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Line 1: {{Short description\|Differentiable function whose derivative is not Riemann integrable}} [[File:Volerra function.svg\|thumb\|400px\|right\|First three steps of Volerra function's construction.]]▼ {{more citations needed\|date=August 2024}} ▲[[File:~~Volerra~~Volterra function.svg\|thumb\|400px\|right\|~~First~~The first three steps ofin ~~Volerra~~the ~~function~~construction of Volterra's ~~construction~~function.]] In [[mathematics]], '''Volterra's function''', named for [[Vito Volterra]], is a real-valued function ''V''(''x'') defined on the [[real line]] '''R''' with the following curious combination of properties:▼ ▲In [[mathematics]], '''Volterra's function''', named for [[Vito Volterra]], is a [[real-valued function]] ''V''~~(''x'')~~ [[Function of a real variable\|defined on the [[real line]] '''R''' with the following curious combination of properties: * ''V''(''x'') is [[differentiable]] everywhere▼ * The derivative ''V'' ′(''x'') is [[bounded function\|bounded]] everywhere▼ ▲* ''V''~~(''x'')~~ is [[Differentiable function\|differentiable]] everywhere ▲* The derivative ''V'' ′~~(''x'')~~ is [[bounded function\|bounded]] everywhere * The derivative is not [[Riemann integration\|Riemann-integrable]]. ==Definition and construction== The function is defined by making use of the [[Smith–Volterra–Cantor set]] and an infinite number or "copies" of sections of the function defined by The function is defined by making use of the [[Smith–Volterra–Cantor set]] and "copies" of the function defined by ''f''(''x'') = ''x''<sup>2</sup> sin(1/''x'') for ''x'' ≠ 0 and ''f''(''x'') = 0 for ''x'' = 0. The construction of ''V''(''x'') begins by determining the largest value of ''x'' in the interval [0, 1/8] for which ''f'' ′(''x'') = 0. Once this value (say ''x''<sub>0</sub>) is determined, extend the function to the right with a constant value of ''f''(''x''<sub>0</sub>) up to and including the point 1/8. Once this is done, a mirror image of the function can be created starting at the point 1/4 and extending downward towards 0. This function will be defined to be 0 outside of the interval [0, 1/4]. We then translate this function to the interval [3/8, 5/8] so that the resulting function, which we call ''f''<sub>1</sub>, is nonzero only on the middle interval of the complement of the Smith–Volterra–Cantor set. To construct ''f''<sub>2</sub>(''x''), ''f'' ′(''x'') is then considered on the smaller interval [0,1/32], truncated at the last place the derivative is zero, extended, and mirrored the same way as before, and two translated copies of the resulting function are added to ''f''<sub>1</sub> to produce the function ''f''<sub>2</sub>. Volterra's function then results by repeating this procedure for every interval removed in the construction of the Smith–Volterra–Cantor set; in other words, the function ''V'' is the limit of the sequence of functions ''f''<sub>1</sub>, ''f''<sub>2</sub>, ...▼ :<math>f(x) = \begin{cases} x^2 \sin(1/x), & x \ne 0 \\ 0, & x = 0.\end{cases}</math> ▲The function is defined by making use of the [[Smith–Volterra–Cantor set]] and "copies" of the function defined by ''f''(''x'') = ''x''<sup>2</sup> sin(1/''x'') for ''x'' ≠ 0 and ''f''(''x'') = 0 for ''x'' = 0. The construction of ''V''~~(''x'')~~ begins by determining the largest value of ''x'' in the interval [0, 1/8] for which ''f'' ′(''x'') = 0. Once this value (say ''x''<sub>0</sub>) is determined, extend the function to the right with a constant value of ''f''(''x''<sub>0</sub>) up to and including the point 1/8. Once this is done, a mirror image of the function can be created starting at the point 1/4 and extending downward towards 0. This function will be defined to be 0 outside of the interval [0, 1/4]. We