Finite automata for caching in matrix product algorithms

A diagram is introduced for visualizing matrix product states which makes transparent a connection between matrix product factorizations of states and operators, and complex weighted finite state automata. It is then shown how one can proceed in the opposite direction: writing an automaton that ``generates'' an operator gives one an immediate matrix product factorization of it. Matrix product factorizations have the advantage of reducing the cost of computing expectation values by facilitating caching of intermediate calculations. Thus our connection to complex weighted finite state automata yields insight into what allows for efficient caching in matrix product algorithms. Finally, these techniques are generalized to the case of multiple dimensions.

[1]  José Ignacio Latorre,et al.  Image compression and entanglement , 2005, ArXiv.

[2]  White,et al.  Real-space quantum renormalization groups. , 1992, Physical review letters.

[3]  D Porras,et al.  Density matrix renormalization group and periodic boundary conditions: a quantum information perspective. , 2004, Physical review letters.

[4]  F. Verstraete,et al.  Matrix product density operators: simulation of finite-temperature and dissipative systems. , 2004, Physical review letters.

[5]  S. Rommer,et al.  CLASS OF ANSATZ WAVE FUNCTIONS FOR ONE-DIMENSIONAL SPIN SYSTEMS AND THEIR RELATION TO THE DENSITY MATRIX RENORMALIZATION GROUP , 1997 .

[6]  Jan van Leeuwen,et al.  Foundations of computer science II , 1976 .

[7]  I. McCulloch From density-matrix renormalization group to matrix product states , 2007, cond-mat/0701428.

[8]  J. I. Cirac,et al.  Variational study of hard-core bosons in a two-dimensional optical lattice using projected entangled pair states , 2007 .

[9]  A. Karimi,et al.  Master‟s thesis , 2011 .

[10]  F. Verstraete,et al.  Computational complexity of projected entangled pair states. , 2007, Physical review letters.

[11]  F. Verstraete,et al.  Matrix product states represent ground states faithfully , 2005, cond-mat/0505140.

[12]  Computational difficulty of global variations in the density matrix renormalization group. , 2006, Physical review letters.

[13]  U. Schollwoeck The density-matrix renormalization group , 2004, cond-mat/0409292.