2006 APS March Meeting
Monday–Friday, March 13–17, 2006;
Baltimore, MD
Session G33: GSNP Student Award Session and Glasses
8:00 AM–10:48 AM,
Tuesday, March 14, 2006
Baltimore Convention Center
Room: 336
Sponsoring
Unit:
GSNP
Chair: Narayanan Menon, University of Massachusetts, Amherst
Abstract ID: BAPS.2006.MAR.G33.4
Abstract: G33.00004 : Universal Impedance, Admittance and Scattering Fluctuations in Quantum-chaotic Systems
8:36 AM–8:48 AM
Preview Abstract
Abstract
Author:
Sameer Hemmady
(University of Maryland)
We experimentally investigate fluctuations in the eigenvalues of
the impedance, admittance and scattering matrices of wave chaotic
systems using a microwave analog of a quantum chaotic infinite
square well potential. We consider a 2-D, time-reversal symmetric
chaotic microwave resonator driven by two non-ideally coupled
ports. The system-specific coupling effects are removed using the
measured radiation impedance matrix
($\mathord{\buildrel{\lower3pt\hbox{$\scriptscriptstyle\leftrightarrow$}}\over
{Z}} _{Rad} )$ [1] of the two ports. A normalized impedance
matrix
($\mathord{\buildrel{\lower3pt\hbox{$\scriptscriptstyle\leftrightarrow$}}\over
{z}} )$ is thus obtained, and the Probability Density Function
(PDF) of its eigenvalues is predicted to be universal depending
only on the cavity loss. We observe remarkable agreement between
the statistical properties of
$\mathord{\buildrel{\lower3pt\hbox{$\scriptscriptstyle\leftrightarrow$}}\over
{z}} $ and
$\mathord{\buildrel{\lower3pt\hbox{$\scriptscriptstyle\leftrightarrow$}}\over
{y}}
=\mathord{\buildrel{\lower3pt\hbox{$\scriptscriptstyle\leftrightarrow$}}\over
{z}} ^{-1}$ for all degrees of loss, which is in accordance with
[1, 2] and Random Matrix Theory (RMT). We compare the joint PDF
of the eigenphases of the normalized scattering matrix
($\mathord{\buildrel{\lower3pt\hbox{$\scriptscriptstyle\leftrightarrow$}}\over
{s}} )$ with that obtained from RMT for varying degrees of loss.
We study the joint PDF of the eigenvalues of
$\mathord{\buildrel{\lower3pt\hbox{$\scriptscriptstyle\leftrightarrow$}}\over
{s}}
\mathord{\buildrel{\lower3pt\hbox{$\scriptscriptstyle\leftrightarrow$}}\over
{s}} ^{\dag }$ and find good agreement with [3]. [1] X. Zheng,
\textit{et al.,} -- Electromagnetics (in press); condmat/0408317;
S. Hemmady, \textit{et al}., Phys. Rev. Lett. \textbf{94}, 014102
(2005).[2] Y. V. Fyodorov, \textit{et al.},-- condmat/0507016.[3]
P. W. Brouwer and C. W. J Beenakker -- PRB \textbf{55}, 4695
(1997). Work supported by DOD MURI AFOSR Grant F496200110374,
DURIP Grants FA95500410295 and FA95500510240.
To cite this abstract, use the following reference: http://meetings.aps.org/link/BAPS.2006.MAR.G33.4