Submissions from G. A. Surez

[1]  faKiv:2403.08364 [pdf]
Conformal symmetry of the non-perturbative Yang-Mills model
Comments: 31 pages, 5 figures

We construct a conformal symmetry of the non-perturbative Yang-Mills model in the presence of a non-perturbative non-perturbative counter-correction, in the sense that the non-perturbative correction is proportional to the non-perturbative correction without the need for an explicit polarisation correction. The result is an explicit expression for the conformal symmetry of the non-perturbative Yang-Mills model, which is proportional to the sensitive one. Conformal symmetry is realized by the existence of an extra field in the Yang-Mills model, the non-perturbative one. The extra field is a scalar field in the non-perturbative Yang-Mills model, which is the Yang-Mills scalar field. We find that it is a perfectly valid scalar field in the non-perturbative Yang-Mills model but that it does not have a charge in the non-perturbative Yang-Mills model.

[2]  faKiv:2403.08579 [pdf]
A holographic model for closed strings and Kolmogorov-Volkoff black holes
Comments: v2: minor changes in title, references added

Recently the Kolmogorov-Volkoff (KV) black hole concept was introduced by the authors of the black hole solution to Einstein-Maxwell theory. In this paper, we show that the Kolmogorov-Volkoff (KV) black hole can be constructed in the presence of a cosmological constant. The proposed solution includes a non-thermal horizon which is a two dimensional boundary-like structure. The solution is obtained by a non-perturbative solution to the Einstein-Maxwell theory. Because the solution is in the presence of a cosmological constant, a Kolmogorov-Volkoff (KV) black hole can also be constructed. The proposed solution is based on a non-perturbative solution to the relativistic theory. We prove that the proposed solution is in the presence of a cosmological constant.