Resolution of The Linear-Bounded Automata Question
Abstract
This paper resolves a famous and longstanding open question in automata theory, i.e., the linear-bounded automata question (or shortly, LBA question), which can also be phrased succinctly in the language of computational complexity theory as NSPACE[n]?= DSPACE[n]. In fact, we prove a more general result that DSPACE[S(n)]⊂neqq NSPACE[S(n)] where S(n)≥ n is a space-constructible function. Our proof technique is based on diagonalization against deterministic S(n) space-bounded Turing machines with a universal nondeterministic Turing machine and on other novel and interesting new techniques. Our proof also implies the following consequences, which resolve some famous open questions in complexity theory: (1). DSPACE[n]⊂neqq NSPACE[n]; (2). L⊂neqq NL; (3). L⊂neqq P; (4). There exists no deterministic Turing machine working in O( n) space deciding the st-connectivity question (STCON).
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