Lower bounds for the heights of solutions of linear equations

We count the number of solutions with height less than or equal to \(B\) to a system of linear equations over a number field. We give explicit asymptotic estimates for the number of such solutions as \(B\) goes to infinity, where the constants involved depend on the classical invariants of the numbe

Let X and Y be Banach spaces, and let T : X -Y be a bounded linear operator with closed range. In this paper, we give optimal lower and upper bounds for the perturbation of consistent operator equations Tz = 1/, and more general least-squares problems in Hilbert spaces.

This paper deals with the construction of explicit bounds for solutions of second order linear differential equations of the type [p(x)y ( The construction is based on the study of the evolution of two complementary functionals involving y(x) in the sequence of zeroes of y(x) and y (x). Based on th