![]() ![]() Higham NJ, Tisseur F (2000) A block algorithm for matrix 1-norm estimation, with an application to 1-norm pseudospectra. Sastre J, Ibáñez Javier J, Defez E, Ruiz Pedro A (2015) Efficient scaling-squaring Taylor method for computing matrix exponential. Sastre J, Ibáñez Javier J, Defez E, Ruiz Pedro A (2011) Efficient orthogonal matrix polynomial based method for computing matrix exponential. Higham Nicholas J (2008) Functions of matrices: theory and computation. Paterson Michael S, Stockmeyer Larry J (1973) On the number of nonscalar multiplications necessary to evaluate polynomials. Sastre Jorge, Ibáñez Javier, Alonso Pedro, Peinado Jesús, Defez Emilio (2017) Two algorithms for computing the matrix cosine function. In: Proceedings of the 17th International Conference on Computational and Mathematical Methods in Science and Engineering (CMMSE 2017), pp 51–55, Costa Ballena, Rota, Cadiz (Spain), July 4th–8th J Supercomput 73(1):227–239Īlonso P, Peinado J, Ibáñez J, Sastre J, Defez E (2017) A fast implementation of matrix trigonometric functions sine and cosine. Accessed Sept 2017īoratto Murilo, Alonso Pedro, Giménez Domingo, Lastovetsky Alexey L (2017) Automatic tuning to performance modelling of matrix polynomials on multicore and multi-gpu systems. Universitat Politècnica de València, 2014. Accessed May 2017Īlonso Jordá P, Boratto M, Peinado Pinilla J, Ibáñez González JJ, Sastre Martínez J (2014) On the evaluation of matrix polynomials using several GPGPUs. SIAM J Sci Comput 37(1):A456–A487Īlonso P, Ibáñez J, Sastre J, Peinado J, Defez E (2017) Efficient and accurate algorithms for computing matrix trigonometric functions. Appl Math Comput 219:7575–7585Īl-Mohy Awad H, Higham Nicholas J, Relton Samuel D (2015) New algorithms for computing the matrix sine and cosine separately or simultaneously. Sastre J, Ibáñez J, Ruiz P, Defez E (2013) Efficient computation of the matrix cosine. SIAM J Matrix Anal Appl 31(3):970–989ĭefez E, Sastre J, Ibáñez Javier J, Ruiz Pedro A (2011) Computing matrix functions arising in engineering models with orthogonal matrix polynomials. ![]() Numer Algorithms 40:383–400Īl-Mohy Awad H, Higham Nicholas J (2009) A new scaling and squaring algorithm for the matrix exponential. Hargreaves GI, Higham NJ (2005) Efficient algorithms for the matrix cosine and sine. Serbin Steven M, Blalock Sybil A (1980) An algorithm for computing the matrix cosine. Serbin SM (1979) Rational approximations of trigonometric matrices with application to second-order systems of differential equations.
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