ζ -Conformally Flat LP -Kenmotsu Manifolds and Ricci–Yamabe Solitons

In the present paper, we characterize m -dimensional ζ -conformally flat L P -Kenmotsu manifolds (briefly, ( L P K ) m ) equipped with the Ricci–Yamabe solitons (RYS) and gradient Ricci–Yamabe solitons (GRYS). It is proven that the scalar curvature r of an ( L P K ) m admitting an RYS satisfies the Poisson equation Δ r = 4 ( m − 1 ) δ { β ( m − 1 ) + ρ } + 2 ( m − 3 ) r − 4 m ( m − 1 ) ( m − 2 ) , where ρ , δ ( ≠ 0 ) ∈ R . In this sequel, the condition for which the scalar curvature of an ( L P K ) m admitting an RYS holds the Laplace equation is established. We also give an affirmative answer for the existence of a GRYS on an ( L P K ) m . Finally, a non-trivial example of an L P -Kenmotsu manifold ( L P K ) of dimension four is constructed to verify some of our results.