Add to ORKGAbstract — We propose a technique to detect and generate patterns in a network of locally interacting dynamical systems. Central to our approach is a novel spatial superposition logic, whose semantics is defined over the quad-tree of a partitioned image. We show that formulas in this logic can be efficiently learned from positive and negative examples of several types of patterns. We also demonstrate that pattern detection, which is implemented as a model checking algorithm, performs very well for test data sets different from the learning sets. We define a quantitative semantics for the logic and integrate the model checking algorithm with particle swarm optimization in a computational framework for synthesis of parameters leading to desir...
A class of systems is considered, where immobile species associated to distinct patches, the nodes o...
Abstract: We study a reaction diffusion system that models the dynamics of pattern formation. We fin...
Reaction–diffusion systems are an intensively studied form of partial differential equation, frequen...
We introduce a formal framework for specifying, detecting, and generating spatial patterns in reacti...
We introduce a formal framework for specifying, detecting, and generating spatial patterns in reacti...
Two of the most common pattern formation mechanisms are Turing-patterning in reaction-diffusion syst...
Large coupled networks of individual entities arise in multiple contexts in nature and engineered sy...
Pattern formation, arising from systems of autonomous reaction-diffusion equations, on networks has ...
In this work we investigate the process of pattern formation in a two dimensional domain for a react...
In this article, we focus on a pattern formation method via reaction - diffusion systems. In particu...
The Turing pattern formation is modeled by reaction-diffusion (RD) type partial differential equatio...
In this thesis we examine mathematical models which have been suggested as possibile mechanisms for ...
Boundary-induced pattern formation is investigated using spatially one-dimensional, two-component re...
This thesis deals with the study of pattern formation on complex networks, a topic of paramount impo...
For a given connected compact subset $K$ in $mathbb{R}^n$ we construct a smooth map $F$ on $mathbb{R...
A class of systems is considered, where immobile species associated to distinct patches, the nodes o...
Abstract: We study a reaction diffusion system that models the dynamics of pattern formation. We fin...
Reaction–diffusion systems are an intensively studied form of partial differential equation, frequen...
We introduce a formal framework for specifying, detecting, and generating spatial patterns in reacti...
We introduce a formal framework for specifying, detecting, and generating spatial patterns in reacti...
Two of the most common pattern formation mechanisms are Turing-patterning in reaction-diffusion syst...
Large coupled networks of individual entities arise in multiple contexts in nature and engineered sy...
Pattern formation, arising from systems of autonomous reaction-diffusion equations, on networks has ...
In this work we investigate the process of pattern formation in a two dimensional domain for a react...
In this article, we focus on a pattern formation method via reaction - diffusion systems. In particu...
The Turing pattern formation is modeled by reaction-diffusion (RD) type partial differential equatio...
In this thesis we examine mathematical models which have been suggested as possibile mechanisms for ...
Boundary-induced pattern formation is investigated using spatially one-dimensional, two-component re...
This thesis deals with the study of pattern formation on complex networks, a topic of paramount impo...
For a given connected compact subset $K$ in $mathbb{R}^n$ we construct a smooth map $F$ on $mathbb{R...
A class of systems is considered, where immobile species associated to distinct patches, the nodes o...
Abstract: We study a reaction diffusion system that models the dynamics of pattern formation. We fin...
Reaction–diffusion systems are an intensively studied form of partial differential equation, frequen...