Chair in applied mathematics OQUAIDO Activity report

The Chair, which follows the ReDICE consortium (www.redice-project.org), gathers partners from academia, technological research and industry around innovative mathematical methods

Our second contribution is a creative way of constructing a triplet representation for the defining matrices of all smaller ares during the doubling iterations so that the

To address this issue, we construct multiscale basis functions within the framework of generalized multiscale finite element method (GMsFEM) for dimension reduction in the

Lin, Structured doubling algorithms for solving g-palindromic quadratic eigenvalue problems, Technical Report, NCTS Preprints in Mathematics, National Tsing Hua University,

Since the shift-and-invert Arnoldi method is known to converge very fast when a proper shift is known, the overall computational costs of GE_GTSHIRA and GE_TSHIRA, including computing

For related research projects, strategies for the optimal setting of parameters and optimization of the computation and data structures in the SDA_ls, pre-processing of AREs to

By using variational methods, the existence and the non-existence of nontrivial homoclinic solutions are obtained, depending on a parameter.. Ó 2014

OQUAIDO is a French collaborative research project between academic and applied research partners (companies, semi-public research