Tesis Doctorado
Permanent URI for this collection
Browse
Browsing Tesis Doctorado by Subject "Algorithms"
Now showing 1 - 1 of 1
Results Per Page
Sort Options
Item Numerical methods for variational quantum and quantum-inspired computing.(Universidad de Concepción, 2025) Gidi Chomalí, Jorge Abraham; Delgado Hidalgo, Aldo Patricio; García Ripoll, Juan JoséQuantum computation is a promising approach to solving problems in physics, optimization, and numerical simulation. Quantum algorithms leverage superposition and entanglement in an exponentially large Hilbert space to encode and solve problems that are intractable for classical computers. However, these algorithms require error-corrected quantum hardware, which is not yet available. This thesis explores two alternative quantum-based approaches that promise to achieve better scalability than traditional algorithms in the near-term: Hybrid variational quantum algorithms (VQAs) and fully classical, quantum-inspired algorithms. In the first part, we review and benchmark optimization methods well suited for VQAs, specifically the Simultaneous Perturbation Stochastic Approximation (SPSA). We introduce complex-variable extensions and improvements to the second-order and quantum natural implementations. Finally, we assess their performance across quantum control, quantum tomography, and the variational quantum eigensolver, providing practical guidelines for common VQA scenarios. In the second part, we apply Matrix Product States (MPS) to solve time-dependent partial differential equations (PDEs). By integrating Hermite Distributed Approximating Functionals (HDAF) into the MPS framework, we develop a novel encoding to efficiently approximate differential operators with exponential precision. We benchmark this approach against traditional schemes for simulating the expansion of a levitated nanoparticle. The quantum-inspired numerical integration schemes deliver large memory savings and adequate runtimes even in presence of moderate chirping.