitian form, therefore justifying the name "inner product") lead to the conclusion that its neutral space is precisely  , that elements of this neutral space have zero Hilbert inner product with any element of  , and that the Hilbert inner product is positive semi-definite. It therefore induces a positive definite inner product (also denoted  ) on the quotient space  , which is the direct sum of  . Thus   is a Hilbert space (given a suitable topology).

Properties and applications

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Krein spaces arise naturally in situations where the indefinite inner product has an analytically useful property (such as Lorentz invariance) which the Hilbert inner product lacks. It is also common for one of the two inner products, usually the indefinite one, to be globally defined on a manifold and the other to be coordinate-dependent and therefore defined only on a local section.

In many applications the positive semi-definite inner product   depends on the chosen fundamental decomposition, which is, in general, not unique. But it may be demonstrated (e. g., cf. Proposition 1.1 and 1.2 in the paper of H. Langer below) that any two metric operators   and   compatible with the same indefinite inner product on   result in Hilbert spaces   and   whose decompositions   and   have equal dimensions. Although the Hilbert inner products on these quotient spaces do not generally coincide, they induce identical square norms, in the sense that the square norms of the equivalence classes   and   into which a given   if they are equal. All topological notions in a Krein space, like continuity, closed-ness of sets, and the spectrum of an operator on  , are understood with respect to this Hilbert space topology.

Isotropic part and degenerate subspaces

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Let  ,  ,   be subspaces of  . The subspace   for all   is called the orthogonal companion of  , and   is the isotropic part of  . If  ,   is called non-degenerate; otherwise it is degenerate. If   for all  , then the two subspaces are said to be orthogonal, and we write  . If   where  , we write  . If, in addition, this is a direct sum, we write  .

Pontryagin space

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If  , the Krein space   is called a Pontryagin space or  -space. (Conventionally, the indefinite inner product is given the sign that makes   finite.) In this case   is known as the number of positive squares of  . Pontryagin spaces are named after Lev Semenovich Pontryagin.

Pesonen operator

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A symmetric operator A on an indefinite inner product space K with domain K is called a Pesonen operator if (x,x) = 0 = (x,Ax) implies x = 0.

References

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  • Azizov, T.Ya.; Iokhvidov, I.S. : Linear operators in spaces with an indefinite metric, John Wiley & Sons, Chichester, 1989, ISBN 0-471-92129-7.
  • Bognár, J. : Indefinite inner product spaces, Springer-Verlag, Berlin-Heidelberg-New York, 1974, ISBN 3-540-06202-5.
  • Langer, H. (2001) [1994], "Krein space", Encyclopedia of Mathematics, EMS Press
  • Langer, H. : Spectral functions of definitizable operators in Krein spaces, Functional Analysis Proceedings of a conference held at Dubrovnik, Yugoslavia, November 2–14, 1981, Lecture Notes in Mathematics, 948, Springer-Verlag Berlin-Heidelberg-New York, 1982, 1-46, ISSN 0075-8434.
  • Nikol'skii, N.K.; Pavlov, B.S. (2001) [1994], "Hilbert space with an indefinite metric", Encyclopedia of Mathematics, EMS Press
  • Nikol'skii, N.K.; Pavlov, B.S. (2001) [1994], "Pontryagin space", Encyclopedia of Mathematics, EMS Press