Chain sequence theory of continued fractions , a chain sequence infinite sequence of non-negative real numbers chained together with another sequence of non-negative real numbers by the equationsg n g n convergence problem - both in connection with the parabola theorem , and also as part of the theory of positive definite continued fractions.infinite continued fraction of Worpitzky's theorem contains a chain sequence. A closely related theorem shows thatconverges uniformly on the closed unit disk |z | ≤ 1 if the coefficients are a chain sequence.An example The sequence appears as a limiting case in the statement of Worpitzky's theorem. Since this sequence is generated by setting g 0 = g 1 = g 2 = ... = ½, it is clearly a chain sequence. This sequence has two important properties.Since f = x − x 2 is a maximum when x = ½, this example is the "biggest" chain sequence that can be generated with a single generating element; or, more precisely, if = , and x < ½, the resulting sequence will be an endless repetition of a real number y that is less than ¼. The choice g n Notice that setting
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