When Are There Continuous Choices for the Mean Value Abscissa?

Abstract

The mean value theorem of calculus states that, given a differentiable function f on an interval [a, b], there exists at least one mean value abscissa c such that the slope of the tangent line at c is equal to the slope of the secant line through (a, f(a)) and (b, f(b)). In this article, we study how the choices of c relate to varying the right endpoint b. In particular, we ask: When we can write c as a continuous function of b in some interval? Drawing inspiration from graphed examples, we first investigate this question by proving and using a simplified implicit function theorem. To handle certain edge cases, we then build on this analysis to prove and use a simplified Morse's lemma. Finally, further developing the tools proved so far, we conclude that if f is analytic, then it is always possible to choose mean value abscissae so that c is a continuous function of b, at least locally.