A 64-Rectangle Counterexample to Wegner's Conjecture and LP Gaps up to 5/2
Abstract
Wegner conjectured that every finite family R of axis-parallel rectangles satisfies τ( R) 2ν( R)-1, where ν is the packing number and τ is the piercing number. Ajwani, Gajjala, Raman, and Ray recently disproved this by constructing a triangle-free counterexample on 2196· 89 rectangles and, using a computer-assisted package-and-port recursion, obtained a standard LP gap of 17891/8064 for Maximum Independent Set of Rectangles. We give a simpler and hand-checkable counterexample with 64 rectangles. It is built from an eight-rectangle gadget whose independent sets inject into four ordered slots; we then use four horizontal and four vertical copies of this gadget to form a triangle-free family with ν=16 and τ 32. We use the same horizontal-vertical step to define recursive families of rectangles Pr with ν(Pr)=42r. For the standard clique, equivalently point, relaxation we obtain a finite gap 73/32 at P3, improving the previous benchmark of 17891/8064. We then construct recursive fractional solutions and matching piercing sets showing r α*(Pr)/ν(Pr)=r τ(Pr)/ν(Pr)=5/2. Finally, by disjoint union with isolated rectangles, we show that every rational t∈[1,5/2) occurs as a standard LP gap and also as a packing-piercing ratio for suitable rectangle families.
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