Vibrational excitations in systems with correlated disorder

Physics – Condensed Matter – Disordered Systems and Neural Networks

Scientific paper

Rate now

  [ 0.00 ] – not rated yet Voters 0   Comments 0

Details

5 pages, 3 figures, to be published in physica status solidi (c) March 2008

Scientific paper

We investigate a $d$-dimensional model ($d$ = 2,3) for sound waves in a disordered environment, in which the local fluctuations of the elastic modulus are spatially correlated with a certain correlation length. The model is solved analytically by means of a field-theoretical effective-medium theory (self-consistent Born approximation) and numerically on a square lattice. As in the uncorrelated case the theory predicts an enhancement of the density of states over Debye's $\omega^{d-1}$ law (``boson peak'') as a result of disorder. This anomay becomes reinforced for increasing correlation length $\xi$. The theory predicts that $\xi$ times the width of the Brillouin line should be a universal function of $\xi$ times the wavenumber. Such a scaling is found in the 2d simulation data, so that they can be represented in a universal plot. In the low-wavenumber regime, where the lattice structure is irrelevant there is excellent agreement between the simulation at small disorder. At larger disorder the continuum theory deviates from the lattice simulation data. It is argued that this is due to an instability of the model with stronger disorder.

No associations

LandOfFree

Say what you really think

Search LandOfFree.com for scientists and scientific papers. Rate them and share your experience with other people.

Rating

Vibrational excitations in systems with correlated disorder does not yet have a rating. At this time, there are no reviews or comments for this scientific paper.

If you have personal experience with Vibrational excitations in systems with correlated disorder, we encourage you to share that experience with our LandOfFree.com community. Your opinion is very important and Vibrational excitations in systems with correlated disorder will most certainly appreciate the feedback.

Rate now

     

Profile ID: LFWR-SCP-O-377970

  Search
All data on this website is collected from public sources. Our data reflects the most accurate information available at the time of publication.