Q-exponential

In combinatorial mathematics, the q-exponential is the q-analog of the exponential function.

Definition

The q-exponential $e_q(z)$ is defined as: $e_q(z)=sum_{n=0}^infty frac{z^n}{ [n] _q!} = sum_{n=0}^infty frac{z^n (1-q)^n}{(q;q)_n} = sum_{n=0}^infty z^nfrac{(1-q)^n}{(1-q^n)(1-q^{n-1}) cdots (1-q)}$

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

: $left(frac{d}{dz}
ight)_q e_q(z) = e_q(z)$

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

: $left(frac{d}{dz}
ight)_q z^n = z^{n-1} frac{1-q^n}{1-q}= [n] _q z^{n-1}.$

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 $|z|<1/(1-q)$ .

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:

: $E_q(z) = ;_{1}phi_0 (0;q,z) = prod_{n=0}^infty frac {1}{1-q^n z}$

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