No‐dimension Tverberg's theorem and its corollaries in Banach spaces of type p

Abstract

We continue our study of 'no-dimension' analogues of basic theorems in combinatorial and convex geometry in Banach spaces. We generalize some results of the paper \cite{adiprasito2019theorems} and prove no-dimension versions of colorful Tverberg's theorem, selection lemma and the weak $\epsilon$-net theorem in Banach spaces of type $p > 1.$ To prove this results we use the original ideas of \cite{adiprasito2019theorems} for the Euclidean case and our slightly modified version of the celebrated Maurey lemma.