Fuzzy Integro Dynamic Equations on Time Scales using Fuzzy Laplace Transform Method

In this paper, we developed the calculus of fuzzy Laplace transforms under Hukuhara delta derivative for the fuzzy valued functions on time scales T. We developed the fundamental properties and related theorems which help to establish the relation between the fuzzy Laplace transforms of a fuzzy valued function on T and Hukuhara delta derivative to solve first order fuzzy dynamic equations on time scales. These results generalize the results of fuzzy Laplace transforms on fuzzy differential and difference calculus. There are many other time scales than set of Real numbers and integers, hence one can get much more general result. Also, we extended our results to study the fuzzy integro dynamic equation on time scales with kernel of convolution type.