Let's say that one were to consider (e^(Ricci Flow)) to arbitrarily be denoted by a given arbitrary cartesian function, that we will, for simplicity, term of here as being called "u." (In meters^2/seconds^2, in one tense or another of a directoral). The inverse curl of (e^(del(the Ricci Flow))) is then to be congruent in symmetrical effect, to the inverse secant of
(e^(the Ricci Flow)). I will continue with the suspense later! To Be Continued! Sam Roach.
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