We describe an algorithm to simulate time evolution using the multiscale entanglement renormalization ansatz and test it by studying a critical Ising chain with periodic boundary conditions and with up to L approximate to 10(6) quantum spins. The cost of a simulation, which scales as L log(2)(L), is reduced to log(2)(L) when the system is invariant under translations. By simulating an evolution in imaginary time, we compute the ground state of the system. The errors in the g ound-state energy display no evident dependence on the system size. The algorithm can be extended to lattice systems in higher spatial dimensions.
Simulation of time evolution with multiscale entanglement renormalization ansatz
Montangero S;
2008
Abstract
We describe an algorithm to simulate time evolution using the multiscale entanglement renormalization ansatz and test it by studying a critical Ising chain with periodic boundary conditions and with up to L approximate to 10(6) quantum spins. The cost of a simulation, which scales as L log(2)(L), is reduced to log(2)(L) when the system is invariant under translations. By simulating an evolution in imaginary time, we compute the ground state of the system. The errors in the g ound-state energy display no evident dependence on the system size. The algorithm can be extended to lattice systems in higher spatial dimensions.File in questo prodotto:
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