Abstract

PurposeTo identify the properties of novel discrete differential operators of the first- and the second-order for periodic and two-periodic time functions.Design/methodology/approachThe development of relations between the values of first and second derivatives of periodic and two-periodic functions, as well as the values of the functions themselves for a set of time instants. Numerical tests of discrete operators for selected periodic and two-periodic functions.FindingsNovel discrete differential operators for periodic and two-periodic time functions determining their first and the second derivatives at very high accuracy basing on relatively low number of points per highest harmonic.Research limitations/implicationsReduce the complexity of creation difference equations for ordinary non-linear differential equations used to find periodic or two-periodic solutions, when they exist.Practical implicationsApplication to steady-state analysis of non-linear dynamic systems for solutions predicted as periodic or two-periodic in time.Originality/valueIdentify novel discrete differential operators for periodic and two-periodic time functions engaging a large set of time instants that determine the first and second derivatives with very high accuracy.

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