Masaaki Sugihara

Masaaki Sugihara
Masaaki Sugihara
Born	1954
Died	2019
Nationality	Japan
Alma mater	University of Tokyo
Known for	DE-Sinc method; GBi-CGSTAB method (A method to solve a system of linear equations)
	Scientific career
Fields	Numerical integration; Numerical linear algebra
Institutions	University of Tokyo

Masaaki Sugihara (1954-2019) is a Japanese researcher of numerical analysis and former professor at the University of Tokyo. He is known for his studies about numerical linear algebra,^[2] numerical integration^[3]^[4]^[5] and approximation.^[1] He also had several joint studies with Masatake Mori.^[6]^[7]^[8]^[9]

References

↑ ^1.0 ^1.1 M. Sugihara, Near optimality of the Sinc approximation, Math. Comp., 72 (2003), 767–786.
↑ ^2.0 ^2.1 Tanio, M., & Sugihara, M. (2010). GBi-CGSTAB (s, L): IDR (s) with higher-order stabilization polynomials. Journal of Computational and Applied Mathematics, 235(3), 765-784.
↑ Sugihara, M., & Murota, K. (1982). A note on Haselgrove’s method for numerical integration. Mathematics of Computation, 39(160), 549-554.
↑ Sugihara, M. (1987). Method of good matrices for multi-dimensional numerical integrations—An extension of the method of good lattice points. Journal of Computational and Applied Mathematics, 17(1-2), 197-213.
↑ Sugihara, M. (1997). Optimality of the double exponential formula–functional analysis approach–. Numerische Mathematik, 75(3), 379-395.
↑ Mori, M., & Sugihara, M. (2001). The double-exponential transformation in numerical analysis. Journal of Computational and Applied Mathematics, 127(1-2), 287-296.
↑ Muhammad, M., Nurmuhammad, A., Mori, M., & Sugihara, M. (2005). Numerical solution of integral equations by means of the Sinc collocation method based on the double exponential transformation. Journal of Computational and Applied Mathematics, 177(2), 269-286.
↑ Tanaka, K. I., Sugihara, M., Murota, K., & Mori, M. (2009). Function classes for double exponential integration formulas. Numerische Mathematik, 111(4), 631-655.
↑ Nurmuhammad, A., Muhammad, M., Mori, M., & Sugihara, M. (2005). Double exponential transformation in the Sinc-collocation method for a boundary value problem with fourth-order ordinary differential equation. Journal of Computational and Applied Mathematics, 182(1), 32-50.

[sinc-1] 1.0 ^1.1 M. Sugihara, Near optimality of the Sinc approximation, Math. Comp., 72 (2003), 767–786.

[cg-2] 2.0 ^2.1 Tanio, M., & Sugihara, M. (2010). GBi-CGSTAB (s, L): IDR (s) with higher-order stabilization polynomials. Journal of Computational and Applied Mathematics, 235(3), 765-784.

[3] Sugihara, M., & Murota, K. (1982). A note on Haselgrove’s method for numerical integration. Mathematics of Computation, 39(160), 549-554.

[4] Sugihara, M. (1987). Method of good matrices for multi-dimensional numerical integrations—An extension of the method of good lattice points. Journal of Computational and Applied Mathematics, 17(1-2), 197-213.

[5] Sugihara, M. (1997). Optimality of the double exponential formula–functional analysis approach–. Numerische Mathematik, 75(3), 379-395.

[6] Mori, M., & Sugihara, M. (2001). The double-exponential transformation in numerical analysis. Journal of Computational and Applied Mathematics, 127(1-2), 287-296.

[7] Muhammad, M., Nurmuhammad, A., Mori, M., & Sugihara, M. (2005). Numerical solution of integral equations by means of the Sinc collocation method based on the double exponential transformation. Journal of Computational and Applied Mathematics, 177(2), 269-286.

[8] Tanaka, K. I., Sugihara, M., Murota, K., & Mori, M. (2009). Function classes for double exponential integration formulas. Numerische Mathematik, 111(4), 631-655.

[9] Nurmuhammad, A., Muhammad, M., Mori, M., & Sugihara, M. (2005). Double exponential transformation in the Sinc-collocation method for a boundary value problem with fourth-order ordinary differential equation. Journal of Computational and Applied Mathematics, 182(1), 32-50.

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