Content deleted Content added
m Dating maintenance tags: {{Citation needed}} |
add field |
||
| (28 intermediate revisions by 23 users not shown) | |||
Line 1:
{{Short description|Mathematical theory by discovered by Józef Marcinkiewicz}}
In [[mathematics]], particularly in [[functional analysis]], the '''Marcinkiewicz interpolation theorem''', discovered by {{harvs|txt|authorlink=Józef Marcinkiewicz|first=Józef |last=Marcinkiewicz|year=1939}}, is a result bounding the norms of non-linear operators acting on [[lp space|''L''<sup>p</sup> spaces]]. Marcinkiewicz' theorem is similar to the [[Riesz–Thorin theorem]] about [[linear operators]], but also applies to non-linear operators.
==Preliminaries==
Line 8 ⟶ 9:
:<math>\lambda_f(t) = \omega\left\{x\in X\mid |f(x)| > t\right\}.</math>
Then ''f'' is called '''weak <math>L^1</math>''' if there exists a constant ''C'' such that the distribution function of ''f'' satisfies the following inequality for all ''t'' > 0:
:<math>\lambda_f(t)\leq \frac{C}{t}.</math>
The smallest constant ''C'' in the inequality above is called the '''weak <math>L^1</math> norm''' and is usually denoted by <math>\|
(Note: This terminology is a bit misleading since the weak norm does not satisfy the triangle inequality as one can see by considering the sum of the functions on <math> (0,1) </math> given by <math> 1/x </math> and <math> 1/(1-x) </math>, which has norm 4 not 2.)
Line 20 ⟶ 21:
:<math>\|f\|_{1,w}\leq \|f\|_1.</math>
This is nothing but [[Markov's inequality]] (aka [[Chebyshev's Inequality]]). The converse is not true. For example, the function 1/''x'' belongs to ''L''<sup>1,''w''</sup> but not to ''L''<sup>1</sup>.
Similarly, one may define the [[Lp space#Weak Lp|'''weak <math>L^p</math> space''']] as the space of all functions ''f'' such that <math>|f|^p</math> belong to ''L''<sup>1,''w''</sup>, and the '''weak <math>L^p</math> norm''' using
:<math>\|f\|_{p,w}= \
More directly, the ''L''<sup>''p'',''w''</sup> norm is defined as the best constant ''C'' in the inequality
Line 35 ⟶ 36:
Informally, Marcinkiewicz's theorem is
:'''Theorem.'''
In other words, even if
Where Marcinkiewicz's theorem is weaker than the Riesz-Thorin theorem is in the estimates of the norm. The theorem gives bounds for the <math>L^r</math> norm of ''T'' but this bound increases to infinity as ''r'' converges to either ''p'' or ''q''. Specifically {{harv|DiBenedetto|2002|loc=Theorem VIII.9.2}}, suppose that
:<math>\|Tf\|_{p,w} \le N_p\|f\|_p,</math>
:<math>\|Tf\|_{q,w} \le N_q\|f\|_q,</math>
so that the [[operator norm]] of ''T'' from ''L''<sup>''p''</sup> to ''L''<sup>''p'',''w''</sup> is at most ''N''<sub>''p''</sub>, and the operator norm of ''T'' from ''L''<sup>''q''</sup> to ''L''<sup>''q'',''w''</sup> is at most ''N''<sub>''q''</sub>. Then the following '''interpolation inequality''' holds for all ''r'' between ''p'' and ''q'' and all ''f'' ∈ ''L''<sup>''r''</sup>:
:<math>\|Tf\|_r\le \gamma N_p^\delta N_q^{1-\delta}\|f\|_r</math>
Line 50 ⟶ 53:
The constants δ and γ can also be given for ''q'' = ∞ by passing to the limit.
A version of the theorem also holds more generally if ''T'' is only assumed to be a
:<math>|T(f+g)(x)| \le C(|Tf(x)|+|Tg(x)|)</math>
for [[almost everywhere|almost every]] ''x''.
