In this paper, we study weak solutions to complex Monge-Ampère equations of the form (ω + dd c ϕ) n = F (ϕ, .)dµ on a bounded strictly pseudoconvex domain in C n , where ω is a smooth (1, 1)-form, 0 ≤ F is a continuous non-decreasing function, and µ is a positive non-pluripolar measure. Our results extend previous works of Ko lodziej and Nguyen [KN15, KN23a, KN23b] who study bounded solutions, as well as Cegrell [Ceg98,Ceg04,Ceg08], Czyż [Cz09], Benelkourchi [Ben09,Ben15] and others who treat the case when ω = 0 and/or F = 1.
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