Some fractional integral and derivative formulas revisited

Abstract

In the most common literature about fractional calculus, we find that aDtα f( t) =\,aIt-α f( t) is assumed implicitly in the tables of fractional integrals and derivatives. However, this is not straightforward from the definitions of aItα f( t) and aDtα f( t) . In this sense, we prove that 0Dtα f( t) =\,0It-α f( t) is true for f( t) =t -1 t, and f( t) =eλ t, despite the fact that these derivations are highly non-trivial. Moreover, the corresponding formulas for -∞ Dtα t -δ and -∞ Itα t -δ found in the literature are incorrect; thus, we derive the correct ones, proving in turn that -∞ Dtα t -δ =\,-∞ It-α t -δ holds true