The aim of this paper is to discuss the aggregation of an infinite sequence of inputs, ie, of non-decreasing functions such that (1) (with ) is fulfilled.

Sep 15, 2008 · The aim of this paper is to discuss the aggregation of an infinite sequence of inputs, i.e., of non-decreasing functions A ( ∞ ) : E N → E such ...

Infinitary aggregation functions acting on sequences and possessing some a priori given properties as additivity, comonotone additivity, symmetry, etc., ...

As a result, the sum, difference, product and ratio of two convergent sequences automatically converge (if we're not dividing by numbers close to zero), as ...

Missing: Aggregation | Show results with:Aggregation

Infinitary aggregation functions acting on sequences and possessing some a priori given properties as additivity, comonotone additivity, symmetry, etc., ...

Sep 5, 2021 · In this chapter we consider infinite sequences and series of constants and functions of a real variable.

The sum of an infinite arithmetic sequence is ∞, if d > 0- ∞, if d < 0. Let us now have a look at a few solved examples using the Infinite Series Formula.

General infinitary aggregation is also discussed (see [12, 19]), thus extending the results concerning aggregation of infinite sequences. Note that in such case ...

An infinite geometric series is the sum of an infinite geometric sequence. This series would have no last term.