Marcinkiewicz space

The Banach space of all (classes of) functions measurable on the half-line and having a finite norm

(1)

where is a rearrangement of , that is, the non-increasing left-continuous function equimeasurable with , and is a positive non-decreasing function on for which does not increase (in particular, is a non-decreasing concave function). The space was introduced by J. Marcinkiewicz [1].

If is bounded from below and from above by positive constants, then is isomorphic to . In all other cases it is not separable. The space is an interpolating space (see Interpolation of operators) between and with interpolation constant 1.

On the functional

is defined; its norm does not exceed . The functional does not have the properties of a norm; it is equivalent to the norm if and only if for ,

(In particular, for if .)

The space first arose in the interpolation theorem of Marcinkiewicz (with the functional ) and is connected with interpolation of operators of weak type. It has the following extremal property: It is the broadest among the symmetric spaces the fundamental function of which coincides with , that is, , where is the characteristic function of the interval . If

(2)

then is isomorphic (isometric if is concave) to the dual space of the Lorentz space with the norm

where is the least concave majorant of . Under condition (2) there is a distinguished subspace in , consisting of all functions from for which

If, in addition, , then is the closure in of the set of all bounded functions of compact support. In this case the dual of is isomorphic to the Lorentz space and, consequently, is isomorphic to the second dual space of .

If is a space with a -finite measure defined on its -algebra of measurable sets, then for each measurable function its rearrangement , , is defined, which makes it possible to introduce the Marcinkiewicz space with the norm (1).

References

Comments

Let be a continuous function on . The left-continuous decreasing rearrangement of is defined by the properties:

i) is decreasing (i.e. non-increasing);

ii) is left-continuous;

iii) and have the same measure for all .

Alternatively one considers left-continuous or right-continuous decreasing (or increasing) rearrangements. The right-continuous decreasing rearrangement can be described as follows. Let be the measure of the set . Then

The notion is a continuous analogue of putting a finite sequence of real numbers in decreasing (or increasing) order. This last construction is of importance in the context of the majorization ordering and there are in fact various continuous analogues of results connected with that ordering, such as the Muirhead inequalities and the result linking the majorization ordering and doubly-stochastic matrices, cf. [a1]–[a3].

The Lorentz space defined by means of a function as above is the space of all measurable functions such that

where is the decreasing rearrangement of and is the least concave majorant of . More generally one also considers Lorentz spaces based on norms (instead of like above).

The analogous Lorentz sequence spaces are defined as follows. For every non-increasing sequence of positive numbers and every , let be the space of all sequences of scalars for which

where is a permutation of such that is a non-increasing sequence. If , then is isomorphic to , and if , then . These two "trivial" cases are sometimes excluded. For a great deal of material on Lorentz sequence spaces see [a4].

References