Chandrasekaran, S.Gu, M.Sayed, Ali H.Schubert, K. E.2017-12-192017-12-192017-12-19200110.1137/S0895479800357766https://infoscience.epfl.ch/handle/20.500.14299/143375We consider the following problem: $\min_{x \in {\cal R}^n} \min_{\|E\| \le \eta} \|(A+E)x-b\|$, where A is an $m \times n$ real matrix and b is an n-dimensional real column vector when it has multiple global minima. This problem is an errors-in-variables problem, which has an important relation to total least squares with bounded uncertainty. A computable condition for checking if the problem is degenerate as well as an efficient algorithm to find the global solution with minimum Euclidean norm are presented.text::journal::journal article::research article