Chapter 21 - Square Root of Nothing

Abstract

This chapter illustrates the equivalence between differential form and the matrix form of the logical momentum. The chapter states that the logical momentum operator is hidden in a vacuum and must be extracted. It is a divisor of zero and can be created by the square root polarization of the logical vacuum. Solving these equations requires determining the ground state of the system, which is a vacuum. Because logical differentiation can take a matrix form, it is applicable not only for continuous functions but also in the discrete logic. Because the momentum comes from nothing, there is also a reverse process in which the squared momentum should self-destruct in accordance with the nilpotence property. In modem physics the vacuum is recognized as a fundamental structure of major importance. The quantum field is a dynamical system characterized by the birth and death of particles, where the particles are created out of the void, and vanish back into the vacuum. The behavior of the logical momentum closely parallels the effects of the physical vacuum, which is illustrated in the chapter.