Difference between revisions of "Dynamic equation for nabla cosh and nabla sinh"
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m (Tom moved page 2nd order dynamic equation for nabla cosh and nabla sinh to Dynamic equation for nabla cosh and nabla sinh) |
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Latest revision as of 23:38, 11 December 2016
Theorem
If $\gamma > 0$ with $\alpha^2\nu \in \mathcal{\nu}$, a regressive function, then the dynamic equation $$y^{\nabla \nabla}-\gamma^2 y=0$$ is solved by the functions $\widehat{\cosh}_{\gamma}(\cdot,s)$ and $\widehat{\sinh}_{\gamma}(\cdot,s)$, where $\widehat{\cosh}_{\gamma}$ denotes the nabla cosh and $\widehat{\sinh}_{\gamma}$ denotes the delta sinh.
