The self-fields in quantum electrodynamics generate a finite number of infinities in the calculations that can be removed by the process of renormalization.
Consequently, they reconstruct the foundations of mathematics in a way that does not assume the existence of actual infinities.
In this way, the infinities get absorbed in those constants and yield a finite result in good agreement with experiments.
Each of these is by itself a source of sunspot equilibria, but my intuition was initially driven by the double infinity and bubbles.
In physics and mathematics we can use an infinity of dimensions.
In the rest of this paper, no vacuum region is taken into account so that the plasma extends up to infinity in all directions.
If g goes to infinity, all chartists enter the market with the highest fitness.
I will now show that there is generally an infinity of efficient taking-it-in-turns equilibria if there are any at all.