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Volume 7, Issue 2, Article 40 |
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On L'Hospital-Type Rules for Monotonicity
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Authors: |
Iosif Pinelis, |
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Keywords:
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L'Hospital-type rules, Monotonicity, Borwein-Borwein-Rooin ratio, Becker-Stark inequalities, Anderson-Vamanamurthy-Vuorinen inequalities, log-concavity, Maclaurin series, Hyperbolic geometry, Right-angled triangles. |
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Date Received:
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18/05/05 |
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Date Accepted:
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14/11/05 |
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Subject Codes: |
26A48, 26A51, 26A82, 26D10, 50C10, 53A35
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Editors: |
Jonathan Borwein, |
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Abstract: |
Elsewhere we developed rules for the monotonicity pattern of the ratio of two differentiable functions on an interval based on the monotonicity pattern of the ratio of the derivatives. Those rules are applicable even more broadly than l'Hospital's rules for limits, since in general we do not require that both and , or either of them, tend to 0 or at an endpoint or any other point of . Here new insight into the nature of the rules for monotonicity is provided by a key lemma, which implies that, if is monotonic, then is so; hence, changes sign at most once. Based on the key lemma, a number of new rules are given. One of them is as follows: Suppose that ; suppose also that on - that is, for some , ( is increasing) on and on . Then or on . Various applications and illustrations are given.
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