This is the second of two papers on the complexity of deciding membership, emptiness and finiteness of four basic types of Lindenmayer systems: the ED0L, E0L, EDT0L and ET0L systems. For each problem and type of system we establish lower bounds on the time or memory required for solution by Turing machines, using reducibility techniques. These bounds, combined with the upper bounds of the preceding paper, show many of these problems to be complete for NP or PSPACE
We consider parallel random access machines (PRAM's) with p processors and distributed systems of ra...
We show that a deterministic Turing machine with one d-dimensional work tape and random access to th...
P versus NP is considered as one of the most important open problems in computer science. This consi...
We determine the computational complexity of some decidable problems concerning several types of Li...
We study the computational complexity of some decidable systems. The problems are membership. empti...
We determine the computational complexity of membership, emptiness and infiniteness for several typ...
(eng) We show that proving lower bounds in algebraic models of computation may not be easier than in...
A number of upper and lower bounds have been obtained for various problems concerning L systems (se...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
We show new tradeoffs for satisfiability and nondeterministic linear time. Satisfiability cannot be ...
A major complexity classes are L and ⊕L. A logarithmic space Turing machine has a read-only input ta...
In this mini-survey we discuss time complexity and program size results for universal Turing machine...
AbstractIn this paper we establish a lower bound for the simultaneous complexity of the halting prob...
We investigate the descriptional complexity of limited propagating Lindenmayer systems and their det...
Two models of proofs of lower bounds on the complexity are introduced. They have very wide applicabi...
We consider parallel random access machines (PRAM's) with p processors and distributed systems of ra...
We show that a deterministic Turing machine with one d-dimensional work tape and random access to th...
P versus NP is considered as one of the most important open problems in computer science. This consi...
We determine the computational complexity of some decidable problems concerning several types of Li...
We study the computational complexity of some decidable systems. The problems are membership. empti...
We determine the computational complexity of membership, emptiness and infiniteness for several typ...
(eng) We show that proving lower bounds in algebraic models of computation may not be easier than in...
A number of upper and lower bounds have been obtained for various problems concerning L systems (se...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
We show new tradeoffs for satisfiability and nondeterministic linear time. Satisfiability cannot be ...
A major complexity classes are L and ⊕L. A logarithmic space Turing machine has a read-only input ta...
In this mini-survey we discuss time complexity and program size results for universal Turing machine...
AbstractIn this paper we establish a lower bound for the simultaneous complexity of the halting prob...
We investigate the descriptional complexity of limited propagating Lindenmayer systems and their det...
Two models of proofs of lower bounds on the complexity are introduced. They have very wide applicabi...
We consider parallel random access machines (PRAM's) with p processors and distributed systems of ra...
We show that a deterministic Turing machine with one d-dimensional work tape and random access to th...
P versus NP is considered as one of the most important open problems in computer science. This consi...