Higher Berry curvature via iMPS on a 4D Chern insulator model produces DDKS numbers whose phase diagram is exactly congruent to the analytic second Chern number phase diagram.
Textured phase diagrams of featureless insulators
2 Pith papers cite this work. Polarity classification is still indexing.
abstract
We study phase diagrams of charge-conserving `class A' non-interacting fermions, focusing on the trivial phase in various dimensions. Such phases are usually termed `featureless' to distinguish them from those others with either symmetry-broken or topological order. We show that the presence of non-trivial topological families of states, including charge pumps and their generalizations, results in phase diagrams being endowed with non-trivial topological textures that can be visualized through Berry phases and their higher-dimensional generalizations. We show that for non-interacting fermion systems with translation invariance, these `higher' Berry phases can be computed using integrals of non-abelian Chern-Simons forms of the Berry-Bloch connection over momentum and parameter spaces. Singularities in these textures correspond to gap-closing loci of `diabolical points', which represent the obstruction to contracting topologically non-trivial families of states, and bulk-boundary correspondence results in a locus of robust boundary modes that terminate at the bulk diabolical points. In the presence of finite chemical potential, we argue that the edge modes are generically robust without any need for fine-tuning for two and higher dimensions, whereas in one dimension they are `estranged' in the phase diagram, i.e. appearing at different parameter values for different edges. We demonstrate our results by constructing several microscopic models of non-interacting fermions. We argue stability to interactions and explore proximate phase diagrams by mapping to continuum field theories.
fields
cond-mat.str-el 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
Diabolical textures from spatially embedded Thouless pumps yield distinct gapped states separated by trap-scaling critical points that terminate into unnecessary critical surfaces when the texture varies rapidly, with a classification framework based on Kitaev's Ω spectrum conjecture.
citing papers explorer
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Higher Berry curvature, second Chern numbers and magnetoelectric coupling in crystalline insulators
Higher Berry curvature via iMPS on a 4D Chern insulator model produces DDKS numbers whose phase diagram is exactly congruent to the analytic second Chern number phase diagram.
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Topological Phenomena Protected by Diabolical Textures
Diabolical textures from spatially embedded Thouless pumps yield distinct gapped states separated by trap-scaling critical points that terminate into unnecessary critical surfaces when the texture varies rapidly, with a classification framework based on Kitaev's Ω spectrum conjecture.