Four cross-ratio maps sets of Points and their Algebraic Structures in a line on Desargues Affine Plane
Abstract: This paper introduces advances in the geometry of the transforms for cross ratio of four points in a line in the Desargues affine plane. The results given here have a clean, based Desargues affine plan axiomatic and definitions of addition and multiplication of points on a line in this plane, and for skew field properties. In this paper are studied, four types of cross-ratio maps sets of points, we discussed about for each of the 4-points of cross-ratio and we will examine the algebraic properties for each case. We are constructing four cross-ratio maps sets $\mathcal{R}{A}_4=\left{c_r(X,B;C,D) | \quad \forall X \in \ell{OI} \right}$, $\mathcal{R}{B}_4=\left{c_r(A,X;C,D) | \quad \forall X \in \ell{OI} \right}$, $\mathcal{R}{C}_4=\left{c_r(A,B;X,D) | \quad \forall X \in \ell{OI} \right}$ and $\mathcal{R}{D}_4=\left{c_r(A,B;C,X) | \quad \forall X \in \ell{OI} \right}$. We disuse and examine algebraic properties for each case, related to the actions of addition and multiplication of points in $\ell{OI}$ line in Desargues affine planes, which are produced by these map sets.
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