Determinacy and Subsumption of Single-Valued Bottom-Up Tree Transducers

Abstract

This paper discusses the decidability of determinacy and subsumption of tree transducers. For two tree transducers T₁ and T₂, T₁ determines T₂ if the output of T₂ can be identified by the output of T₁, that is, there is a partial function f such that [[T₂]]=f∘[[T₁]] where [[T₁]] and [[T₂]] are tree transformation relations induced by T₁ and T₂, respectively. Also, T₁ subsumes T₂ if T₁ determines T₂ and the partial function f such that [[T₂]]=f∘[[T₁]] can be defined by a transducer in a designated class that T₂ belongs to. In this paper, we show that determinacy is in coNEXPTIME for single-valued linear extended bottom-up tree transducers as the determiner class and single-valued bottom-up tree transducers as the determinee class. We also show that subsumption is in coNEXPITME for these classes, and a bottom-up tree transducer T₃ such that [[T₂]]=[[T₃]]∘[[T₁]] can be constructed if T₁ subsumes T₂.