551 research outputs found
Tutorial on the Quantikz Package
This tutorial introduces (and provides, via the document source) the Quantikz
LaTeX package for typesetting quantum circuit diagrams. This takes advantage of
tikz to give greater control over the circuit options. Those familiar with the
excellent QCircuit package will recognise much of the notation, although it has
evolved a bit (hopefully simplified!).Comment: 15 pages, with many exquisite quantum circuits. Corresponding to
version 0.9.6 of quantik
The Capabilities of a Perturbed Toric Code as a Quantum Memory
We analyze the effect of typical, unknown perturbations on the 2D toric code
when acting as a quantum memory, incorporating the effects of error correction
on read-out. By transforming the system into a 1D transverse Ising model
undergoing an instantaneous quench, and making extensive use of Lieb-Robinson
bounds, we prove that for a large class of perturbations, the survival time of
stored information grows at least logarithmically with the system size. A
uniform magnetic field saturates this scaling behavior. We show that
randomizing the stabilizer strengths gives a polynomial survival time with a
degree that depends on the strength of the perturbation.Comment: 4 and a bit pages, 3 figures v3: Published versio
Arboreal Bound Entanglement
In this paper, we discuss the entanglement properties of graph-diagonal
states, with particular emphasis on calculating the threshold for the
transition between the presence and absence of entanglement (i.e. the
separability point). Special consideration is made of the thermal states of
trees, including the linear cluster state. We characterise the type of
entanglement present, and describe the optimal entanglement witnesses and their
implementation on a quantum computer, up to an additive approximation. In the
case of general graphs, we invoke a relation with the partition function of the
classical Ising model, thereby intimating a connection to computational
complexity theoretic tasks. Finally, we show that the entanglement is robust to
some classes of local perturbations.Comment: 9 pages + appendices, 3 figure
The Non-Equilibrium Reliability of Quantum Memories
The ability to store quantum information without recourse to constant
feedback processes would yield a significant advantage for future
implementations of quantum information processing. In this paper, limitations
of the prototypical model, the Toric code in two dimensions, are elucidated
along with a sufficient condition for overcoming these limitations.
Specifically, the interplay between Hamiltonian perturbations and dynamically
occurring noise is considered as a system in its ground state is brought into
contact with a thermal reservoir. This proves that when utilizing the Toric
code on N^2 qubits in a 2D lattice as a quantum memory, the information cannot
be stored for a time O(N). In contrast, the 2D Ising model protects classical
information against the described noise model for exponentially long times. The
results also have implications for the robustness of braiding operations in
topological quantum computation.Comment: 4 pages. v3: published versio
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