Schur test

In Mathematical Analysis,the Schur Test (named after German mathematician Issai Schur)is the name for the bound on the $L^2 o L^2$ operator normof an integral operator in terms of its Schwartz kernel(see Schwartz kernel theorem).

The following result of Issai Schuris described in [Paul Richard Halmos and Viakalathur Shankar Sunder (1978)."Bounded integral operators on $L^{2}$ spaces",Ergebnisse der Mathematik und ihrer Grenzgebiete (Results in Mathematics and Related Areas), vol. 96.Springer-Verlag, Berlin, 1978.Theorem 5.2.] . Let "X" and "Y" be two measurable spaces (such as $mathbb{R}^n$ , or see Measurable space), and let "T" be an integral operator with the non-negative Schwartz kernel $K(x,y)$ , $xin X$ , $yin Y$ :

: $T f(x)=int_Y K(x,y)f(y),dy.$

If there exist functions $p(x)>0$ and $q(x)>0$ and numbers $alpha>0$ , $eta>0$ such that

: $(1)qquadint_Y K(x,y)q(y),dylealpha p(x)$ for almost all "x", and: $(2)qquadint_X p(x)K(x,y),dxleeta q(y)$ for almost all "y",then "T" is continuous from $L^2(Y)$ to $L^2(X)$ ,with the norm bounded by

: $Vert TVert_{L^2 o L^2}lesqrt{alphaeta}.$

Such functions $p(x)$ , $q(x)$ are called the Schur test functions.

The original result appeared in [I. Schur (1911)."Bemerkungen zur Theorie der Beschränkten Bilinearformenmit unendlich vielen Veränderlichen",J. reine angew. Math. 140 (1911), 1-28.] for "T" a matrix and with $alpha=eta=1$ .

Usage

The most common usage is to take $p(x)=q(x)=1.$ Then we get:

: $Vert TVert^2_{L^2 o L^2}lesup_{xin X}int_Y|K(x,y)|dycdotsup_{yin Y}int_X|K(x,y)|dx.$ This inequality is sometimes called the Schur inequalityor Young's inequality.It is valid no matter whether the Schwartz kernel $K(x,y)$ is non-negative or not.

Proof

Using the Cauchy-Schwarz inequality andthe inequality (1),we get:

: $TF(x)|^2=left|int_Y K(x,y)f(y),dy
ight|^2leint_Y K(x,y)q(y),dyint_Y frac{K(x,y)f(y)^2}{q(y)} dylealpha p(x)int_Y frac{K(x,y)f(y)^2}{q(y)}dy.$

Integrating the above relation in $x$ ,using Fubini's Theorem,and applying the inequality (2),we get:

: $Vert T fVert_{L^2}^2lealphaint_YBig [int_X p(x)K(x,y),dxBig] frac{f(y)^2}{q(y)}dylealphaetaint_Y f(y)^2 dy=alphaetaVert fVert_{L^2}^2.$

It follows that $Vert T fVert_{L^2}lesqrt{alphaeta}Vert fVert_{L^2}$ for any $fin L^2(Y)$ .

References

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