A Dehornoy-Type Ordering on Plat Presentation Classes

Abstract

For each integer n 1, after fixing a proper complexity function on the braid group 2n, we use the Dehornoy order to define a strict total order on the set \[ P2n=H2n 2n/H2n \] of 2n--plat presentation classes. For a link type L with bridge number b( L) n, this induces a strict total order on the subset P(n)( L) corresponding to bridge isotopy classes of n--bridge positions of L. We also define a distinguished class D(n)( L) and show that the globally chosen Dehornoy canonical braid agrees with the cosetwise canonical representative of the associated Hilden double coset. As an application, we reformulate the fixed-level bridge finiteness conjecture in terms of boundedness of canonical representatives. This viewpoint supports the role of bridge positions as a structured finite-level model for studying the otherwise vast collection of geometric positions of a link.