Transdifferential and Transintegral Calculus

The set of transreal numbers is a superset of the real numbers. It totalises real arithmetic by defining division by zero in terms of three definite, non-finite numbers: positive infinity, negative infinity and nullity. Elsewhere, in this proceedings, we extended continuity and limits from the real domain to the transreal domain, here we extended the real derivative to the transreal derivative. This continues to demonstrate that transreal analysis contains real analysis and operates at singularities where real analysis fails. Hence computer programs that rely on computing derivatives -- such as those used in scientific, engineering and financial applications -- are extended to operate at singularities where they currently fail. This promises to make software, that computes derivatives, both more competent and more reliable.

We also extended the integration of absolutely convergent functions from the real domain to the transreal domain.