A short exposition of S. Parsa's theorems on intrinsic linking and non-realizability

Abstract

We present a short exposition of the following results by S. Parsa. Let L be a graph such that the join L*\1,2,3\ (i.e. the union of three cones over L along their common bases) piecewise linearly (PL) embeds into R4. Then L admits a PL embedding into R3 such that any two disjoint cycles have zero linking number. There is C such that every 2-dimensional simplicial complex having n vertices and embeddable into R4 contains less than Cn8/3 simplices of dimension 2. We also present the analogue of the second result for intrinsic linking.