Quasilinear Emulation of Turing Machines by S-machines

Abstract

We prove that for any >0, a non-deterministic Turing machine T with time complexity T(n) can be emulated by an S-machine with time and space complexities at most T(n)1+ and T(n), respectively. This improves the bounds on the emulation in arXiv:math/9811105 and leads to improved bounds in the main theorem of arXiv:math/9811106. In particular, for a non-hyperbolic finitely generated group G whose word problem has linear time complexity, this yields an embedding of G into a finitely presented group H such that G has bounded distortion in H and the Dehn function of G in H is bounded above by n2+, an optimal bound modulo the factor. As a means to this end, we introduce and develop the theory of S-graphs, giving a different perspective on the construction of S-machines akin to a crude object-oriented programming language.