Detail publikačního výsledku

A New Semi-analytical Approach for Numerical Solving of Cauchy Problem for Differential Equations with Delay

REBENDA, J.; ŠMARDA, Z.; KHAN, Y.

Originální název

A New Semi-analytical Approach for Numerical Solving of Cauchy Problem for Differential Equations with Delay

Anglický název

A New Semi-analytical Approach for Numerical Solving of Cauchy Problem for Differential Equations with Delay

Druh

Článek WoS

Originální abstrakt

In the paper, we present new semi-analytical approach for FDE’s consisting in combination of the method of steps and a technique called differential transformation method (DTM). This approach reduces the original Cauchy problem for delayed or neutral differential equation to Cauchy problem for ordinary differential equation for which DTM is convenient and efficient method.

Anglický abstrakt

In the paper, we present new semi-analytical approach for FDE’s consisting in combination of the method of steps and a technique called differential transformation method (DTM). This approach reduces the original Cauchy problem for delayed or neutral differential equation to Cauchy problem for ordinary differential equation for which DTM is convenient and efficient method.

Klíčová slova

Differential transformation method; method of steps; Cauchy problem; Delayed differential equations

Klíčová slova v angličtině

Differential transformation method; method of steps; Cauchy problem; Delayed differential equations

Autoři

REBENDA, J.; ŠMARDA, Z.; KHAN, Y.

Rok RIV

2018

Vydáno

11.11.2017

Místo

Srbsko

ISSN

0354-5180

Periodikum

Filomat

Svazek

31

Číslo

15

Stát

Srbská republika

Strany od

4725

Strany do

4733

Strany počet

9

BibTex

@article{BUT141239,
  author="Josef {Rebenda} and Zdeněk {Šmarda} and Yasir {Khan}",
  title="A New Semi-analytical Approach for Numerical Solving of Cauchy Problem for Differential Equations with Delay",
  journal="Filomat",
  year="2017",
  volume="31",
  number="15",
  pages="4725--4733",
  doi="10.2298/FIL1715725R",
  issn="0354-5180"
}