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Continuous optimization

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Continuous optimization is a branch of optimization in applied mathematics.^[1]

As opposed to discrete optimization, the variables used in the objective function are required to be continuous variables—that is, to be chosen from a set of real values between which there are no gaps (values from intervals of the real line). Because of this continuity assumption, continuous optimization allows the use of calculus techniques.

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^ V. Jeyakumar; Alexander M. Rubinov (9 March 2006). Continuous Optimization: Current Trends and Modern Applications. Springer Science & Business Media. ISBN 978-0-387-26771-5.

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