Physics over a finite field and Wick rotation

Abstract: The paper develops an earlier proposition that the physical universe is a finite system co-ordinatised by a very large finite field $\mathrm{F}\mathfrak{p}$ which looks like the field of complex numbers to an observer. We construct a place (homomorphism) $\mathrm{lm}$ from a pseudo-finite field $\mathrm{F}\mathfrak{p}$ onto the compactified field of complex numbers in such a way that certain multiplicative subgroups $'\mathbb{R}'+$ and $'\mathbb{S}'$ correspond to the polar coordinate system $\mathbb{R}+$ and $\mathbb{S}$ of $\mathbb{C}.$ Thus $\mathrm{F}\mathfrak{p},$ $'\mathbb{R}'+$ and $'\mathbb{S}'$ provide co-ordinates for physical universe. We show that the passage from the scale of units in $'\mathbb{R}'_+$ to the scale of units of $'\mathbb{S}'$ corresponds to a multiplication (on the logarithmic scale) by a very large integer $\mathfrak{i}$ equal approximately to $\sqrt{\mathfrak{p}}.$ This provides an explanation to the phenomenon of Wick rotation. In the same model we explain the phenomenon of phase transition in a large finite system