Processor core model for quantum computing.

We describe an architecture based on a processing "core," where multiple qubits interact perpetually, and a separate "store," where qubits exist in isolation. Computation consists of single qubit operations, swaps between the store and the core, and free evolution of the core. This enables computation using physical systems where the entangling interactions are "always on." Alternatively, for switchable systems, our model constitutes a prescription for optimizing many-qubit gates. We discuss implementations of the quantum Fourier transform, Hamiltonian simulation, and quantum error correction.

[1]  Man-Hong Yung,et al.  Perfect state transfer, effective gates, and entanglement generation in engineered bosonic and fermionic networks , 2005 .

[2]  Simon C Benjamin,et al.  Quantum computing with an always-on Heisenberg interaction. , 2002, Physical review letters.

[3]  Robert Raussendorf Quantum computation via translation-invariant operations on a chain of qubits , 2005 .

[4]  Matthias Christandl,et al.  Mirror inversion of quantum states in linear registers. , 2004, Physical review letters.

[5]  Guang-Can Guo,et al.  Quantum computation with untunable couplings. , 2002, Physical review letters.

[6]  B. Parlett The Symmetric Eigenvalue Problem , 1981 .

[7]  C. Moura Alves,et al.  Efficient generation of graph states for quantum computation , 2005 .

[8]  Matthias Christandl,et al.  Perfect state transfer in quantum spin networks. , 2004, Physical review letters.

[9]  Joachim Stolze,et al.  Spin chains as perfect quantum state mirrors , 2005 .

[10]  D. D. Awschalom,et al.  Quantum information processing using quantum dot spins and cavity QED , 1999 .

[11]  M L Glasser,et al.  Indirect interaction of solid-state qubits via two-dimensional electron gas. , 2001, Physical review letters.

[12]  B. E. Kane A silicon-based nuclear spin quantum computer , 1998, Nature.

[13]  C. P. Sun,et al.  Quantum-state transfer via the ferromagnetic chain in a spatially modulated field , 2005 .

[14]  Thierry Paul,et al.  Quantum computation and quantum information , 2007, Mathematical Structures in Computer Science.