The R- and L-orders of the Thompson-Higman monoid Mk,1 and their complexity

Abstract

We study the monoid generalization Mk,1 of the Thompson-Higman groups, and we characterize the R- and the L-preorder of Mk,1. Although Mk,1 has only one non-zero J-class and k-1 non-zero D-classes, the R- and the L-preorder are complicated; in particular, <R is dense (even within an L-class), and <L is dense (even within an R-class). We study the computational complexity of the R- and the L-preorder. When inputs are given by words over a finite generating set of Mk,1, the R- and the L-preorder decision problems are in P. The main result of the paper is that over a "circuit-like" generating set, the R-preorder decision problem of Mk,1 is Pi2P-complete, whereas the L-preorder decision problem is coNP-complete. We also prove related results about circuits: For combinational circuits, the surjectiveness problem is Pi2P-complete, whereas the injectiveness problem is coNP-complete.