unconditional convergence

(redirected from Unconditionally convergent)

unconditional convergence

[¦ən·kən′dish·ən·əl kən′vər·jəns]
(mathematics)
A convergent series converges unconditionally if every series obtained by rearranging its terms also converges; equivalent to absolute convergence.
References in periodicals archive ?
summation]over(i=1)] (H) [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] f is unconditionally convergent, define the function {[f.
summation over (i=1)] (H) [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] f is unconditionally convergent, for any [epsilon] > 0, there is N [member of] N such that
i]]) is unconditionally convergent, then The function f is Henstock integrable on [a, b]