In the theory of
differential equations, comparison theorems assert particular properties of solutions of a differential equation (or of a system thereof), provided that an auxiliary equation/inequality (or a system thereof) possesses a certain property. Differential (or integral) inequalities, derived from differential (respectively, integral) equations by replacing the equality sign with an inequality sign, form a broad class of such auxiliary relations.[1][2]
One instance of such theorem was used by Aronson and Weinberger to characterize solutions of
Fisher's equation, a reaction-diffusion equation.[3] Other examples of comparison theorems include:
Grönwall's inequality, and its various generalizations, provides a comparison principle for the solutions of first-order ordinary differential equations
In
Riemannian geometry, it is a traditional name for a number of theorems that compare various metrics and provide various estimates in Riemannian geometry. [4]
^Lakshmikantham, Vangipuram (1969). Differential and integral inequalities: theory and applications. Mathematics in science and engineering. Srinivasa Leela. New York: Academic Press.
ISBN978-0-08-095563-6.
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