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Regularization

is an option for Sum and Product that specifies what type of regularization to use.

Details

Regularization affects only results for divergent sums and products.
The following settings can be used to specify regularization procedures for sums of the form :
"Abel"

"Borel"

"Cesaro"

"Dirichlet"
For alternating sums , the setting "Euler" gives .
The following setting can be used to specify a regularization procedure for products :
"Dirichlet"
Regularization->None specifies that no regularization should be used.
For multiple sums and products, the same regularization is by default used for each variable.
Regularization->{reg₁,reg₂,…} specifies regularization reg_i for the i variable.

Examples

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Basic Examples (3)

The following sum does not converge:

Using Abel regularization will produce a finite value:

In this case the Abel-regularized sum does not exist:

However, the stronger Borel regularization produces a finite value:

A regularized value of a divergent product:

Scope (5)

Apply Abel regularization to sum a divergent polynomial-exponential series:

Use Borel regularization to sum a divergent hypergeometric series:

Apply Cesaro regularization to sum a divergent trigonometric series:

Sum a divergent logarithmic series using Dirichlet regularization:

Apply Euler regularization to sum a divergent geometric series:

Applications (1)

The regularized sum of all the natural numbers is :

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