Quantum field theory is a postulate that the most difficult "important" problem in mathematics--the Riemann Hypothesis--is the solution to the "hard incompleteness" problem in computer science.
In other words: the draw-distance that is equivalent to the surface area of a transfinite space is also equal to the surface area of a wavelet (complex number).
The most difficult problem in computer science is the hard problem of indeterminacy (also called the hard problem of incompleteness).
The most 'complete' difficult problem in mathematics is the Riemann Hypothesis: the idea that the surface area of a transfinite space is equal to the draw-distance between two trans-finite spaces and that that draw-distance is equivalent to the surface area of the complex number or wavelet between the transfinite space and its adjacent transfinite space.
Quantum field theory speculates that equivalency equates to equality by hypothesizing that the draw-distance between two transfinite spaces being equivalent to the surface area of a wavelet ('half-moon') is a statement of equality between a polynomial-complete time-series and non-polynomial complete time-series.
In other words; equality is a statement of equivalency.