W.C. Tang, H. Rosen, et al.
SPIE Optics, Electro-Optics, and Laser Applications in Science and Engineering 1991
We describe a matrix formulation of the iterative domain decomposition method in Natarajan [SIAM J. Sci. Comput., 16 (1995), pp. 470-495]. From one point of view, this method can be regarded as a preconditioning technique for the interface Schur-complement operator obtained from a decomposition into nonoverlapping subdomains. Prom another point of view, it can be viewed es a method of the Schwarz type for overlapping subdomains, but with an "overlap" between the physical space in one subdomain and the leading components of the eigenspace induced by the Steklov-Poincaré operator in the complementary domain.
W.C. Tang, H. Rosen, et al.
SPIE Optics, Electro-Optics, and Laser Applications in Science and Engineering 1991
Michael E. Henderson
International Journal of Bifurcation and Chaos in Applied Sciences and Engineering
Fernando Martinez, Juntao Chen, et al.
AAAI 2025
Robert Manson Sawko, Malgorzata Zimon
SIAM/ASA JUQ