An Overlap Construction for Relative Linear Extension Ratios
Abstract
Chan and Pak introduced the relative linear extension ratio ρ(P,x)=e(P)/e(P-x), where e(P) is the number of linear extensions of a finite poset P, and let ν(c,d) be the least number of elements of a poset that realizes ρ(P,x)=d/c. They proved that ν(c,d) d/c+O( d d) for d 3c, and asked whether the hypothesis d 3c can be relaxed to d(1+)c or removed. We prove the fixed-gap form of this question: for every fixed >0, ν(c,d) dc+O( d d) whenever d(1+)c, and the implied constant is absolute once d 2c. The new ingredient is a one-element overlap construction: if x is minimal in P and y is minimal in Q, then there is a poset R with |R|=|P|+|Q|-1 and an element z such that ρ(R,z)=ρ(P,x)+ρ(Q,y)-1. Together with the continued-fraction construction of Chan and Pak and Rukavishnikova's tail bound for sums of partial quotients, this removes the factor 3 in their range. We also show that the fixed-gap hypothesis is essentially optimal for this construction. In the range 1 < d/c < 2, with h=d-c, the size bound the construction can certify is at least c/h, so the method reaches the stated error term only when h is at least of order c/( c c). The remaining obstruction to removing the hypothesis is a short-interval problem for sums of partial quotients, which we describe. The deductive part of the argument has been checked with the Lean proof assistant.
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