Jean Bosco Mugiraneza

Work place: Department of Computer Science, Kigali Independent University P. O. Box 2280, Kigali-Rwanda



Research Interests: Engineering, Computational Engineering, Computational Science and Engineering


Mr. Jean-Bosco Mugiraneza received the BSc in Electromechanical Engineering in 2003 from Kigali Institute of Science and Technology (KIST) and the M.E. in Electrical Engineering in 2006 from City University of New York. Mr. Jean Bosco is Member of International Association of Engineers (MIAENG), Member of International Association of Computer Science and Information Technology (MIACSIT), Member of International Association of Science and Technology for Development (MIASTED) as well as Member of International Society for Engineering Education (MIGIP). He is the co-author of the books on Principles of Engineering Analysis, ISBN: 9788184871456 and Signals and System Analysis with Matlab and PSpice, ISBN: 978384336681.

Author Articles
Quantum Wavelet Transforms Generated by the Product of the Sine Polynomial and the Gaussian Envelope on the Tetrahedral Graph

By Jean Bosco Mugiraneza

DOI:, Pub. Date: 8 Jul. 2018

In this paper we present a novel technique that permits to extract the essential on information embedded in the product of sine polynomial and Gaussian envelope by simply knowing the vertices of the tetrahedral graph.  The study proves that the matrix of vertices of the tetrahedral graph and its variants are the building block of both Haar wavelets, Hadamard-Walsh transform, wavelets sets and tight frames. We also prove that the Berkeley B Gate is a function of the degree matrix and the adjacency matrix of the tetrahedral graph.  The latter is the Hermitian part of the unitary polar decomposition in terms of elementary gates for quantum computation [68] which reveals interesting properties of the tetrahedral graph in both quantum group, Lie group and Pauli group for wavelets sets, quantum image processing and quantum data compression. We explore the connection existing among graphs theory, wavelets, tight frames and quantum logic gates.

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Wavelet Based Some Julia Sets of Rational Maps Having Zhukovskii Function

By Jean Bosco Mugiraneza

DOI:, Pub. Date: 8 Jun. 2012

The dynamics of rational maps and their properties are interesting because of the presence of poles and zeros. In this paper we have computed Julia sets of rational maps having Zhukovskii Function for which the double of the first derivative has no Herman rings. The data points out of the Julia set in Matlab workspace were imported to Matlab Signal Processing Tool for their analysis. We have sampled the data points with the sampling frequency of 8192 Hz and obtained complex signals. We have then applied the band pass filter to these complex signals. The effect of the band pass filter has generated complex analogue modulated signals.

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