then translate this function to the interval [3/8, 5/8] so that the resulting function, which we call ''f''<sub>1</sub>, is nonzero only on the middle interval of the complement of the Smith–Volterra–Cantor set. To construct ''f''<sub>2</sub>(''x''), ''f'' ′(''x'') is then considered on the smaller interval [0,1/32], truncated at the last place the derivative is zero, extended, and mirrored the same way as before, and two translated copies of the resulting function are added to ''f''<sub>1</sub> to produce the function ''f''<sub>2</sub>. Volterra's function then results by repeating this procedure for every interval removed in the construction of the Smith–Volterra–Cantor set; in other words, the function ''V'' is the limit of the sequence of functions ''f''<sub>1</sub>, ''f''<sub>2</sub>, ... To construct ''f''<sub>2</sub>, ''f'' ′ is then considered on the smaller interval [0,1/32], truncated at the last place the derivative is zero, extended, and mirrored the same way as before, and two translated copies of the resulting function are added to ''f''<sub>1</sub> to produce the function ''f''<sub>2</sub>. Volterra's function then results by repeating this procedure for every interval removed in the construction of the Smith–Volterra–Cantor set; in other words, the function ''V'' is the limit of the sequence of functions ''f''<sub>1</sub>, ''f''<sub>2</sub>, ... ==Further properties== Volterra's function is differentiable everywhere just as ''f'' (~~''x'')~~as (defined above) is. One can show that ''f'' ′(''x'') = 2''x'' sin(1/''x'') - cos(1/''x'') for ''x'' ≠ 0, which means that in any neighborhood of zero, there are points where ''f'' ′~~(''x'')~~ takes values 1 and −1. Thus there are points where ''V'' ′~~(''x'')~~ takes values 1 and −1 in every neighborhood of each of the endpoints of intervals removed in the construction of the [[Smith–Volterra–Cantor set]] ''S''. In fact, ''V'' ′ is discontinuous at every point of ''S'', even though ''V'' itself is differentiable at every point of ''S'', with derivative 0. However, ''V'' ′ is continuous on each interval removed in the construction of ''S'', so the set of discontinuities of ''V'' ′ is equal to ''S''. Since the Smith–Volterra–Cantor set ''S'' has positive [[Lebesgue measure]], this means that ''V'' ′ is discontinuous on a set of positive measure. By [[~~Riemann_integral~~Riemann integral#Integrability\|Lebesgue's criterion for Riemann integrability]], ''V'' ′ is not Riemann integrable. If one were to repeat the construction of Volterra's function with the ordinary measure-0 Cantor set ''C'' in place of the "fat" (positive-measure) Cantor set ''S'', one would obtain a function with many similar properties, but the derivative would then be discontinuous on the measure-0 set ''C'' instead of the positive-measure set ''S'', and so the resulting function would have ana Riemann integrable derivative. == See also == * [[Fundamental theorem of calculus]] ==References== {{Reflist}} ==External links== * [http://www.macalester.edu/~bressoud/talks/AlleghenyCollege/Wrestling.pdf ''Wrestling with the Fundamental Theorem of Calculus: Volterra's function''] {{Webarchive\|url=https://web.archive.org/web/20201123131325/http://www.macalester.edu/~bressoud/talks/AlleghenyCollege/Wrestling.pdf \|date=2020-11-23 }}, talk by [[David Bressoud\|David Marius Bressoud]] * [http://www.macalester.edu/~bressoud/talks/apnc2004/Volterra.ppt ''Volterra's example of a derivative that is not integrable'' ] {{Webarchive\|url=https://web.archive.org/web/20160303185034/http://www.macalester.edu/~bressoud/talks/apnc2004/Volterra.ppt \|date=2016-03-03 }}('''PPT'''), talk by [[David Bressoud\|David Marius Bressoud]] [[Category:Fractals]] [[Category:Measure theory]] [[Category:General topology]] ~~[[fr:Fonction de Volterra]]~~