Develops a quantum-percolation DPC metric that ranks critical areas in transport networks by continuous propagation loss, applied to Sioux Falls and post-Irma Florida networks where it differs from classical percolation and other centrality measures.
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Interactions and quasiperiodic driving in the Lieb-Liniger kicked-boson model generate synthetic dimensions that realize Anderson localization and its critical behavior in up to four effective dimensions.
Coupling a skin-localized non-Hermitian chain to a delocalized chain induces a pseudo mobility edge in complex energy that separates localized and extended states, with a quantized winding number characterizing transitions under mixed boundary conditions.
Pedagogical review of the cavity equations, order parameter, and critical behavior for Anderson localization on the Bethe lattice.
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Quantum percolation based dynamic propagation connectivity for critical-area identification in transport networks
Develops a quantum-percolation DPC metric that ranks critical areas in transport networks by continuous propagation loss, applied to Sioux Falls and post-Irma Florida networks where it differs from classical percolation and other centrality measures.
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Engineering Anderson Localization in Arbitrary Dimensions with Interacting Quasiperiodic Kicked Bosons
Interactions and quasiperiodic driving in the Lieb-Liniger kicked-boson model generate synthetic dimensions that realize Anderson localization and its critical behavior in up to four effective dimensions.
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Non-Hermitian pseudo mobility edge in a coupled chain system
Coupling a skin-localized non-Hermitian chain to a delocalized chain induces a pseudo mobility edge in complex energy that separates localized and extended states, with a quantized winding number characterizing transitions under mixed boundary conditions.
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Anderson localization on the Bethe lattice
Pedagogical review of the cavity equations, order parameter, and critical behavior for Anderson localization on the Bethe lattice.