Weierstrass function

E110606

The Weierstrass function is a classic example in mathematical analysis of a continuous function that is nowhere differentiable, illustrating the counterintuitive behavior possible in real-valued functions.

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Weierstrass function canonical 1

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Predicate Object
instanceOf continuous function
example in mathematical analysis
mathematical function
nowhere differentiable function
pathological function
real-valued function
appearsIn classical textbooks on real analysis
literature on fractal geometry
category counterexamples in analysis
special functions in real analysis
codomain real numbers
constructionMethod Fourier-like trigonometric series
infinite series
definedOn real line
field fractal geometry
functional analysis
mathematical analysis
real analysis
graphProperty nowhere differentiable curve
self-similar structure at different scales
hasRegularity Hölder continuous of some exponent <1
influenced development of fractal theory
study of irregular functions
introducedBy Karl Weierstrass
namedAfter Karl Weierstrass
parameterCondition 0<a<1
ab>1+3π/2
b is an odd integer
property bounded
everywhere continuous
fractal graph
graph has non-integer Hausdorff dimension
nowhere differentiable
uniformly continuous on R
role counterexample in analysis
example of continuous nowhere differentiable function
example showing limits of geometric intuition
typicalForm W(x)=∑_{n=0}^{∞} a^n cos(b^n π x)
usedIn studying Hölder continuity
studying function regularity
teaching real analysis
yearProposed 1872

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Karl Weierstrass notableFor Weierstrass function