On separators, segregators and time versus space

R. Santhanam
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引用次数: 18

Abstract

Gives an extension of the result due to Paul, Pippenger, Szemeredi and Trotter (1983) that deterministic linear time (DTIME) is distinct from nondeterministic linear time (NTIME). We show that NTIME[n/spl radic/log*(n)] /spl ne/ DTIME[n/spl radic/log*(n)]. We show that if the class of multi-pushdown graphs has {o(n), o[n/log(n)]} segregators, then NTIME[n log(n)] /spl ne/ DTIME[n log(n)]. We also show that at least one of the following facts holds: (1) P /spl ne/ L, and (2) for all polynomially bounded constructible time bounds t, NTIME(t) /spl ne/ DTIME(t). We consider the problem of whether NTIME(t) is distinct from NSPACE(t) for constructible time bounds t. A pebble game on graphs is defined such that the existence of a "good" strategy for the pebble game on multi-pushdown graphs implies a "good" simulation of nondeterministic time-bounded machines by nondeterministic space-bounded machines. It is shown that there exists a "good" strategy for the pebble game on multi-pushdown graphs if the graphs have sublinear separators. Finally, we show that nondeterministic time-bounded Turing machines can be simulated by /spl Sigma//sub 4/ machines with an asymptotically smaller time bound, under the assumption that the class of multi-pushdown graphs has sublinear separators.
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关于分隔器,分隔器和时间与空间
对Paul、Pippenger、Szemeredi和Trotter(1983)关于确定性线性时间(DTIME)区别于非确定性线性时间(NTIME)的结论进行了推广。我们证明了NTIME[n/spl radic/log*(n)] /spl ne/ DTIME[n/spl radic/log*(n)]。我们证明了如果多下推图类有{o(n), o[n/log(n)]}个分离器,那么NTIME[n log(n)] /spl ne/ DTIME[n log(n)]。我们还证明了以下至少一个事实成立:(1)P /spl ne/ L,(2)对于所有多项式有界的可构造时间界t, NTIME(t) /spl ne/ DTIME(t)。对于可构造的时间边界t,我们考虑NTIME(t)是否与NSPACE(t)不同的问题。定义了图上的一个卵石博弈,使得多下推图上卵石博弈的“好”策略的存在意味着非确定性空间有界机器对非确定性时间有界机器的“好”模拟。证明了在具有次线性分隔符的多下推图上,存在一个“好”的卵石博弈策略。最后,在假定多下推图类具有次线性分隔符的情况下,我们证明了具有渐近小时间界的/spl Sigma//sub - 4/机器可以模拟非确定性有界图灵机。
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