This paper examines the geometric characteristics of ?-Ricci-Yamabe solitons within the frame-work of LP-Kenmotsu manifolds. A key focus is on determining conditions under which these solitons satisfy the curvature relation R?S = 0. Additionally, we explore their behavior in quasi-conformally flat settings. Further, we establish results for solitons on manifolds exhibiting quasi-conformal curvature tensor, ?-quasi-conformal semi-symmetry and ?-Ricci symmetry, alongside conditions involving the Codazzi-type Ricci tensor and the Cyclic parallel Ricci tensor. To justify our findings, we construct an explicit example demonstrating the existence of such solitons in LP-Kenmotsu manifolds.
Jeevana et al. (Wed,) studied this question.