Epsilon-equilibrium: Difference between revisions

From formulasearchengine
Jump to navigation Jump to search
en>Sct72
m _ WP:FIX
en>Rjwilmsi
m Added 2 dois to journal cites using AWB (10213)
 
Line 1: Line 1:
In [[q-analog]] theory, the '''Jackson integral''' [[series (mathematics)|series]]  in the theory of [[special functions]] that expresses the operation inverse to [[q-differentiation]].
Golda is what's created on my birth certification even though it is not the name on my birth certificate. For a whilst I've been in Alaska but I will have to transfer in a yr or two. Distributing production is how he tends to make a residing. As a woman what she really likes is style and she's been performing it for quite a whilst.<br><br>Here is [http://Conniecolin.com/xe/community/24580 psychic readings] my weblog free [http://isaworld.pe.kr/?document_srl=392088 love psychic readings] reading - [http://www.youronlinepublishers.com/authWiki/AdolphvhBladenqq www.youronlinepublishers.com],
 
The Jackson integral was introduced by [[Frank Hilton Jackson]].
 
== Definition ==
Let ''f''(''x'') be a function of a real variable ''x''. The Jackson integral of ''f'' is defined by the following series expansion:
 
: <math> \int f(x) d_q x = (1-q)x\sum_{k=0}^{\infty}q^k f(q^k x). </math>
 
More generally, if ''g''(''x'') is another function and ''D''<sub>''q''</sub>''g'' denotes its ''q''-derivative, we can formally write
 
: <math> \int f(x) D_q g d_q x = (1-q)x\sum_{k=0}^{\infty}q^k f(q^k x) D_q g(q^k x) = (1-q)x\sum_{k=0}^{\infty}q^k f(q^k x)\frac{g(q^{k}x)-g(q^{k+1}x)}{(1-q)q^k x}, </math> or
 
: <math> \int f(x) d_q g(x) = \sum_{k=0}^{\infty} f(q^k x)(g(q^{k}x)-g(q^{k+1}x)), </math>
 
giving a ''q''-analogue of the [[Riemann–Stieltjes integral]].
 
== Jackson integral as q-antiderivative ==
 
Just as the ordinary [[antiderivative]] of a [[continuous function]] can be represented by its [[Riemann integral]], it is possible to show that the Jackson integral gives a unique ''q''-antiderivative
within a certain class of functions.
 
=== Theorem ===
Suppose that <math>0<q<1.</math> If <math>|f(x)x^\alpha|</math> is bounded on the interval <math>[0,A)</math> for some <math>0\leq\alpha<1, </math> then the Jackson integral converges to a function <math>F(x)</math> on <math>[0,A)</math> which is a ''q''-antiderivative of <math>f(x).</math> Moreover, <math>F(x)</math> is continuous at <math>x=0</math> with <math>F(0)=0</math> and is a unique antiderivative of <math>f(x)</math> in this class of functions.<ref>Kac-Cheung, Theorem 19.1.</ref>
 
== Notes ==
<references/>
 
== References ==
*Victor Kac, Pokman Cheung, ''[[Quantum calculus|Quantum Calculus]]'', Universitext, Springer-Verlag, 2002. ISBN 0-387-95341-8
*Jackson F H (1904), "A generalization of the functions Γ(n) and x<sub>n</sub>", ''Proc. R. Soc.'' '''74''' 64–72.  
*Jackson F H (1910), "On q-definite integrals", ''Q. J. Pure Appl. Math.'' '''41''' 193–203.
 
[[Category:Special functions]]
[[Category:Q-analogs]]
 
{{mathanalysis-stub}}

Latest revision as of 17:19, 24 May 2014

Golda is what's created on my birth certification even though it is not the name on my birth certificate. For a whilst I've been in Alaska but I will have to transfer in a yr or two. Distributing production is how he tends to make a residing. As a woman what she really likes is style and she's been performing it for quite a whilst.

Here is psychic readings my weblog free love psychic readings reading - www.youronlinepublishers.com,