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On Strict Monotonicity of Continuous Solutions of Certain Types of Functional Equations
Published online by Cambridge University Press: 20 November 2018
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It is a commonplace that F is continuous on the cartesian square of the range of f if f is continuous and satisfies
1
say, for all real x, y (cf. e.g. [2]). A.D. Wallace has kindly called my attention to the fact, that this is trivial only if f is (constant or) strictly monotonic and asked for a simple proof of the strict monotonicity of f. The following could serve as such: if on an interval f is continuous, nonconstant and satisfies (1), then f is strictly monotonic there.
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- Copyright © Canadian Mathematical Society 1966
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