Schottky defect: Difference between revisions

Revision as of 04:34, 4 February 2014

Template:LowercaseIn combinatorial mathematics, the q-exponential is a q-analog of the exponential function, namely the eigenfunction of the q-derivative

Definition

The q-exponential $e_{q}(z)$ is defined as

e_{q}(z)=\sum _{n=0}^{\infty }{\frac {z^{n}}{[n]_{q}!}}=\sum _{n=0}^{\infty }{\frac {z^{n}(1-q)^{n}}{(q;q)_{n}}}=\sum _{n=0}^{\infty }z^{n}{\frac {(1-q)^{n}}{(1-q^{n})(1-q^{n-1})\cdots (1-q)}}

where $[n]_{q}!$ is the q-factorial and

(q;q)_{n}=(1-q^{n})(1-q^{n-1})\cdots (1-q)

is the q-Pochhammer symbol. That this is the q-analog of the exponential follows from the property

\left({\frac {d}{dz}}\right)_{q}e_{q}(z)=e_{q}(z)

where the derivative on the left is the q-derivative. The above is easily verified by considering the q-derivative of the monomial

\left({\frac {d}{dz}}\right)_{q}z^{n}=z^{n-1}{\frac {1-q^{n}}{1-q}}=[n]_{q}z^{n-1}.

Here, $[n]_{q}$ is the q-bracket.

Properties

For real $q>1$ , the function $e_{q}(z)$ is an entire function of z. For $q<1$ , $e_{q}(z)$ is regular in the disk $|z|<1/(1-q)$ .

Note the inverse, $~e_{q}(z)~e_{1/q}(-z)=1$ .

Relations

For $q<1$ , a function that is closely related is

e_{q}(z)=E_{q}(z(1-q)).

Here, $E_{q}(t)$ is a special case of the basic hypergeometric series:

E_{q}(z)=\;_{1}\phi _{0}(0;q,z)=\prod _{n=0}^{\infty }{\frac {1}{1-q^{n}z}}~.

References

F. H. Jackson (1908), "On q-functions and a certain difference operator", Trans. Roy. Soc. Edin., 46 253-281.

Exton, H. (1983), q-Hypergeometric Functions and Applications, New York: Halstead Press, Chichester: Ellis Horwood, 1983, ISBN 0853124914, ISBN 0470274530, ISBN 978-0470274538

Gasper G., and Rahman, M. (2004), Basic Hypergeometric Series, Cambridge University Press, 2004, ISBN 0521833574

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+{{Distinguish2|the Tsallis [[Tsallis statistics#q-exponential|q-exponential]]}}
+{{Lowercase}}In [[combinatorics|combinatorial]] [[mathematics]], the '''q-exponential''' is a [[q-analog]] of the [[exponential function]],
+namely the eigenfunction of the [[q-derivative]]
+==Definition==
+The q-exponential <math>e_q(z)</math> is defined as
+:<math>e_q(z)=
+\sum_{n=0}^\infty \frac{z^n}{[n]_q!} =
+\sum_{n=0}^\infty \frac{z^n (1-q)^n}{(q;q)_n} =
+\sum_{n=0}^\infty z^n\frac{(1-q)^n}{(1-q^n)(1-q^{n-1}) \cdots (1-q)}</math>
+where <math>[n]_q!</math> is the [[q-factorial]] and
+:<math>(q;q)_n=(1-q^n)(1-q^{n-1})\cdots (1-q)</math>
+is the [[q-Pochhammer symbol]]. That this is the q-analog of the exponential follows from the property
+:<math>\left(\frac{d}{dz}\right)_q e_q(z) = e_q(z)</math>
+where the derivative on the left is the [[q-derivative]]. The above is easily verified by considering the q-derivative of the [[monomial]]
+:<math>\left(\frac{d}{dz}\right)_q z^n = z^{n-1} \frac{1-q^n}{1-q}
+=[n]_q z^{n-1}.</math>
+Here, <math>[n]_q</math> is the [[q-bracket]].
+==Properties==
+For real <math>q>1</math>, the function <math>e_q(z)</math> is an [[entire function]] of ''z''. For <math>q<1</math>, <math>e_q(z)</math> is regular in the disk <math>|z|<1/(1-q)</math>.
+Note  the inverse,  <math>~e_q(z)  ~   e_{1/q} (-z)        =1</math>.
+==Relations==
+For <math>q<1</math>, a function that is closely related is
+:<math>e_q(z) = E_q(z(1-q)).</math>
+Here, <math>E_q(t)</math> is a special case of the [[basic hypergeometric series]]:
+:<math>E_q(z) = \;_{1}\phi_0 (0;q,z) = \prod_{n=0}^\infty
+\frac {1}{1-q^n z} ~. </math>
+==References==
+* F. H. Jackson (1908), "On q-functions and a certain difference operator",  ''Trans. Roy. Soc. Edin.'',  '''46''' 253-281.
+* Exton, H. (1983), ''q-Hypergeometric Functions and Applications'', New York:  Halstead Press, Chichester: Ellis Horwood, 1983, ISBN 0853124914,  ISBN 0470274530, ISBN 978-0470274538
+* Gasper G.,  and Rahman, M.  (2004), ''Basic Hypergeometric Series'', Cambridge University Press, 2004, ISBN 0521833574
+{{DEFAULTSORT:Q-Exponential}}
+[[Category:Q-analogs]]
+[[Category:Exponentials]]

Schottky defect: Difference between revisions

Revision as of 04:34, 4 February 2014

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Definition

Properties

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Schottky defect: Difference between revisions

Revision as of 04:34, 4 February 2014

Definition

Properties

Relations

References

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