Symplectic Geometry Into Khovanov Geometry

When any given arbitrary superstring of discrete energy permittivity that is to display a cohomology, that is here to be of a symplectic geometry (to where such an initially stated superstring, is here to be of a closed-loop nature) is to smoothly convert into a respective superstring of discrete energy permittivity, that is here to display a cohomology that is of a Khovanov geometry (to where such an initially stated superstring, is here to be of either an open-loop or of an open-strand nature), then, that respective cohomology-related eigenstate -- that is here to be directly corresponding to the said superstring of discrete energy permittivity, that is here to be altering from initially working to bear the inferred closed-loop nature, Into subsequently working to bear the inferred tense of being either of an open-loop or of an open-strand-related nature, -- this will then consequently tend to go from working to bear a world-sheet that was initially shaped like a toroidal-related structure (as in a Gliosi-Sherk-Olive cohomology-related eigenstate) Into subsequently working to bear a world-sheet that is then to be shaped like a conical-related structure. Furthermore; since such a given arbitrary alteration in the general shape of a cohomology-related eigenstate, is here to be occurring in a manner that was proscribed of as being appertaining to having a smooth manner of conversion, -- then, such a change, over time, will then tend to occur in a relatively piecewise continuous manner. To Be Continued! Sincerely, Sam Roach.