Difference between revisions of "Delta cosh"
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− | Let $p$ and $-\mu p^2$ be [[regressive function | + | Let $p \in C_{rd}$ and $-\mu p^2$ be a [[regressive function]]. Then the $\Delta$-hyperbolic cosine function is defined by |
$$\cosh_p(t,s) = \dfrac{e_p(t,s)+e_{-p}(t,s)}{2}.$$ | $$\cosh_p(t,s) = \dfrac{e_p(t,s)+e_{-p}(t,s)}{2}.$$ | ||
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− | + | <div align="center"> | |
− | <div | + | <gallery> |
− | < | + | File:Integercosh,a=0.6,s=0plot.png|Graph of $\cosh_{0.6}(t,0;\mathbb{Z})$. |
− | + | </gallery> | |
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</div> | </div> | ||
− | + | =Properties= | |
− | < | + | [[Derivative of delta cosh]]<br /> |
− | + | [[Delta cosh minus delta sinh]]<br /> | |
− | + | [[Delta hyperbolic trigonometric second order dynamic equation]]<br /> | |
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− | </ | ||
=Examples= | =Examples= | ||
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+ | <center>{{:Delta special functions footer}}</center> | ||
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+ | [[Category:specialfunction]] | ||
+ | [[Category:Definition]] |
Latest revision as of 14:13, 28 January 2023
Let $p \in C_{rd}$ and $-\mu p^2$ be a regressive function. Then the $\Delta$-hyperbolic cosine function is defined by $$\cosh_p(t,s) = \dfrac{e_p(t,s)+e_{-p}(t,s)}{2}.$$
Properties
Derivative of delta cosh
Delta cosh minus delta sinh
Delta hyperbolic trigonometric second order dynamic equation
Examples
$\mathbb{T}=$ | $\cosh_1(t,0)=$ |
$\mathbb{R}$ | $\cosh_1(t,0)=\cosh(t)$ |
$\mathbb{Z}$ | |
$h\mathbb{Z}$ | $\cosh_1(t,0)=\dfrac{1}{2}\left( (1-h)^{\frac{t}{h}} + (1+h)^{\frac{t}{h}}\right) = \displaystyle\sum_{k=0}^{\infty} h_{2k}(t,0) $ |
$\mathbb{Z}^2$ | |
$\overline{q^{\mathbb{Z}}}, q > 1$ | |
$\overline{q^{\mathbb{Z}}}, q < 1$ | |
$\mathbb{H}$ |
$\Delta$-special functions on time scales | ||||||
$\cos_p$ |
$\cosh_p$ |
$e_p$ |
$g_k$ |
$h_k$ |
$\sin_p$ |
$\sinh_p$ |