On the geometry of ζ-Ricci solitons in the nearly Kaehler 6-Sphere

In the present paper, we derive conditions for real hypersurface of a nearly Kaehler $${\mathbb {S}}^{6}$$ S 6 endowed with quarter-symmetric metric connection to be a Hopf hypersurface. By finding its geometric application using Hopf foliation, we demonstrate that if a real hypersurface of nearly Kaehler $${\mathbb {S}}^{6}$$ S 6 endowed with quarter-symmetric metric connection is an $$\zeta $$ ζ -Ricci soliton then it is an $$\zeta $$ ζ -Einstein real hypersurface and in further geometric analysis, we prove that it is congruent to an open segment of a totally-geodesic hypersphere or equivalently, a tube over an almost complex curve in $${\mathbb {S}}^{6}$$ S 6 .