Statements (12)
| Predicate | Object |
|---|---|
| gptkbp:instanceOf |
gptkb:mathematical_concept
|
| gptkbp:appliesTo |
power series with non-negative coefficients
|
| gptkbp:describes |
singularities of power series with non-negative coefficients
|
| gptkbp:field |
gptkb:mathematics
complex analysis |
| gptkbp:namedAfter |
gptkb:Alfred_Pringsheim
|
| gptkbp:publicationYear |
1894
|
| gptkbp:publishedIn |
gptkb:Mathematische_Annalen
|
| gptkbp:state |
If a power series with non-negative coefficients has radius of convergence R, then the point z=R is a singularity of the function defined by the series
|
| gptkbp:bfsParent |
gptkb:Alfred_Pringsheim
|
| gptkbp:bfsLayer |
7
|
| https://www.w3.org/2000/01/rdf-schema#label |
Pringsheim's theorem
|