Sumudu transform

Integral transform introduced in 1990

The Sumudu transform is an integral transform introduced in 1990 by G K Watagala.[1][2][3] It is defined as the set as [4][5][6]

S = { f ( t ) :∋ M , p , q > 0 , | f ( t ) | = M exp ( 1 / u ) } {\displaystyle S=\{f(t):\ni M,p,q>0,|f(t)|=M\exp(1/u)\}}

where p u q {\displaystyle p\leq u\leq q}

and the Sumudu transform is defined as

A [ f ( t ) ] = 1 u 0 f ( t ) exp ( 1 u ) d t . {\displaystyle A[f(t)]={\frac {1}{u}}\int _{0}^{\infty }f(t)\exp \left({\frac {1}{u}}\right)\,dt.}

Relationship with other transforms

Sumudu transform is 1/u Laplace transform S [ f ( t ) ] ( u ) = 1 u L [ f ( t ) ] ( 1 u ) {\displaystyle S[f(t)](u)={\frac {1}{u}}L[f(t)]({\frac {1}{u}})} And with u2 Elzaki transform S [ f ( t ) ] ( u ) = u 2 E [ f ( t ) ] ( u ) {\displaystyle S[f(t)](u)=u^{2}E[f(t)](u)}

References

  1. ^ Watugala, G. K. (January 1993). "Sumudu transform: a new integral transform to solve differential equations and control engineering problems". International Journal of Mathematical Education in Science and Technology. 24 (1): 35–43. doi:10.1080/0020739930240105. ISSN 0020-739X.
  2. ^ Asiru, Muniru Aderemi (May 2002). "Further properties of the Sumudu transform and its applications". International Journal of Mathematical Education in Science and Technology. 33 (3): 441–449. doi:10.1080/002073902760047940. ISSN 0020-739X. S2CID 123671820.
  3. ^ Zhang, Jun; Shen, Fangyang (2018). "Sumudu Transform for Automatic Mathematical Proof and Identity Generation". In Latifi, Shahram (ed.). Information Technology - New Generations. Advances in Intelligent Systems and Computing. Vol. 558. Cham: Springer International Publishing. pp. 677–683. doi:10.1007/978-3-319-54978-1_85. ISBN 978-3-319-54978-1.
  4. ^ Kılıcman, A.; Gadain, H. E. (2010-06-01). "On the applications of Laplace and Sumudu transforms". Journal of the Franklin Institute. 347 (5): 848–862. doi:10.1016/j.jfranklin.2010.03.008. ISSN 0016-0032.
  5. ^ Watugala, G. K. (January 1993). "Sumudu transform: a new integral transform to solve differential equations and control engineering problems". International Journal of Mathematical Education in Science and Technology. 24 (1): 35–43. doi:10.1080/0020739930240105. ISSN 0020-739X.
  6. ^ Kapoor, Mamta (June 15, 2023). "Sumudu Transform for Time Fractional Physical Models an Analytical Aspect". Journal of Applied Analysis & Computation. 13 (3): 1255–1273. doi:10.11948/20220096. ISSN 2156-907X.