Fluctuations and scaling of inverse participation ratios in random binary resonant composites
Abstract
We study the statistics of local field distribution solved by the Green's-function formalism (GFF) [Y. Gu et al., Phys. Rev. B 59 12847 (1999)] in the disordered binary resonant composites. For a percolating network, the inverse participation ratios (IPR) with q=2 are illustrated, as well as the typical local field distributions of localized and extended states. Numerical calculations indicate that for a definite fraction p the distribution function of IPR Pq has a scale invariant form. It is also shown the scaling behavior of the ensemble averaged <Pq> described by the fractal dimension Dq. To relate the eigenvectors correlations to resonance level statistics, the axial symmetry between D2 and the spectral compressibility is obtained.
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