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  1. On Sequences of Homomorphisms Into Measure Algebras and the Efimov Problem.Piotr Borodulin–Nadzieja & Damian Sobota - 2023 - Journal of Symbolic Logic 88 (1):191-218.
    For given Boolean algebras$\mathbb {A}$and$\mathbb {B}$we endow the space$\mathcal {H}(\mathbb {A},\mathbb {B})$of all Boolean homomorphisms from$\mathbb {A}$to$\mathbb {B}$with various topologies and study convergence properties of sequences in$\mathcal {H}(\mathbb {A},\mathbb {B})$. We are in particular interested in the situation when$\mathbb {B}$is a measure algebra as in this case we obtain a natural tool for studying topological convergence properties of sequences of ultrafilters on$\mathbb {A}$in random extensions of the set-theoretical universe. This appears to have strong connections with Dow and Fremlin’s result stating (...)
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  • Convergence of measures after adding a real.Damian Sobota & Lyubomyr Zdomskyy - 2023 - Archive for Mathematical Logic 63 (1):135-162.
    We prove that if $$\mathcal {A}$$ A is an infinite Boolean algebra in the ground model V and $$\mathbb {P}$$ P is a notion of forcing adding any of the following reals: a Cohen real, an unsplit real, or a random real, then, in any $$\mathbb {P}$$ P -generic extension V[G], $$\mathcal {A}$$ A has neither the Nikodym property nor the Grothendieck property. A similar result is also proved for a dominating real and the Nikodym property.
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  • Laver forcing and converging sequences.Alan Dow - 2024 - Annals of Pure and Applied Logic 175 (1):103247.
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