Principle of Maximum Entropy and Ground Spaces of Local Hamiltonians
arXiv:1010.2739
Abstract
The structure of the ground spaces of quantum systems consisting of local interactions is of fundamental importance to different areas of physics. In this Letter, we present a necessary and sufficient condition for a subspace to be the ground space of a k-local Hamiltonian. Our analysis are motivated by the concept of irreducible correlations studied by [Linden et al., PRL 89, 277906] and [Zhou, PRL 101, 180505], which is in turn based on the principle of maximum entropy. It establishes a better understanding of the ground spaces of local Hamiltonians and builds an intimate link of ground spaces to the correlations of quantum states.
This paper has been withdrawn by the author due to a crucial error in proof of "only if" part. We explain this problem in detail in arXiv:1205.3682