# Category:Summability methods

Here is a list of articles in the category **Summability methods** of the Computing portal that unifies foundations of mathematics and computations using computers. In mathematical analysis, a summability method is an alternative formulation of convergence of a series which is divergent in the conventional sense.

## Pages in category "Summability methods"

The following 31 pages are in this category, out of 31 total.

### A

- Abel's summation formula
*(computing)* - Abel's theorem
*(computing)* - Abel–Plana formula
*(computing)* - Abelian and Tauberian theorems
*(computing)* - Abelian and tauberian theorems
*(computing)*

### B

- Bochner–Riesz mean
*(computing)* - Borel summation
*(computing)*

### C

- Cauchy principal value
*(computing)* - Cesàro summation
*(computing)*

### D

- Darboux's formula
*(computing)* - Dimensional regularization
*(physics)* - Divergent series
*(computing)* - Divisor sum identities
*(computing)*

### E

- Euler summation
*(computing)* - Euler–Boole summation
*(computing)* - Euler–Maclaurin formula
*(computing)*

### H

- Hadamard regularization
*(computing)* - Hölder summation
*(computing)*

### L

- Lambert summation
*(computing)*

### M

- Mittag-Leffler summation
*(computing)*

### N

- Nachbin's theorem
*(computing)*

### P

- Perron's formula
*(computing)* - Poisson summation formula
*(computing)*

### R

- Ramanujan summation
*(computing)* - Regularization
*(physics)* - Resummation
*(physics)* - Riesz mean
*(computing)*

### S

- Series acceleration
*(computing)* - Silverman–Toeplitz theorem
*(computing)* - Summation by parts
*(computing)*

### Z

- Zeta function regularization
*(physics)*