Linear Systems and Eigenvectors in Constructive Mathematics
Abstract
In this work we study two classical problems of (numerical) linear algebra: (i) solving linear systems and (ii) computing eigenvectors, within a constructive framework. Numerical accuracy and indeterminacy are naturally incorporated through Bishop-style constructive mathematics. Our contributions include new results on Gauss-Jordan elimination and on approximating the rank of a matrix. Additionally, we introduce a novel method for constructing approximate eigenvectors, based on a previously unexplored characterization of singular matrices.
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