Configurations in the Euclidean plane associated to a system of equations

Abstract

In the Euclidean plane E2, fix four pairwise distinct points equation* eqA arrayccc A=(a1,a2),\ B=(b1,b2),\ C=(c1,c2),\ D=(d1,d2), array equation* together with four non-zero real numbers kA,kB,kC,kD. We show that System (*) consisting of the following four equations in the unknowns X=(x1,x2) and Y=(y1,y2) equation* egy 1\|X-T\|2 +1\|Y-T\|2=kT, T∈\A,B,C,D\ equation* has finitely many solutions (X,Y) (counting also those with complex coordinates) provided that both of the following two conditions are satisfied: (i) no three of the fixed points A,B,C,D are coplanar; (ii) no three of the four circles of center T and radius 1/kT with share a common point in E2. Furthermore, we exhibit a configuration ABCD showing that System (*) satisfying (i) and (ii) may have many real solutions (X,Y). This result is the planar version of an analog problem in the Euclidean space arising from applications to genetics, investigated in the recent papers cif and ak2024.