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Quantum Criticality in Topological Insulators and Superconductors: Emergence of Strongly Coupled Majoranas and Supersymmetry

2 Pith papers cite this work. Polarity classification is still indexing.

2 Pith papers citing it
abstract

We study symmetry breaking quantum phase transitions in topological insulators and superconductors where the single electron gap remains open in the bulk. Specifically, we consider spontaneous breaking of the symmetry that protects the gapless boundary modes, so that in the ordered phase these modes are gapped. Here we determine the fate of the topological boundary modes right at the transition where they are coupled to the strongly fluctuating order parameter field. Using a combination of exact solutions and renormalization group techniques, we find that the surface fermionic modes either decouple from the bulk fluctuations, or flow to a strongly coupled fixed point which remains gapless. In addition, we study transitions where the critical fluctuations are confined only to the surface and find that in several cases the critical point is naturally supersymmetric. This allows a determination of critical exponents and points to an underlying connection between band topology and supersymmetry. Finally, we study the fate of gapless Majorana modes localized on point and line defects in topological superconductors at bulk criticality, which is analogous to a quantum impurity problem. Again, an interplay of topology and strong correlations causes these modes to remain gapless but in a strongly coupled state. Experimental candidates for realizing these phenomena are discussed.

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2026 2

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UNVERDICTED 2

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Deconfined Boundary Phase Transition of a Quantum Critical Heisenberg Model

cond-mat.str-el · 2026-05-18 · unverdicted · novelty 7.0

Quantum Monte Carlo simulations locate a continuous boundary phase transition at Q_c=0.310(11) from AF to VBS order in a quantum critical Heisenberg model with dangling chain, yielding exponents y_s=0.81(4), Δ_s=0.660(15), Δ_v=0.204(14).

Supersymmetric quantum criticality with discrete symmetry

cond-mat.str-el · 2026-05-30 · unverdicted · novelty 6.0

FRG analysis of Z_n-anisotropic Gross-Neveu-Yukawa theories shows irrelevant anisotropy for n>3 yielding N=2 supersymmetric criticality and a second length scale whose exponent satisfies ν'/ν = 1 + |y_n|/2.

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  • Deconfined Boundary Phase Transition of a Quantum Critical Heisenberg Model cond-mat.str-el · 2026-05-18 · unverdicted · none · ref 25 · internal anchor

    Quantum Monte Carlo simulations locate a continuous boundary phase transition at Q_c=0.310(11) from AF to VBS order in a quantum critical Heisenberg model with dangling chain, yielding exponents y_s=0.81(4), Δ_s=0.660(15), Δ_v=0.204(14).

  • Supersymmetric quantum criticality with discrete symmetry cond-mat.str-el · 2026-05-30 · unverdicted · none · ref 18 · internal anchor

    FRG analysis of Z_n-anisotropic Gross-Neveu-Yukawa theories shows irrelevant anisotropy for n>3 yielding N=2 supersymmetric criticality and a second length scale whose exponent satisfies ν'/ν = 1 + |y_n|/2.