An efficient analytical scheme for fuzzy conformable fractional‎ differential equations arising in physical sciences

doi:10.21203/rs.3.rs-1100676/v1

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An efficient analytical scheme for fuzzy conformable fractional‎ differential equations arising in physical sciences

https://doi.org/10.21203/rs.3.rs-1100676/v1

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‎This article describes the fuzzy conformable fractional derivative which is based on generalized Hukuhara differentiability‎. On these topics‎, ‎we prove a number of properties concerning this type of differentiability‎. ‎In addition‎, ‎fuzzy conformable‎ ‎Laplace transforms are used to obtain analytical solutions to the fractional differential equation‎. Through the use of several‎ ‎practical examples‎, ‎such as the fuzzy conformable fractional growth equation‎, ‎the fuzzy conformable fractional one-compartment‎ ‎model‎, ‎and the fuzzy conformable fractional Newton's law of cooling‎, ‎we demonstrate the effectiveness and efficiency of the approaches‎.

Generalized Hukuhara conformable fractional derivative

fuzzy conformable Laplace transform

fuzzy conformable fractional growth equation

one-compartment fuzzy conformable fractional model

fuzzy conformable fractional Newton’s law of cooling

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An efficient analytical scheme for fuzzy conformable fractional‎ differential equations arising in physical sciences

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