We develop a general framework for infinite-dimensional Ramsey theory with and without pigeonhole principle, inspired by Gowers' Ramsey-type theorem for block sequences in Banach spaces and by its exact version proved by Rosendal. In this framework, we prove the adversarial Ramsey principle for Borel sets, a result conjectured by Rosendal that generalizes at the same time his version of Gowers' theorem and Borel determinacy of games on integers.Mathematics Subject Classification (2010): 05D10, 03E60
Despite significant progress in the study of big Ramsey degrees, the big Ramsey degrees of many classes of structures with finite small Ramsey degrees remain unknown. In this paper, we investigate the big Ramsey degrees of unrestricted relational structures in (possibly) infinite languages and demonstrate that they have finite big Ramsey degrees if and only if there are only finitely many relations of every arity. This is the first time that the finiteness of big Ramsey degrees has been established for an infinite-language random structure.
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