An introduction to higher walks
Abstract
The following is an introduction to the study of higher walks, by which we mean a family of higher-dimensional extensions of Todorcevic's method of walks on the ordinals. After a brief review of this method, including, for example, definitions of the classical functions Tr and 2 induced by a choice of C-sequence, we record a shortlist of desiderata for such extensions, along with (n+1)-dimensional functions Trn and 2n (induced by a choice of higher-dimensional C-sequence) which we show to satisfy the bulk of them. Much of the interest of these higher walks functions lies in their affinity, as in the classical n=1 case, for the ordinals ωn (we show, for example, that n2 determines both n-dimensional linear orderings and n-coherent families on ωn, and that higher walks define nontrivial elements of the nth cohomology groups of ωn), and in the questions that they thereby raise both about the combinatorics of the latter and about higher-dimensional infinitary combinatorics more generally; we collect the most prominent of these questions in our conclusion. These objects are also, though, of a sufficient combinatorial richness to be of interest in their own right, as we have underscored via an extended study of the first genuine novelty among them, the function Tr2.
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