:<math>\gamma=2C\left(\frac{r(q-p)}{(r-p)(q-r)}\right)^{1/r}.</math>
An operator ''T'' (possibly quasilinear) satisfying an estimate of the form
:<math>\|Tf\|_{q,w}\le C\|f\|_p</math>
is said to be of '''weak type (''p'',''q'')'''. An operator is simply of type (''p'',''q'') if ''T'' is a bounded transformation from ''L<sup>p</sup>'' to ''L<sup>q</sup>'':
:<math>\|Tf\|_q\le C\|f\|_p.</math>
A more general formulation of the interpolation theorem is as follows:
* If ''T'' is a quasilinear operator of weak type (''p''<sub>0</sub>, ''q''<sub>0</sub>) and of weak type (''p''<sub>1</sub>, ''q''<sub>1</sub>) where ''q''<sub>0</sub> ≠ ''q''<sub>1</sub>, then for each θ ∈ (0,1), ''T'' is of type (''p'',''q''), for ''p'' and ''q'' with ''p'' ≤ ''q'' of the form
::<math>\frac{1}{p} = \frac{1-\theta}{p_0}+\frac{\theta}{p_1},\quad \frac{1}{q} = \frac{1-\theta}{q_0} + \frac{\theta}{q_1}.</math>
The latter formulation follows from the former through an application of [[Hölder's inequality]] and a duality argument.{{Citation needed|reason=How to use Hölder's inequality and the special case?|date=June 2016}}
Line 69 ⟶ 81:
Hence [[Parseval's theorem]] easily shows that the Hilbert transform is bounded from <math>L^2</math> to <math>L^2</math>. A much less obvious fact is that it is bounded from <math>L^1</math> to <math>L^{1,w}</math>. Hence Marcinkiewicz's theorem shows that it is bounded from <math>L^p</math> to <math>L^p</math> for any 1 < ''p'' < 2. [[dual space|Duality]] arguments show that it is also bounded for 2 < ''p'' < ∞. In fact, the Hilbert transform is really unbounded for ''p'' equal to 1 or ∞.
Another famous example is the [[Hardy–Littlewood maximal function]], which is only
==History==
The theorem was first announced by {{harvtxt|Marcinkiewicz|1939}}, who showed this result to [[Antoni Zygmund]] shortly before he died in World War II. The theorem was almost forgotten by Zygmund, and was absent from his original works on the theory of [[singular integral operator]]s. Later {{harvtxt|Zygmund|1956}} realized that Marcinkiewicz's result could greatly simplify his work, at which time he published his former student's theorem together with a generalization of his own.
In 1964 [[Richard Allen Hunt|Richard A. Hunt]] and [[Guido Weiss]] published a new proof of the Marcinkiewicz interpolation theorem.<ref name="HuntWeiss1964">{{cite journal|last1=Hunt|first1=Richard A.|last2=Weiss|first2=Guido|title=The Marcinkiewicz interpolation theorem|journal=Proceedings of the American Mathematical Society|volume=15|issue=6|year=1964|pages=996–998|issn=0002-9939|doi=10.1090/S0002-9939-1964-0169038-4|doi-access=free}}</ref>
== See also ==
Line 78 ⟶ 92:
==References==
{{reflist}}
* {{citation | last=DiBenedetto|first=Emmanuele|title=Real analysis|publisher=Birkhäuser|year=2002|isbn=3-7643-4231-5}}.
* {{citation|title=Elliptic partial differential equations of second order|first1=David|last1=Gilbarg|authorlink1=
*{{Citation | last1=Marcinkiewicz | first1=J. | title=Sur l'interpolation d'operations | year=1939 |url=https://gallica.bnf.fr/ark:/12148/bpt6k6238835z/f16.item#| journal=C. R. Acad.
* {{citation|title=Introduction to Fourier analysis on Euclidean spaces|first1=Elias|last1=Stein|authorlink1=Elias Stein|first2=Guido|last2=Weiss|publisher=Princeton University Press|year=1971|isbn=0-691-08078-X|url-access=registration|url=https://archive.org/details/introductiontofo0000stei}}.
*{{Citation | last1=Zygmund | first1=A. | title=On a theorem of Marcinkiewicz concerning interpolation of operations |mr=0080887 | year=1956 | journal=[[Journal de Mathématiques Pures et Appliquées]]|series= Neuvième Série | issn=0021-7824 | volume=35 | pages=223–248}}
{{Lp spaces}}
{{Functional analysis}}
[[Category:Fourier analysis]]
[[Category:Theorems in functional analysis]]
[[Category:Lp spaces]]
| |||