Majorana Scars as Group Singlets
- URL: http://arxiv.org/abs/2212.11914v3
- Date: Wed, 6 Dec 2023 16:05:52 GMT
- Title: Majorana Scars as Group Singlets
- Authors: Z. Sun, F.K. Popov, I.R. Klebanov, K. Pakrouski
- Abstract summary: In some quantum many-body systems, the Hilbert space breaks up into a large ergodic sector and a much smaller scar subspace.
Here we apply this idea to lattice systems containing $M$ Majorana fermions per site.
We derive the dimension of each scar family and show the scars could have a large contribution to the density of states for small $N$.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: In some quantum many-body systems, the Hilbert space breaks up into a large
ergodic sector and a much smaller scar subspace. It has been suggested
[arXiv:2007.00845] that the two sectors may be distinguished by their
transformation properties under a large group whose rank grows with the system
size (it is not a symmetry of the Hamiltonian). The quantum many-body scars are
invariant under this group, while all other states are not. Here we apply this
idea to lattice systems containing $M$ Majorana fermions per site. The Hilbert
space for $N$ sites may be decomposed under the action of the
O$(N)\times$O$(M)$ group, and the scars are the SO$(N)$ singlets. For any even
$M$ there are two families of scars. One of them, which we call the $\eta$
states, is symmetric under the group O$(N)$. The other, the $\zeta$ states, has
the SO$(N)$ invariance. For $M=4$, where our construction reduces to spin-$1/2$
fermions on a lattice with local interactions, the former family are the $N+1$
$\eta$-pairing states, while the latter are the $N+1$ states of maximum spin.
We generalize this construction to $M>4$. For $M=6$ we exhibit explicit
formulae for the scar states and use them to calculate the bipartite
entanglement entropy analytically. For large $N$, it grows logarithmically with
the sub-system size. We present a general argument that any group-invariant
scars should have the entanglement entropy that is parametrically smaller than
that of typical states. The energies of the scars we find are not equidistant
in general but can be made so by choosing Hamiltonian parameters. For $M>6$ we
find that with local Hamiltonians the scars typically have certain
degeneracies. The scar spectrum can be made ergodic by adding a non-local
interaction term. We derive the dimension of each scar family and show the
scars could have a large contribution to the density of states for small $N$.
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