Finite- and infinite-volume thermodynamics around the zero of the pressure in deconfining SU(2) Quantum Yang-Mills theory

Abstract

We re-address the self-intersection region in a figure-eight shaped center-vortex loop containing a frequently perturbed BPS monopole subject to a core-oscillation frequency ω0, rectifying a numerical error in estimating the system's radius r0 in comparison to the spatial coarse-graining scale of infinite-volume thermodynamics. Implications are discussed. We also compute the lowest frequency 0 of a spherically symmetric plasma oscillation within a neutral and spatially homogeneous ball-like region of deconfining phase in dependence of its radius R0. For r0=R0 we compare ω0 with 0. We point out how the idealisations, which are assumed in this work, will have to be relaxed in order to address the emission of electromagnetic radiation and of non-intersecting as well as self-intersecting center-vortex loops away from the surface region of macroscopically sized plasma balls.