On ends of degree ω1

Abstract

We prove that if T is a semi-special tree that is not special, then there exists a graph G , formed as an inflation of a sparse T -graph, such that for any special tree S , G is not a subdivision of an inflation of an sparse S -graph. Furthermore G has an end of uncountable degree that has no ray graph. This result provides a consistent negative answer to a problem posed by Stefan Geschke et al. in 2023. Additionally, we introduce and explore a property that generalizes Halin's grid theorem, extending it to ends of degree 1 , which was originally established for ends of countable degree.

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