Wolfram Function Repository
Instant-use add-on functions for the Wolfram Language
Warning: This resource is provisional
Function Repository Resource:
Meijer
Convert a mathematical expression into an equivalent expression with head MeijerG
Contributed by:
Paco Jain & Oleg Marichev
ResourceFunction["MeijerGForm"][f,z] expresses the function f, written in terms of the independent variable z, in terms of MeijerG when possible. |
Examples
Basic Examples (2)
Get the Meijer-G form of a trigonometric function:
| In[1]:= | ![ResourceFunction["MeijerGForm"][Sin[z], z]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/2da5ebe80d1bf0c0.png){kind=small} |
| Out[1]= |  |
Activating the result allows the MeijerG to evaluate, giving back the original function:
| In[2]:= | ![Activate[%]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/585dfc1bb7ad77e4.png){kind=small} |
| Out[2]= |  |
Represent BesselJ in terms of MeijerG:
| In[3]:= | ![ResourceFunction["MeijerGForm"][BesselJ[1, a x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/370ca0e6bb8955cd.png){kind=small} |
| Out[3]= |  |
Recover the original function using Activate:
| In[4]:= | ![Activate[%]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/0f7539cbc7c1aeb9.png){kind=small} |
| Out[4]= |  |
Scope (10)
Rational functions:
| In[5]:= | ![ResourceFunction["MeijerGForm"][1/(x^2 + 1), x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/3d7c17bb89630c13.png){kind=small} |
| Out[5]= |  |
| In[6]:= | ![ResourceFunction["MeijerGForm"][1/(2 x + 3), x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/7bdf460e8bd3ba88.png){kind=small} |
| Out[6]= |  |
Algebraic functions:
| In[7]:= | ![ResourceFunction["MeijerGForm"][1/(Sqrt[x] + 1), x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/281265204c337d9c.png){kind=small} |
| Out[7]= |  |
Trigonometric functions:
| In[8]:= | ![ResourceFunction["MeijerGForm"][Sin[a x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/20c29ce2e204f223.png){kind=small} |
| Out[8]= |  |
| In[9]:= | ![ResourceFunction["MeijerGForm"][Cos[a x + d], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/649927cb20112d1e.png){kind=small} |
| Out[9]= |  |
Linear combination of trigonometric functions:
| In[10]:= | ![ResourceFunction["MeijerGForm"][2 Sin[x] + Cos[x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/3875ab131409a958.png){kind=small} |
| Out[10]= |  |
Inverse trigonometric and hyperbolic functions:
| In[11]:= | ![ResourceFunction["MeijerGForm"][ArcSin[x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/0aea79ccf64e2227.png){kind=small} |
| Out[11]= |  |
| In[12]:= | ![ResourceFunction["MeijerGForm"][ArcTanh[x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/4ba8afc57630b2d9.png){kind=small} |
| Out[12]= |  |
Airy functions:
| In[13]:= | ![ResourceFunction["MeijerGForm"][AiryAi[x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/158da2abaca13c3e.png){kind=small} |
| Out[13]= |  |
| In[14]:= | ![ResourceFunction["MeijerGForm"][AiryBi[x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/317777de1132c303.png){kind=small} |
| Out[14]= |  |
Bessel functions:
| In[15]:= | ![ResourceFunction["MeijerGForm"][BesselJ[n, x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/4b14a3da0eab02b5.png){kind=small} |
| Out[15]= |  |
| In[16]:= | ![ResourceFunction["MeijerGForm"][BesselK[n, x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/2987d2071d409f9a.png){kind=small} |
| Out[16]= |  |
Legendre functions:
| In[17]:= | ![ResourceFunction["MeijerGForm"][LegendreQ[n, x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/74e5b9749a43be03.png){kind=small} |
| Out[17]= |  |
Hypergeometric functions:
| In[18]:= | ![ResourceFunction["MeijerGForm"][Hypergeometric2F1[a, b, c, x], x]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/3be999d276028cc5.png){kind=small} |
| Out[18]= |  |
Elliptic functions:
| In[19]:= | ![ResourceFunction["MeijerGForm"][EllipticK[m], m]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/0221050588447794.png){kind=small} |
| Out[19]= |  |
| In[20]:= | ![ResourceFunction["MeijerGForm"][EllipticE[m], m]](https://www.wolframcloud.com/obj/resourcesystem/images/e45/e45839bd-2f1b-4218-957d-21cd86a0bece/1-1-2/6fb569d624944214.png){kind=small} |
| Out[20]= |  |
Publisher
Version History
- 1.2.1 – 05 April 2024
- 1.2.0 – 14 August 2023
- 1.1.2 – 07 November 2022
- 1.1.1 – 10 October 2022
- 1.1.0 – 10 October 2022
- 1.0.0 – 23 August 2022
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This work is licensed under a Creative Commons Attribution 4.0 International License