Provides uniform local laws and localization analysis for the general Rosenzweig-Porter model H = H0 + λW, generalizing previous results on deformed Wigner matrices.
The wishart–rosenzweig–porter random matrix ensemble
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
years
2026 2verdicts
UNVERDICTED 2representative citing papers
Cavity method on weighted ER graphs yields LDoS distribution with power-law tails of exponent 3, weakly multifractal extended eigenvectors, and logarithmic IPR scaling.
citing papers explorer
-
On a Rosenzweig-Porter-type model
Provides uniform local laws and localization analysis for the general Rosenzweig-Porter model H = H0 + λW, generalizing previous results on deformed Wigner matrices.
-
Local density of states distribution and multifractal eigenvectors of weighted random networks via the cavity approach
Cavity method on weighted ER graphs yields LDoS distribution with power-law tails of exponent 3, weakly multifractal extended eigenvectors, and logarithmic IPR scaling.