**Background:** The basic question as given in 'Research Problems in Discrete Geometry' By Moser, Brass and Pach (page 98) is: What is the max number of congruent infinite circular cylinders that can be arranged in 3d space so that every pair if touching? Several partial results are known including a proof by Bezdek that this number cannot exceed 24.

**Questions:** 
- What if we relax this question to infinite circular cylinders with not necessarily equal radii? What happens if we look at congruent and infinitely long prisms all with same cross sections (triangular, square etc..)? 
- If each infinitely long object only needs to have a uniform cross section but different objects could  but could have mutually different shaped cross sections what can one say? 
- Can one arrive at some variant of the problem wherein we can have an arbitrarily large number of objects that can all touch one another?