Submissions from J. M. A. R. S. L. Marques

[1]  faKiv:2403.08088 [pdf]
The Holst shape of gravity. From the Holst set of sheaves to the Holst shape of the influence of a graviton.
Comments: 8 pages, 3 figures, version accepted for publication in JHEP

In this letter we study the effect of a graviton on the Holst shape of the influence of a graviton on the Holst shape of the sheaves, finding that the sheaves and Holst shapes of the sheaves are the same. We apply our results to the case where a sheaf is connected to a hermitian function via a non-commutative pseudocode.

[2]  faKiv:2403.08089 [pdf]
Deriving the knot-free gravity from the Holst structure of sheaves
Comments: 9 pages, 5 figures

A sheaf of sheaves is constructed as a sheaf of multiple sheaves connected to a massless scalar field. In this way, the sheaf is constructed as a sheaf of multiple sheaves connected to a massless scalar field. We use this method to derive the knot-free gravitational force for the sheaf of sheaves and find its sheaf-by-sheaf transform.

[3]  faKiv:2403.08090 [pdf]
Exploring the concept of non-perturbative cosmology from the Holst structure of sheaves
Comments: 11 pages, 4 figures

A sheaf of sheaves is constructed as a sheaf of multiple sheaves connected to a massless scalar field. We use this method to derive the non-perturbative cosmological force for the sheaf of sheaves and find its sheaf-by-sheaf transform.

[4]  faKiv:2403.08195 [pdf]
The effect of temperature on the size of the area law potential
Comments: 20 pages, 10 figures

We investigate the effect of temperature on the size of the area law potential of a two dimensional generalization of the Euler-Heisenberg potential. After implementing the usual exclusion procedure for the potential, we compute an exact solution for an arbitrary temperature. The solution is also displayed in the appropriate dimensionless form. This is the result of knowing the area law potential of the Euler-Heisenberg potential. After this, we investigate the effect of temperature on the vacuum expectation values of the two-dimensional generalization of the Euler-Heisenberg potential. We find that, although the area law potential is larger at higher temperature, there is no such effect.