Addition to the Article with Stepan Moskaliuk on the Inter Relationship of General Relativity and (Quantum) Geometrodynamics, via Use of Metric Uncertainty Principle

We will be using, the inputs from [1] extensively as a way to intertwine the predictions as to a HUP connected with the metric tensor of space-time and the resulting initial conditions for space-time according to Geometrodynamics. The end result will be that we are supplying initial conditions which cannot be obtained, by other means. We also will quantify via a version of dust dynamics, how this affects candidate DM and possibly DE contributions to initial cosmological conditions. To do this, we will review the concepts used in both the Heisenberg Uncertainty principle, for metric tensors, and the Geometrodynamics equations used. The conclusion of what we are talking about is use of the HUP, for metric tensors to form bounds on the Getrodynamics equations in the pre Planckian space-time era. Abstract


HUP for Metric Tensors Used
We will be examining a Friedmann equation for the evolution of the scale factor, using explicitly two cases, one case being when the acceleration of expansion of the scale factor is kept in, another when it is out, and the intermediate cases of when the acceleration factor, and the scale factor is important but not dominant. In doing so we will be tying it in our discussion with the earlier work done on the HUP but from the context of how the acceleration term will affect the HUP, and making sense of ( ) ( ) ( Namely we will be working with i.e. the fluctuation 1 tt g δ  dramatically boost initial entropy. Not what it would be if 1 tt g δ ≈ . The next question to ask would be how could one actually have In short, we would require an enormous "inflaton" style φ valued scalar function, Here, we are using the following approximation as to Kinetic energy in the beginning of the expansion of the universe.
Then, up to first order, we could approximate, with H.O.T. being higher order terms 3 3 .
This Equation (6) will be considerably refined in the subsequent document.

The Role of Geometrodynamics. And How Equation (2) May Be Applied
Here, we can also, from [1] assign a density functional and then a change of energy as given by ( ) This change of energy will then be put into Equation (2) with the result that.
Here the subscript k, as in Equation (8) is by [1] a "particle count" and we will refer to this heavily in the rest of this document. If we have Equation (8) we will, if we have an emergent field reference using a change in energy, in the Pre Planckian domain as Or, if the inequality is strictly adhered to The smallness of the initial scale factor would be of the order of  (9) as an estimator, that the following has to be done to insure in pre Planckian space time, for the following to hold: i.e. the violation of an uncertainty principle for commences for any situation which implies restraints on 74 2 2 10 1 1 For the problem represented by Equation (10a) to hold it would mean that the following Pre-Planckian Potential energy would be then small when the following Potential energy as given in Equation (11) is much smaller than the Kinetic energy given in Equa- From inspection, for Equation (11) to hold, for our physical system we would want Equation (10) to hold which would mean an extremely small Potential energy, as op-posed to the large value of the Kinetic energy given in Equation (4). Hence the role of Geometrodynamics given in Equation (7) and Equation (8), will in the case of a quartic potential imply that Equation (11) as Potential energy is much smaller than the kinetic energy as represented for Pre Planckian space-time physics.

Discussion and Conclusion
What we are doing is confirming the material given in [1] as well as giving an explanation for [2].
The potential used, the quartic, is the simplest version of the potential systems in [1] and the cases of non quartic potential should be examined fully, as part of a comprehensive study. This will be part of the research project which the authors will initiate in future publications. We should keep this discussion and the discussion of scalar fields separate from the ideas given in inflation, namely of the fluctuations not necessarily having an upper bound of Since our modeling is not predicated upon the inflationary model of cosmology but which is addressing the issue brought up in [2], which is the contribution of Pre Planckian space time to cosmological evolution we wish to adhere to non inflationary treatments as to Equation (11) and Equation (12) but will adhere to the questions poised at the beginning of this document. Furthermore we will adhere to, in future documents in delineating a departure from the standard treatment of the evolution of the scalar field, as given in conventional inflation cosmology as the following This has a quasi "quantum mechanical" effective white noise introduced term ( ) t ξ , and is similar to ( ) t ξ in a first order differential equation being a "driving" term to a quasi chaotic oscillatory behavior to the scalar field. We argue that this Equation (13) in [3] is wrong, albeit well motivated by conventional inflationary cosmology and part of our future discussion will be in, for the Pre Planckian regime of space time as partly brought up in [4] discussing what we are putting in instead as a replacement. This Equation (13) contravenes our description of Kinetic energy as the dominant term in Pre Planckian space-time physics which deserves future developments for establishing experimental measurements.