Divergent geometric series mathematics , an infinite geometric series of the formdivergent if and only if | r | ≥ 1 . Methods for summation of divergent series are sometimes useful , and usually evaluate divergent geometric series to a sum that agrees with the formula for the convergent casesummation method that possesses the properties of regularity, linearity, and stability .Examples In increasing order of difficulty to sum:1 − 1 + 1 − 1 + · · · , whose common ratio is −1 1 − 2 + 4 − 8 + · · ·, whose common ratio is −2 1 + 2 + 4 + 8 + · · ·, whose common ratio is 2 1 + 1 + 1 + 1 + · · ·, whose common ratio is 1.Motivation for study summation methods produce the geometric series formula for which common ratios. One application for this information is the so-called Borel-Okada principle : If a regular summation method sums Σz n z in a subset S of the complex plane , given certain restrictions on S , then the method also gives the analytic continuation of any other function on the intersection of S with the Mittag-Leffler star for f .Ordinary summation succeeds only for common ratios |z | < 1.Closed unit disk Cesàro summation Abel summationLarger disks Euler summationHalf-plane Borel summable for every z with real part < 1. Any such series is also summable by the generalized Euler method for appropriate a .Shadowed plane Certain moment constant methods besides Borel summation can sum the geometric series on the entire Mittag-Leffler star of the function 1/, that is, for all z except the ray z ≥ 1.Everywhere
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