Essay VI derives the geometric structure of nothing's kinetic volatility — the quantitative account of how much of nothing's structural space remains permanently inaccessible to the helical worldline, why it remains inaccessible, and what structural consequences this inaccessibility forces. The three clearances Iₘin, σ, Λ, established as static spatial margins in Essays I–IV and inverted into kinetic functions in Essay V, are now read as kinetic volatilities: the exact fractions of nothing's structural space that the helical worldline structurally cannot fill at each ordinal position. Their geometric behaviour under the self-application of the Inverted Ratio generates three new structural results that could not be derived from the static or kinematic registers alone. Part 0 establishes the three volatilities as kinetic complements: VS = Iₘin = 1/5 (Source amplitude deficit), VB = σ = 2/5 (Boundary denominator deficit), VR = Λ = 0. 2984 (Remainder drive deficit). Part I derives the Minimum Volatility Theorem (T. MVT): the Boundary volatility σ must strictly exceed the Source volatility Iₘin — σ > Iₘin — for the kinetic margin Φ to remain positive. This is a purely algebraic necessity from nothing's clearances, with no free parameters. Part II derives the Boundary Resolution Frame (R = σ/c = 40) as the volatility macro-period: the ordinal span in which the helical worldline traverses exactly one Boundary volatility width axially. Part III derives the exact arc coverage: per ordinal step, the worldline attempts to cover Gᵣaw/δ = 28/3 = 9. 333 lattice positions of arc; it addresses 9 (Gₛnap/δ) ; the permanent sub-lattice gap is 1/3 per step. Part IV derives the Volatility Identity: Λ = (1 - dR) - Φ — the Remainder volatility equals the Remainder arc deficit minus the kinetic margin. This is a new structural identity not previously established. Part V derives the Forbidden Ceiling as the exact kinetic exhaust rate: per ordinal step, the structural exhaust εₛnap = 1/30 carries information content -log2 (εₛnap/δ) = log2 (3) = the Forbidden Ceiling. The kinetic structure exhausts exactly the Forbidden information per step — the informational expression of why nothing's self-application can never saturate its own forbidden ceiling. Parts VI derives the Saturation Threshold Nₛat = n²/cₛteps = 25 from nothing's lattice combinatorics.
Eugene Pretorius (Thu,) studied this question.