How to sum and exponentiate Hamiltonians in ZXW calculus
TLDR
In this article , the authors develop practical summation techniques in ZXW calculus to reason about quantum dynamics, such as unitary time evolution, and demonstrate the linearity of the Schr¨odinger equation and give a diagrammatic representation of the Hamiltonian in Greene-Diniz et al.Abstract:
This paper develops practical summation techniques in ZXW calculus to reason about quantum dynamics, such as unitary time evolution. First we give a direct representation of a wide class of sums of linear operators, including arbitrary qubits Hamiltonians, in ZXW calculus. As an application, we demonstrate the linearity of the Schr¨odinger equation and give a diagrammatic representation of the Hamiltonian in Greene-Diniz et al [14], which is the first paper that models carbon capture using quantum computing. We then use the Cayley-Hamilton theorem to show in principle how to exponentiate arbitrary qubits Hamiltonians in ZXW calculus. Finally, we develop practical techniques and show how to do Taylor expansion and Trotterization diagrammatically for Hamiltonian simulation. This sets up the framework for using ZXW calculus to the problems in quantum chemistry and condensed matter physics.read more
Citations
More filters
Proceedings ArticleDOI
Completeness for arbitrary finite dimensions of ZXW-calculus, a unifying calculus
TL;DR: The ZXW-calculus as discussed by the authors is a universal graphical language for qubit quantum computation, meaning that every linear map between qubits can be expressed in the ZX-Calculus.
Proceedings ArticleDOI
Addition and Differentiation of ZX-Diagrams
TL;DR: This work introduces a general, inductive definition of the addition of ZX-diagrams, relying on the construction of controlled diagrams, and provides an inductive differentiation of Zx-displays, based on the isolation of variables.
Light-matter interaction in the ZXW calculus
TL;DR: The infinite ZW calculus as mentioned in this paper is a graphical language for linear operators on the bosonic Fock space which captures both linear and non-linear photonic circuits, including phase shifts and beam splitters.
The Qupit Stabiliser ZX-travaganza: Simplified Axioms, Normal Forms and Graph-Theoretic Simplification
TL;DR: In this article , a simplified stabiliser ZX-calculus for odd prime-dimensional qudits (i.e. qupits) is presented, which allows for efficient reduction of diagrams to the affine with phases normal form.
Journal ArticleDOI
Scaling W state circuits in the qudit Clifford hierarchy
TL;DR: In this paper , a qudit gate called the $\sqrt[d]{Z}$ gate is introduced, which is an alternate generalization of the qutrit $T$ gate to any odd prime dimension $d, in the Clifford+$d^{\text{th}}$ level of the Clifford hierarchy.
References
More filters
Journal ArticleDOI
Quantum computational chemistry
TL;DR: This review presents strategies employed to construct quantum algorithms for quantum chemistry, with the goal that quantum computers will eventually answer presently inaccessible questions, for example, in transition metal catalysis or important biochemical reactions.
Posted Content
A categorical semantics of quantum protocols
Samson Abramsky,Bob Coecke +1 more
TL;DR: This paper focuses on quantum information protocols, which exploit quantum-mechanical effects in an essential way and form the basis for novel and potentially very important applications to secure and fault-tolerant communication and computation.
Journal ArticleDOI
Interacting Quantum Observables: Categorical Algebra and Diagrammatics
Bob Coecke,Ross Duncan +1 more
TL;DR: The ZX-calculus as mentioned in this paper is an intuitive and universal graphical calculus for multi-qubit systems, which greatly simplifies derivations in the area of quantum computation and information.
Journal ArticleDOI
Avoiding the Jordan Canonical Form in the Discussion of Linear Systems with Constant Coefficients
TL;DR: In this paper, the Jordan Canonical Form in the discussion of linear systems with constant coefficients has been avoided in the context of linear system with constant coefficients, and the authors propose an alternative approach to avoid it.