Computational methods for linear matrix equations and applications
Scientific-Disciplinary Group
01/MATH-05 - Numerical Analysis
Description
Linear matrix and tensor equations arise in a largely increasing number of applications, as effective alternatives to vector linear systems. In particular, they have become the reference algebraic formulation for many computational models A significant feature of matrix-oriented formulations is that properties of the original problem, such as symmetry and low-rank structure, are maintained and can possibly be exploited for approximating the matrix solution. In this project the successful candidate will explore some of the following problems within the solution of linear matrix and tensor equations:• Mixed-precision computations. • Randomization methods. • Rational function subspaces. • Preconditioning.
Job posting website
Funding body
ALMA MATER STUDIORUM - UNIVERSITA' DI BOLOGNA - - DIPARTIMENTO DI MATEMATICA
How to apply
Other
Selection process
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