Whitney-Mikhlin Extension Constants

N.B. A detailed on-line essay by S. Finch was the starting point for this entry.

Let be the -D closed Ball of Radius centered at the Origin. A function which is defined on is called an extension to of a function defined on if

$\begin{displaymath} F(x)=f(x)\forall\ x\in B(1). \end{displaymath}$

(1)

Given 2 Banach Spaces of functions defined on

and

, find the extension operator from one to the other of minimal norm. Mikhlin (1986) found the best constants $\chi$ such that this condition, corresponding to the Sobolev

integral norm, is satisfied,

$\sqrt{\int_{B(1)} \left[{[f(x)]^2+\sum_{j=1}^n\left({\partial f\over\partial x_j}\right)^2}\right]\,dx}$
$\leq \chi \sqrt{\int_{B(r)} \left[{[F(x)]^2+\sum_{j=1}^n\left({\partial F\over\partial x_j}\right)^2}\right]\,dx}\,.\quad$	(2)

$\chi(1,r)=1$ . Let

$\begin{displaymath} \nu={\textstyle{1\over 2}}(n-2), \end{displaymath}$

(3)

then for

$\begin{displaymath} \chi(n,r)=\sqrt{1+{I_\nu(1)\over I_{\nu+1}(1)}{I_\nu(r)K_{\n... ...K_\nu(r)I_{\nu+1}(1)\over I_\nu(r)K_\nu(1)-K_\nu(r)I_\nu(1)}}, \end{displaymath}$

(4)

where $I_\nu(z)$ is a Modified Bessel Function of the First Kind and $K_\nu(z)$ is a Modified Bessel Function of the Second Kind. For

$\chi(2,r)=\max\left\{{\sqrt{1+{I_\nu(1)\over I_{\nu+1}(1)}{I_\nu(r)K_{\nu+1}(1)+K_\nu(r)I_{\nu+1}(1)\over I_\nu(r)K_\nu(1)-K_\nu(r)I_\nu(1)}},}\right.$

$\left.{\sqrt{1+{I_1(1)\over I_1(1)+I_2(1)}\left[{1+{I_1(r)K_0(1)+K_1(r)I_0(1)\over I_1(r)K_1(1)-K_1(r)I_1(1)}}\right]}}\right\}.\quad$ (5)

For $r\to\infty$ ,

$\begin{displaymath} \chi(n,\infty)=\sqrt{1+{I_\nu(1)\over I_{\nu+1}(1)}{K_\nu(1)\over K_\nu(1)}}, \end{displaymath}$

(6)

which is bounded by

$\begin{displaymath} n-1<\chi(n,\infty)<\sqrt{(n-1)^2+4}. \end{displaymath}$

(7)

For Odd

, the Recurrence Relations

$\displaystyle a_{k+1}$	$\textstyle =$	$\displaystyle a_{k-1}-(2k-1)a_k$	(8)
$\displaystyle b_{k+1}$	$\textstyle =$	$\displaystyle b_{k-1}+(2k-1)b_k$	(9)

with

$\displaystyle a_0$	$\textstyle =$	$\displaystyle e+e^{-1}$	(10)
$\displaystyle a_1$	$\textstyle =$	$\displaystyle e-e^{-1}$	(11)
$\displaystyle b_0$	$\textstyle =$	$\displaystyle e^{-1}$	(12)
$\displaystyle b_1$	$\textstyle =$	$\displaystyle e^{-1}$	(13)

where e is the constant 2.71828..., give

$\begin{displaymath} \chi(2k+1,\infty)=\sqrt{1+{a_k\over a_{k+1}}{b_{k+1}\over b_k}}. \end{displaymath}$

(14)

The first few are

$\displaystyle \chi(3,\infty)$	$\textstyle =$	$\displaystyle e$	(15)
$\displaystyle \chi(5,\infty)$	$\textstyle =$	$\displaystyle \sqrt{e^2\over e^2-7}$	(16)
$\displaystyle \chi(7,\infty)$	$\textstyle =$	$\displaystyle \sqrt{2\over 7}\sqrt{e^2\over 37-5e^2}$	(17)
$\displaystyle \chi(9,\infty)$	$\textstyle =$	$\displaystyle {1\over\sqrt{37}}\sqrt{e^2\over 18e^2-133}$	(18)
$\displaystyle \chi(11,\infty)$	$\textstyle =$	$\displaystyle {1\over\sqrt{133}}\sqrt{e^2\over 2431-329e^2}$	(19)
$\displaystyle \chi(13,\infty)$	$\textstyle =$	$\displaystyle \sqrt{2\over 2431}\sqrt{e^2\over 3655e^2-27007}.$	(20)

Similar formulas can be given for even

in terms of

References

Finch, S. ``Favorite Mathematical Constants.'' http://www.mathsoft.com/asolve/constant/mkhln/mkhln.html

Mikhlin, S. G. Constants in Some Inequalities of Analysis. New York: Wiley, 1986.

$\chi(2,r)=\max\left\{{\sqrt{1+{I_\nu(1)\over I_{\nu+1}(1)}{I_\nu(r)K_{\nu+1}(1)+K_\nu(r)I_{\nu+1}(1)\over I_\nu(r)K_\nu(1)-K_\nu(r)I_\nu(1)}},}\right.$
$\left.{\sqrt{1+{I_1(1)\over I_1(1)+I_2(1)}\left[{1+{I_1(r)K_0(1)+K_1(r)I_0(1)\over I_1(r)K_1(1)-K_1(r)I_1(1)}}\right]}}\right\}.\quad$	(5)