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The core problem within a linear approximation problem with multiple right-hand sides

Publication at Faculty of Mathematics and Physics |
2014

Abstract

In total least squares (TLS) formulation of a linear approximation problem AX ~ B with multiple right-hand sides, we seek a minimal correction to B and A giving a compatible problem. It is well known that even in the single right-hand side case the TLS problem may not have a solution and when the solution exists, it may not be unique.

Problems with d = 1 have been revisited by Ch. Paige and Z.

Strakoš introducing the so called core theory. In this presentation, we study the existence and uniqueness of a TLS solution with d > 1.

We present a generalization of the core theory to the multiple right-hand side case.