Spectrum1_2_4.zip
The zero temperature spectrum of elementary excitations (and Fermi energy of solitons in the condensed phase) $\epsilon^{(m)}_j(0)$ obtained from the numerical solution of (\ref{so5_dressedeinteq}) for $p_0=2+1/4$ as a function of the field $H_1$ with fixed $H_2=0$. Once the gap of $[1,0]$-solitons closes the system forms a collective state of these objects. In this phase the degeneracy of the auxiliary modes is lifted. In the limit $zH_1\gg M_0$ the gap of $[1,1]$-solitons (with charges $(1/2,1)$ and $(1/2,0)$) closes as well.
Cite this as
Daniel Borcherding, Holger Frahm (2019). Dataset: Condensates of SO(5)_N anyons. Resource: Spectrum1_2_4.zip. https://doi.org/10.25835/0007088
DOI retrieved: June 25, 2019
Additional Information
Field | Value |
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Created | unknown |
Last updated | October 14, 2021 |
Format | application/zip |