When a (mass-bearing) cohesive set of discrete energy quanta, is to bear the general condition of being of an isotropically stable nature, then, such a said set of energy quanta, is consequently to work to bear the general tendency, of working to exhibit a tense, of what is known of as being a "group action." An isotropically stable (mass-bearing) cohesive set of discrete energy quanta, is more likely to tend to work to exhibit a De Rham cohomology than a Dolbeault cohomology; whereas, -- an isotropically unstable (mass-bearing) cohesive set of discrete energy quanta, is more likely to tend to work to exhibit a Dolbeault cohomology than a De Rham cohomology. Therefore -- "teams" of discrete energy, that work to bear a relatively strong tense, of exhibiting the general physical condition of displaying a "group action," tend to have more of an inclination, of tending to work to form a De Rham cohomology than a Dolbeault cohomology; Whereas, -- "teams" of discrete energy, that work to bear a relatively weak tense, of exhibiting the general physical condition of displaying a "group action," tend to have more of an inclination, of tending to work to form a Dolbeault cohomology than a De Rham cohomology. I will continue with the suspense later! Sincerely, SAMUEL DAVD ROACH.
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