Egge triples and unbalanced Wilf-equivalence
Abstract
Egge conjectured that permutations avoiding the set of patterns \2143,3142,τ\, where τ∈\246135,254613,263514,524361,546132\, are enumerated by the large Schr\"oder numbers. Consequently, \2143,3142,τ\ with τ as above is Wilf-equivalent to the set of patterns \2413,3142\. Burstein and Pantone proved the case of τ=246135. We prove the remaining four cases. As a byproduct of our proof, we also enumerate the case τ=4132.
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