The complexity of the parameterized halting problem for nondeterministic Turing machines p-Halt is known to be related to the question of whether there are logics capturing various complexity classes [10]. Among others, if p-Halt is in para-AC0, the parameterized version of the circuit complexity class AC0, then AC0, or equivalently, (+, x)-invariant FO, has a logic. Although it is widely believed that p-Halt ∉. para-AC0, we show that the problem is hard to settle by establishing a connection to the question in classical complexity of whether NE ⊈ LINH. Here, LINH denotes the linear time hierarchy. On the other hand, we suggest an approach toward proving NE ⊈ LINH using bounded arithmetic. More specifically, we demonstrate that if the much...
The fundamental Minimum Circuit Size Problem is a well-known example of a problem that is neither kn...
In this paper we study diagonal processes over time-bounded computations of one-tape Turing machine...
We propose a general proof technique based on the Turing machine halting problem that allows us to e...
The complexity of the parameterized halting problem for nondeterministic Turing machines p-Halt is k...
The first of several reasons Linear Time has received relatively little theoretical attention is tha...
A parameterized computational problem is a set of pairs 〈x, k〉, where k is a distinguished item call...
AbstractThere is a single set that is complete for a variety of nondeterministic time complexity cla...
AbstractWe propose a general proof technique based on the Turing machine halting problem that allows...
Abstract. Higher Order Fixpoint Logic (HFL) is a hybrid of the simply typed λ-calculus and the modal...
The linear reachability problem for finite state transition systems is to decide whether there is an...
AbstractIn this paper we establish a lower bound for the simultaneous complexity of the halting prob...
The modal mu-calculus is an expressive logic that can be used to specify safety and liveness propert...
(eng) We show that proving lower bounds in algebraic models of computation may not be easier than in...
We give machine characterizations of most parameterized complexity classes, in particular, of W[P], ...
AbstractMotivated by recent results showing that there are natural parameterized problems that are f...
The fundamental Minimum Circuit Size Problem is a well-known example of a problem that is neither kn...
In this paper we study diagonal processes over time-bounded computations of one-tape Turing machine...
We propose a general proof technique based on the Turing machine halting problem that allows us to e...
The complexity of the parameterized halting problem for nondeterministic Turing machines p-Halt is k...
The first of several reasons Linear Time has received relatively little theoretical attention is tha...
A parameterized computational problem is a set of pairs 〈x, k〉, where k is a distinguished item call...
AbstractThere is a single set that is complete for a variety of nondeterministic time complexity cla...
AbstractWe propose a general proof technique based on the Turing machine halting problem that allows...
Abstract. Higher Order Fixpoint Logic (HFL) is a hybrid of the simply typed λ-calculus and the modal...
The linear reachability problem for finite state transition systems is to decide whether there is an...
AbstractIn this paper we establish a lower bound for the simultaneous complexity of the halting prob...
The modal mu-calculus is an expressive logic that can be used to specify safety and liveness propert...
(eng) We show that proving lower bounds in algebraic models of computation may not be easier than in...
We give machine characterizations of most parameterized complexity classes, in particular, of W[P], ...
AbstractMotivated by recent results showing that there are natural parameterized problems that are f...
The fundamental Minimum Circuit Size Problem is a well-known example of a problem that is neither kn...
In this paper we study diagonal processes over time-bounded computations of one-tape Turing machine...
We propose a general proof technique based on the Turing machine halting problem that allows us to e...