I composed a mathematical derivation of a renormalization of the total [latex]\Delta E_{0_t}[/latex] energy density as applied to the hidden energy in the vacuum today, which was i said what i said before.
Using inverse mathematical relationships, you can describe the functions [latex]g[/latex] and [latex]f[/latex] as renormalizable constants. The fundamental law of the comsological conservation states that you
cannot create, nor destroy matter, even though we have contradictory observational evidence that energy is created all the time from the vacuum. It is possible however this energy has already been measured, and
that this energy is not as spontaneous as it may seem [1].
Consider the equation, [latex](E=Mc^2)+(-Mc^2) \approx 0[/latex]. In this equation, one unit of positive mass is cancelled mathematically by a negative solution. Taking this to the symmetry of particle birth, before
synthesis was even initiated, it is currently believed that every positive particle of either mass or energy should have a corresponding negative solution, we call, the antiparticle. The two would conserve a gamma
photon if both particles where real, but if one was purely potential in nature, then it remains to equal upon addition to value zero, or approximately zero, analogous to the cosmological constant value.
Using a mathematical formula i worked out the now to explain this, i show first a recognizable form of association in the form of inverse relationships taking the form of [latex]f(g(x))[/latex], where g and f are assumed
to renormalize:
[latex](f \circ g)=(g \circ f)(x)=x^2[/latex]
let [latex]f=\Delta M_c c^2[/latex], where the lower case [latex]c[/latex] refers to the cosmological energy value, so Delta refers to the total amount (not change) and allow [latex]g=\Delta -M_c c^2[/latex]
then apply this mathematically into one:
[latex](\Delta M_c c^2 \circ \Delta -M_c c^2)=(\Delta -M_c c^2 \circ \Delta M_c c^2)[/latex]
so that you can replace the total energy of the universe [latex](\Delta M_c c^2 \circ \Delta -M_c c^2)[/latex] with the cosmological constant [latex]\Lambda[/latex], and solving the rest of the equations, you find that the cosmological
constant should have a value either near or exactly zero, through some process of renormalization, discluding somehow the resident energy in the vacuum. Perhaps being potential energy rather than active energy makes all the difference?
[1] - The Bohmian Interpretation of physics states that the universes wave function, and all those which followed till some end or infinity had already collapsed. The identification of one or two waves collapsing in given
by [latex]\int_{\Omega} |\psi|^2=1[/latex]. This means that everything that came into existence would not have had a spontaneous extension from the big bang, even if the big bang was spontaneous itself. The spontaneity of the
big bang released the ''determined'' path of every quantum system along its lightcone, which is itself a measure of relative history.
