Add to ORKGmany Abstract: For every Matrix Product State (MPS) one can always construct a so-called parent Hamiltonian. This is a local, frustration free, Hamiltonian which has the MPS as ground state and is gapped. Whenever that parent Hamiltonian has a degenerate ground state (the so-called non-injective case), we construct another ’uncle ’ Hamiltonian which is local and frustration free but gapless, and its spectrum is R+. The construction is obtained by linearly perturbing the matrices building up the state in a random direction, and then taking the limit where the perturbation goes to zero. For MPS where the parent Hamiltonian has a unique ground state (the so-called injective case) we also build such uncle Hamiltonian with the same properties in...
A broad range of quantum optimization problems can be phrased as the question of whether a specific ...
We show how to construct relevant families of matrix product operators (MPOs) in one and higher dime...
Traditional quantum physics solves ground states for a given Hamiltonian, while quantum information ...
For every Matrix Product State (MPS) one can always construct a so-called parent Hamiltonian. This i...
We determine the computational difficulty of finding ground states of one-dimensional (1D) Hamiltoni...
This work gives a detailed investigation of matrix product state (TOPS) representations for pure mul...
This work gives a detailed investigation of matrix product state (MPS) representations for multipart...
The local Hamiltonian problem consists of estimating the ground-state energy (given by the minimum e...
textabstractA frustration-free local Hamiltonian has the property that its ground state minimises th...
Given a local gapped Hamiltonian with a global symmetry on a one-dimensional lattice we describe a m...
We use the matrix product formalism to find exact ground states of two new spin-1 quantum chains wit...
We study Hamiltonians which have Kitaev’s toric code as a ground state, and show how to construct a ...
By using a recently proposed probabilistic approach, we determine the exact ground state of a class ...
We apply classical algorithms for approximately solving constraint satisfaction problems to find bou...
We show that for any many-body quantum state there exists an unentangled quantum state such that mos...
A broad range of quantum optimization problems can be phrased as the question of whether a specific ...
We show how to construct relevant families of matrix product operators (MPOs) in one and higher dime...
Traditional quantum physics solves ground states for a given Hamiltonian, while quantum information ...
For every Matrix Product State (MPS) one can always construct a so-called parent Hamiltonian. This i...
We determine the computational difficulty of finding ground states of one-dimensional (1D) Hamiltoni...
This work gives a detailed investigation of matrix product state (TOPS) representations for pure mul...
This work gives a detailed investigation of matrix product state (MPS) representations for multipart...
The local Hamiltonian problem consists of estimating the ground-state energy (given by the minimum e...
textabstractA frustration-free local Hamiltonian has the property that its ground state minimises th...
Given a local gapped Hamiltonian with a global symmetry on a one-dimensional lattice we describe a m...
We use the matrix product formalism to find exact ground states of two new spin-1 quantum chains wit...
We study Hamiltonians which have Kitaev’s toric code as a ground state, and show how to construct a ...
By using a recently proposed probabilistic approach, we determine the exact ground state of a class ...
We apply classical algorithms for approximately solving constraint satisfaction problems to find bou...
We show that for any many-body quantum state there exists an unentangled quantum state such that mos...
A broad range of quantum optimization problems can be phrased as the question of whether a specific ...
We show how to construct relevant families of matrix product operators (MPOs) in one and higher dime...
Traditional quantum physics solves ground states for a given Hamiltonian, while quantum information ...