Fixed point: Difference between revisions
imported>Dmitrii Kouznetsov m (→Operators) |
imported>Dmitrii Kouznetsov |
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[[Exponential]] if fixed point or [[operator of differentiation]] D, | [[Exponential]] if fixed point or [[operator of differentiation]] D, | ||
because | because | ||
<math>{\rm D} \exp(x) =\exp'(x)=\exp(x)</math> | <math>{\rm D}~ \exp(x) =\exp'(x)=\exp(x)</math> | ||
The [[Gaussian exponential]] | The [[Gaussian exponential]] | ||
:(2) <math>L(x)=\exp(-x^2/2)</math>, <math>x \in</math>[[real number|reals]] | :(2) <math>L(x)=\exp(-x^2/2)</math> , <math>~x \in</math>[[real number|reals]] | ||
is fixed point of the [[Fourier operator]], defined with its action on a function <math>g</math>: | is fixed point of the [[Fourier operator]], defined with its action on a function <math>g</math>: | ||
:(3) <math>F(g)(p)=\frac{1}{\sqrt{2\pi}\int_{-\infty}^{\infty} | :(3) <math>F(g)(p)=\frac{1}{\sqrt{2\pi}}\int_{-\infty}^{\infty} | ||
g(x)\exp(-{\rm i}px) {\rm d}p </math> | g(x)\exp(-{\rm i}px) {\rm d}p </math> | ||
in general, functors have no need to be linear, so, there is no [[associativity]] | in general, functors have no need to be linear, so, there is no [[associativity]] |
Revision as of 01:46, 31 May 2008
Fixed point of a functor is solution of equation
- (1)
Simple examples
Elementary functions
In particular, functor can be elementaty function. For example, 0 and 1 are fixed points of function sqrt, because and .
In similar way, 0 is fixed point of sine function, because .
Operators
Functor in the equation (1) can be a linear operator. In this case, the fixed point of functor is its eigenfunction with eigenvalue equal to unity.
Exponential if fixed point or operator of differentiation D, because
- (2) , reals
is fixed point of the Fourier operator, defined with its action on a function :
- (3)
in general, functors have no need to be linear, so, there is no associativity at application of several functiors in row, and parenthesis are necessary in the left hand side of eapression (3). [1]
==Fixed points of exponential and fixed points of logarithm