Abel function: Difference between revisions
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'''Abel function''' is a special kind of solution of the Abel equations, used to classify them as [[superfunction]]s, and formulate conditions of uniqueness. | |||
The ''Abel equation'' is a class of equations which can be written in the form | |||
:<math> | :<math> | ||
g(f(z))=g(z)+1 | g(f(z))=g(z)+1 | ||
</math> | </math> | ||
where function <math>f</math> is supposed to be given, and function <math>g</math> is expected to be found. | where function <math>f</math> is supposed to be given, and function <math>g</math> is expected to be found. | ||
This equation is closely related to the | This equation is closely related to the iterational equation | ||
:<math>H(F(z))=F(z+1)</math> | :<math>H(F(z))=F(z+1)</math> | ||
:<math>f(u)=v</math> | :<math>f(u)=v</math> | ||
which is also called "Abel equation" | which is also called "Abel equation". | ||
In general the Abel equation may have many solutions, and the additional requirements are | In general the Abel equation may have many solutions, and the additional requirements are necessary to select the only one among them. | ||
==superfunctions and Abel | ==superfunctions and Abel functions== | ||
===Definition 1: Superfunction=== | |||
If | If | ||
:<math> C \subseteq \mathbb{C}</math>, <math>D \subseteq \mathbb{C} </math> | :<math> C \subseteq \mathbb{C}</math>, <math>D \subseteq \mathbb{C} </math> | ||
Line 33: | Line 27: | ||
<math> u,v</math> [[superfunction]] of <math>F</math> on <math>D</math> | <math> u,v</math> [[superfunction]] of <math>F</math> on <math>D</math> | ||
===Definition 2: Abel function=== | |||
If | If | ||
:<math> f </math> is <math>u,v</math> superfunction on <math>F</math> on <math>D</math> | :<math> f </math> is <math>u,v</math> superfunction on <math>F</math> on <math>D</math> | ||
: <math> H \subseteq \mathbb{C}, <math> D \subseteq \mathbb{C}, | :<math> H \subseteq \mathbb{C}</math>, <math> D \subseteq \mathbb{C},</math> | ||
:<math>g</math> is holomorphic on <math>H</math> | |||
:<math>g(H)\subseteq D</math> | |||
:<math>f(g(z))=z \forall z \in H </math> | |||
:<math>g(u)=v, ~ u\in G</math> | |||
Then and only then | |||
:<math> g </math> id <math> u,v</math> Abel function in <math>F</math> with respect to <math>f</math> on <math>D</math>. | |||
==Examples== | ==Examples== | ||
<references/> | |||
==Properties of Abel functions== | |||
==Attribution== | |||
{{WPAttribution}} | |||
==References== | |||
<references/>[[Category:Suggestion Bot Tag]] |
Latest revision as of 13:54, 5 July 2024
Abel function is a special kind of solution of the Abel equations, used to classify them as superfunctions, and formulate conditions of uniqueness.
The Abel equation is a class of equations which can be written in the form
where function is supposed to be given, and function is expected to be found. This equation is closely related to the iterational equation
which is also called "Abel equation".
In general the Abel equation may have many solutions, and the additional requirements are necessary to select the only one among them.
superfunctions and Abel functions
Definition 1: Superfunction
If
- ,
- is holomorphic function on , is holomorphic function on
Then and only then
is
superfunction of on
Definition 2: Abel function
If
- is superfunction on on
- ,
- is holomorphic on
Then and only then
- id Abel function in with respect to on .
Examples
Properties of Abel functions
Attribution
- Some content on this page may previously have appeared on Wikipedia.