A simple discharging method for forbidden subposet problems

Abstract

The poset Yk+1, 2 consists of k+2 distinct elements x1, x2, …, xk, y1,y2, such that x1 x2 … xk y1,~y2. The poset Y'k+1, 2 is the dual of Yk+1, 2 Let La(n,\Yk+1, 2, Y'k+1, 2\) be the size of the largest family F ⊂ 2[n] that contains neither Yk+1,2 nor Y'k+1,2 as an induced subposet. Methuku and Tompkins proved that La(n, \Y3,2, Y'3,2\) = (n,2) for n 3 and they conjectured the generalization that if k 2 is an integer and n k+1, then La(n, \Yk+1,2, Y'k+1,2\) = (n,k). In this paper, we introduce a simple discharging approach and prove this conjecture.