Abstract
The following problem, known as the H-colouring problem, is studied. An H-colouring of a directed graph D is a mapping $f:V( D ) \to V( H )$ such that $( f( x ),f( y ) )$ is an edge of H whenever $( x,y )$ is an edge of D. The H-colouring problem is the following. Instance: A directed graph D. Question: Does there exist an H-colouring of D? In this paper it is shown that for semicomplete digraphs T the T-colouring problem is NP-complete when T has more than one directed cycle, and polynomially decidable otherwise.
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