Truncation errors in finite difference models for solute transport equation with first-order reaction

## Abstract This article demonstrates that exponential convergence of the flux error can be achieved for any kinetic–diffusion system comprising an arbitrary number of (pseudo) first‐order chemical reactions if the underlying PDEs are discretized as outlined for the box 2 or box 4 method in the pre

## Abstract This article demonstrates that exponential convergence of the flux error can be attained with second‐ and fourth‐order accurate finite difference equations even for such electrochemical kinetic‐diffusion systems where difficult‐to‐resolve solution structures occur on account of fast sec

This paper is devoted to the study of the existence of solutions of first-order difference equations verifying nonlinear conditions that involve the global behavior of the solution. We prove that the existence of lower and upper solutions warrants the existence of such solutions lying in the sector