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Correction to: Memory-dependent derivative approach onmagneto-thermoelastic transversely isotropic medium with two temperatures

International Journal of Mechanical and Materials Engineering volume 16, Article number: 3 (2021) Cite this article

The Original Article was published on 03 December 2020

Correction to: International Journal of Mechanical and Materials Engineering (2020) 15:10

https://doi.org/10.1186/s40712-020-00122-2

In the original publication of this article (Kaur et al. 2020), the equation 13 is incorrect, the correct equation 13 is as below. The original publication has been corrected.

$$ K\left(t-\xi \right)=1-\frac{2b}{\chi}\left(t-\xi \right)+\frac{a^2}{\chi^2}{\left(t-\xi \right)}^2=\left\{\begin{array}{c}1\\ {}1+\left(\xi -t\right)/\chi \\ {}\xi -t+1\\ {}{\left[1+\left(\xi -t\right)/\chi \right]}^2\end{array}\right.{\displaystyle \begin{array}{c}a=0,b=0\\ {}a=0,b=1/2\\ {}a=0,b=\chi /2\\ {}a=1,b=1\end{array}} $$
(13)

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Authors and Affiliations

  1. Department of Mathematics, Government College for Girls, Palwal, Kurukshetra, Haryana, India

    Iqbal Kaur

  2. Department of Basic and Applied Sciences, Punjabi University, Patiala, Punjab, India

    Parveen Lata

  3. Kurukshetra University, Kurukshetra, Haryana, India

    Kulvinder Singh

Authors
  1. Iqbal Kaur
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  2. Parveen Lata
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  3. Kulvinder Singh
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Correspondence to Iqbal Kaur.

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Kaur, I., Lata, P. & Singh, K. Correction to: Memory-dependent derivative approach onmagneto-thermoelastic transversely isotropic medium with two temperatures. Int J Mech Mater Eng 16, 3 (2021). https://doi.org/10.1186/s40712-021-00126-6

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  • DOI: https://doi.org/10.1186/s40712-021-00126-6