Ground-State Spaces of Frustration-Free Hamiltonians
arXiv:1112.0762 · doi:10.1063/1.4748527
Abstract
We study the ground-state space properties for frustration-free Hamiltonians. We introduce a concept of `reduced spaces' to characterize local structures of ground-state spaces. For a many-body system, we characterize mathematical structures for the set $Î_k$ of all the $k$-particle reduced spaces, which with a binary operation called join forms a semilattice that can be interpreted as an abstract convex structure. The smallest nonzero elements in $Î_k$, called atoms, are analogs of extreme points. We study the properties of atoms in $Î_k$ and discuss its relationship with ground states of $k$-local frustration-free Hamiltonians. For spin-1/2 systems, we show that all the atoms in $Î_2$ are unique ground states of some 2-local frustration-free Hamiltonians. Moreover, we show that the elements in $Î_k$ may not be the join of atoms, indicating a richer structure for $Î_k$ beyond the convex structure. Our study of $Î_k$ deepens the understanding of ground-state space properties for frustration-free Hamiltonians, from a new angle of reduced spaces.
23 pages, no figure