Diseño de una Arquitectura para la Solucion de la Ecuacion de Schroedinger usando el Metodo de Numerov
This is an incremental hardware implementation of a known numerical method for solving the Schrödinger equation, relevant to computational physics and engineering.
This paper presents a first approach to designing an optimal architecture for solving the one-dimensional time-independent Schrödinger equation using the Numerov method, implemented with 64-bit floating-point megafunctions in Quartus II and verified in Matlab. The design can be extended to parallel structures for multiple solutions.
This paper presents a first approach in order to design an optimal architecture to implement the Numerov method, which solves the time-independent Schroedinger equation (TISE) for one dimension. The design and simulation have been performed by using 64-bits floating-point megafunctions available in Quartus II (Version 9.0). The verification of these results was done by using Matlab. According to these results, it is possible to extend this design to parallel structures, which would be able to calculate several TISE solutions.