Difference 'abc' theorem for entire functions and Difference analogue of truncated version of Nevanlinna second main theorem

In this paper, we focus on the difference analogue of Stothers-Mason theorem for entire functions of order less than 1, which can be seen as difference $abc$ theorem for entire functions with slow growth. We also obtain the difference analogue of truncated version of Nevanlinna second main theorem which reveals that meromorphic functions which are of hyper order less than 1 except periodic functions with period one cannot have too many points with long height in the complex plane. Both theorems depend on new definitions of height of shifting poles and shifting zeros of a given meromorphic function in a domain.