$P\in (A_1 B_1 C_1)$ It follows $OP\geq d(O;(A_1 B_1C_1))=h.$ But $S_{OA_1 B_1}=S_{OB_1 C_1}=S_{OC_1A_1}=S_{A_1 B_1 C_1}$ and $V_{OA_1 B_1 C_1}=V_{OPA_1 B_1}+V_{OPB_1 C_1}+V_{OPC_1 A_1}.$ It results $OP\geq h=PP_1+PP_2+PP_3$ and hence the conclusion.

My opinion near to before solution: A plane is constructed which passes through point P and cuts OA, OB at D and E respectively and also cuts CO at Z such that: OD=EZ, DE=OZ, OE=DZ which holds since : $\alpha + \beta + \gamma = \pi = \mathop D\limits^ \wedge + \mathop E\limits^ \wedge + \mathop Z\limits^ \wedge .$ Hence $\mathop {ODE}\limits^\vartriangle = \mathop {OEZ}\limits^\vartriangle = \mathop {ODZ}\limits^\vartriangle = \mathop {DEZ}\limits^\vartriangle ,$ $OP \geqslant OO^' $ with O΄ the projection of O on plane DEZ and $V_{P.ODE} + V_{P.OZE} + V_{P.ODZ} = V_{O.ZDE} \Rightarrow ......End.$ S.E.Louridas