We present dichotomy theorems regarding the computational complexity of counting fixed points in boolean (discrete) dynamical systems, i.e., finite discrete dynamical systems over the domain {0, 1}. For a class F of boolean functions and a class G of graphs, an (F, G)-system is a boolean dynamical system with local transitions functions lying in F and graphs in G. We show that, if local transition functions are given by lookup tables, then the following complexity classification holds: Let F be a class of boolean functions closed under superposition and let G be a graph class closed under taking minors. If F contains all min-functions, all max-functions, or all self-dual and monotone functions, and G contains all planar graphs, then it is #...
AbstractTo each Boolean function f:{0,1}n→{0,1}n and each x∈{0,1}n, we associate a signed directed g...
We investigate the complexity of the fixed-points of bounded formulas in the context of finite set ...
(eng) We study the computational capabilities of dynamical systems defined by iterated functions on ...
We study computational complexity of counting the fixed point configurations (FPs) in certain classe...
We study computational complexity of counting the fixed point configurations (FPs) in certain discre...
We study counting various types of configurations in certain classes of graph automata viewed as dis...
43 pagesA Boolean network (BN) with $n$ components is a discrete dynamical system described by the s...
In this paper, we study boolean monomial dynamical systems. Colón-Reyes, Jarrah, Laubenbacher, and S...
A monomial dynamical system over a finite field K is a nonlinear deterministic time discrete dynamic...
AbstractSequential Dynamical Systems (SDSs) are a special type of finite discrete dynamical systems ...
A Boolean network is a mapping f :{0,1}? ? {0,1}?, which can be used to model networks of n interact...
Abstract. Discrete dynamical systems based on dependency graphs have played an important role in the...
AMS Subject Classication: 68Q10, 68Q17, 68Q80 Abstract. Sequential Dynamical Systems (SDSs) are math...
It is beyond dispute that to find ways to apply ideas from Mathematics to Computation is a compellin...
AbstractIn this work we study an algorithmic problem related to gene regulatory networks. This probl...
AbstractTo each Boolean function f:{0,1}n→{0,1}n and each x∈{0,1}n, we associate a signed directed g...
We investigate the complexity of the fixed-points of bounded formulas in the context of finite set ...
(eng) We study the computational capabilities of dynamical systems defined by iterated functions on ...
We study computational complexity of counting the fixed point configurations (FPs) in certain classe...
We study computational complexity of counting the fixed point configurations (FPs) in certain discre...
We study counting various types of configurations in certain classes of graph automata viewed as dis...
43 pagesA Boolean network (BN) with $n$ components is a discrete dynamical system described by the s...
In this paper, we study boolean monomial dynamical systems. Colón-Reyes, Jarrah, Laubenbacher, and S...
A monomial dynamical system over a finite field K is a nonlinear deterministic time discrete dynamic...
AbstractSequential Dynamical Systems (SDSs) are a special type of finite discrete dynamical systems ...
A Boolean network is a mapping f :{0,1}? ? {0,1}?, which can be used to model networks of n interact...
Abstract. Discrete dynamical systems based on dependency graphs have played an important role in the...
AMS Subject Classication: 68Q10, 68Q17, 68Q80 Abstract. Sequential Dynamical Systems (SDSs) are math...
It is beyond dispute that to find ways to apply ideas from Mathematics to Computation is a compellin...
AbstractIn this work we study an algorithmic problem related to gene regulatory networks. This probl...
AbstractTo each Boolean function f:{0,1}n→{0,1}n and each x∈{0,1}n, we associate a signed directed g...
We investigate the complexity of the fixed-points of bounded formulas in the context of finite set ...
(eng) We study the computational capabilities of dynamical systems defined by iterated functions on ...