We establish the first polynomial time-space lower bounds for satisfiability on general models of computation. We show that for any constant c less than the golden ratio there exists a positive constant d such that no deterministic random-access Turing machine can solve satisfiability in time n c and space n d, where d approaches 1 when c does. On conondeterministic instead of deterministic machines, we prove the same for any constant c less than √ 2. Our lower bounds apply to nondeterministic linear time and almost all natural NP-complete problems known. In fact, they even apply to the class of languages that can be solved on a nondeterministic machine in linear time and space n 1/c. Our proofs follow the paradigm of indirect diagonalizati...
For some problems, we know feasible algorithms for solving them. Other computational problems (such ...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
AbstractIn this paper we study diagonal processes over time bounded computations of one-tape Turing ...
We show new tradeoffs for satisfiability and nondeterministic linear time. Satisfiability cannot be ...
AbstractWe give the first nontrivial model-independent time–space tradeoffs for satisfiability. Name...
We show that a deterministic Turing machine with one d-dimensional work tape and random access to th...
AbstractWe show that a deterministic Turing machine with one d-dimensional work tape and random acce...
We make several improvements on time lower bounds for concrete problems in NP and PH. 1. We present ...
We establish the first polynomial-strength time-space lower bounds for problems in the linear-time h...
We survey the recent lower bounds on the running time of general-purpose random-access machines tha...
In this talk, we establish lower bounds for the running time of randomized machines with two-sided e...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
We strengthen the nondeterministic hierarchy theorem for non-deterministic polynomial time to show t...
AbstractThe arguments used by R. Kannan (1984, Math. Systems Theory17, 29–45), L. Fortnow (1997, in ...
In this paper we study diagonal processes over time-bounded computations of one-tape Turing machine...
For some problems, we know feasible algorithms for solving them. Other computational problems (such ...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
AbstractIn this paper we study diagonal processes over time bounded computations of one-tape Turing ...
We show new tradeoffs for satisfiability and nondeterministic linear time. Satisfiability cannot be ...
AbstractWe give the first nontrivial model-independent time–space tradeoffs for satisfiability. Name...
We show that a deterministic Turing machine with one d-dimensional work tape and random access to th...
AbstractWe show that a deterministic Turing machine with one d-dimensional work tape and random acce...
We make several improvements on time lower bounds for concrete problems in NP and PH. 1. We present ...
We establish the first polynomial-strength time-space lower bounds for problems in the linear-time h...
We survey the recent lower bounds on the running time of general-purpose random-access machines tha...
In this talk, we establish lower bounds for the running time of randomized machines with two-sided e...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
We strengthen the nondeterministic hierarchy theorem for non-deterministic polynomial time to show t...
AbstractThe arguments used by R. Kannan (1984, Math. Systems Theory17, 29–45), L. Fortnow (1997, in ...
In this paper we study diagonal processes over time-bounded computations of one-tape Turing machine...
For some problems, we know feasible algorithms for solving them. Other computational problems (such ...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
AbstractIn this paper we study diagonal processes over time bounded computations of one-tape Turing ...