AbstractIn this paper we establish a lower bound for the simultaneous complexity of the halting problem for a class of ‘simple programs’, which allow setting variables to constants and if-goto statements. Let HALT(h, k) be the problem: given a simple program Pk with k variables, determine whether Pk halts within nh steps, where n is the length of Pk. We show that the problem HALT(h, k) cannot be solved in time less than n(h−4)2 and space less than 14(k − 17) log2 n by any Turing machine with one storage tape and binary storage symbols
It is shown that for any real constants b>a≥0, multitape Turing machines operating in space L1(n)=[b...
AbstractIn this paper we study diagonal processes over time bounded computations of one-tape Turing ...
AbstractDeterministic k-tape and multitape Turing machines with one-way, two-way and without a separ...
AbstractIn this paper we establish a lower bound for the simultaneous complexity of the halting prob...
Let L be a language recognized by a nondeterministic (single-tape) Turing machine of time complexity...
The following lower bounds for on-line computation are proved: (1) Simulating two-tape nondeterminis...
AbstractFor fixed k ⩾ 2 we tighten the time hierarchy for k-tape Turing machines. Also for fixed k ⩾...
AbstractWe show that if the number of available states is fixed and is sufficiently large, then one-...
AbstractWe consider one-tape nondeterministic Turing machines, i.e. with a unique worktape on which ...
AbstractLet TM(k,l) be the set of one-tape Turing machines with k states and l symbols. It is known ...
A longstanding open problem in complexity theory is whether the class Polytime (P) is the same as Lo...
AbstractA graph G=(V, E) has bandwidth k under a layout L:V →1 1{1,…,¦V¦} if, for all {x, y}∈E, ¦L(x...
Each algorithm recognizing any generator of the class of context-free languages requires space Omega...
Accepted by the conference ICCSCM, 2019A major complexity classes are $L$ and $POLYLOGTIME$. A logar...
Deterministic k-tape and multitape Turing machines with one-way, two-way and without a separated inp...
It is shown that for any real constants b>a≥0, multitape Turing machines operating in space L1(n)=[b...
AbstractIn this paper we study diagonal processes over time bounded computations of one-tape Turing ...
AbstractDeterministic k-tape and multitape Turing machines with one-way, two-way and without a separ...
AbstractIn this paper we establish a lower bound for the simultaneous complexity of the halting prob...
Let L be a language recognized by a nondeterministic (single-tape) Turing machine of time complexity...
The following lower bounds for on-line computation are proved: (1) Simulating two-tape nondeterminis...
AbstractFor fixed k ⩾ 2 we tighten the time hierarchy for k-tape Turing machines. Also for fixed k ⩾...
AbstractWe show that if the number of available states is fixed and is sufficiently large, then one-...
AbstractWe consider one-tape nondeterministic Turing machines, i.e. with a unique worktape on which ...
AbstractLet TM(k,l) be the set of one-tape Turing machines with k states and l symbols. It is known ...
A longstanding open problem in complexity theory is whether the class Polytime (P) is the same as Lo...
AbstractA graph G=(V, E) has bandwidth k under a layout L:V →1 1{1,…,¦V¦} if, for all {x, y}∈E, ¦L(x...
Each algorithm recognizing any generator of the class of context-free languages requires space Omega...
Accepted by the conference ICCSCM, 2019A major complexity classes are $L$ and $POLYLOGTIME$. A logar...
Deterministic k-tape and multitape Turing machines with one-way, two-way and without a separated inp...
It is shown that for any real constants b>a≥0, multitape Turing machines operating in space L1(n)=[b...
AbstractIn this paper we study diagonal processes over time bounded computations of one-tape Turing ...
AbstractDeterministic k-tape and multitape Turing machines with one-way, two-way and without a separ...