Gowers' Ramsey theorem for generalized tetris operations
Abstract
We prove a generalization of Gowers' theorem for FINk where, instead of the single tetris operation T:FINk→ FINk-1, one considers all maps from FINk to FINj for 0≤ j≤ k arising from nondecreasing surjections f:\ 0,1,… ,k+1\ → \ 0,1,… ,j+1\ . This answers a question of Bartosov\'a and Kwiatkowska. We also prove a common generalization of such a result and the Galvin--Glazer--Hindman theorem on finite products, in the setting of layered partial semigroups introduced by Farah, Hindman, and McLeod.
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