Dual-register encoding enables coined quantum walks on degree-varying complex networks with circuit depth scaling as N^1.9, shown via simulations on standard models and small IBM hardware executions.
Quantum computation and quantum information
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This thesis explores geometric and dynamical properties of entanglement in two- and many-body spin systems under XXZ and Ising interactions using phase space and Fubini-Study geometry.
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Coined Quantum Walks on Complex Networks for Quantum Computers
Dual-register encoding enables coined quantum walks on degree-varying complex networks with circuit depth scaling as N^1.9, shown via simulations on standard models and small IBM hardware executions.
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Exploring the Geometric and Dynamical Properties of Spin Systems and Their Interplay with Quantum Entanglement
This thesis explores geometric and dynamical properties of entanglement in two- and many-body spin systems under XXZ and Ising interactions using phase space and Fubini-Study geometry.