On a relation between uniform coding and problems of the form DTIMEF(\(\cal F\)) =? DSPACEF(\(\cal F)\)

Abstract.

If uniform coding (Gödelization) of potentially infinite sequences of numbers can be performed in PSPACEF, then PSPACE = EXPTIME \(\neq\) EXPSPACE = 2-EXPTIME, and, for all p, we have \(p-\) EXPSPACE = \(p+1\)-EXPTIME; if it can be performed in LINSPACEF, we also have LINSPACE = DTIME\((2^{cx})\); the proof fails, when relativized to oracle-TM's. A by-product of this research is that PTIMEF is not closed under number-theoretic, limited, course-of-values recursion.