Abstract—Topology-based techniques are useful for multi-scale exploration of the feature space of scalar-valued func-tions, such as those derived from the output of large-scale simulations. The Morse-Smale (MS) complex, in particular, allows robust identification of gradient-based features, and therefore is suitable for analysis tasks in a wide range of application domains. In this paper, we develop a two-stage algorithm to construct the Morse-Smale complex in parallel, the first stage independently computing local features per block and the second stage merging to resolve global features. Our implementation is based on MPI and a distributed-memory architecture. Through a set of scalability studies on the IBM Blue Gene/P supercomputer, we c...
Defining high-level features, detecting them, tracking them and deriving quantities based on them is...
International audienceMorse-Smale (MS) complexes have been gaining popularity as a tool for feature-...
The Morse-Smale complex is an efficient representation of the gradient behavior of a scalar function...
pre-printTopology-based techniques are useful for multi-scale exploration of the feature space of sc...
The Morse-Smale complex is a useful topological data structure for the analysis and visualization of...
The Morse-Smale complex is a well studied topological structure that represents the gradient flow be...
The Morse-Smale complex is a topological structure that captures the behavior of the gradient of a s...
The 3D Morse-Smale complex is a fundamental topological construct that partitions the domain of a re...
The Morse-Smale complex is a frequently used structure to represent the topology of a scalar field, ...
This thesis presents a novel computational framework that allows for a robust extraction and quantif...
Improved simulations and sensors are producing datasets whose increasing complexity exhausts our abi...
This thesis presents a novel computational framework that allows for a robust extraction and quantif...
thesisThe ever-increasing amounts of data generated by scientific simulations, coupled with system I...
pre-printTopological techniques have proven highly successful in analyzing and visualizing scientifi...
Scientific visualization aims at helping users (i) abstract, (ii) interact with and (iii) analyze si...
Defining high-level features, detecting them, tracking them and deriving quantities based on them is...
International audienceMorse-Smale (MS) complexes have been gaining popularity as a tool for feature-...
The Morse-Smale complex is an efficient representation of the gradient behavior of a scalar function...
pre-printTopology-based techniques are useful for multi-scale exploration of the feature space of sc...
The Morse-Smale complex is a useful topological data structure for the analysis and visualization of...
The Morse-Smale complex is a well studied topological structure that represents the gradient flow be...
The Morse-Smale complex is a topological structure that captures the behavior of the gradient of a s...
The 3D Morse-Smale complex is a fundamental topological construct that partitions the domain of a re...
The Morse-Smale complex is a frequently used structure to represent the topology of a scalar field, ...
This thesis presents a novel computational framework that allows for a robust extraction and quantif...
Improved simulations and sensors are producing datasets whose increasing complexity exhausts our abi...
This thesis presents a novel computational framework that allows for a robust extraction and quantif...
thesisThe ever-increasing amounts of data generated by scientific simulations, coupled with system I...
pre-printTopological techniques have proven highly successful in analyzing and visualizing scientifi...
Scientific visualization aims at helping users (i) abstract, (ii) interact with and (iii) analyze si...
Defining high-level features, detecting them, tracking them and deriving quantities based on them is...
International audienceMorse-Smale (MS) complexes have been gaining popularity as a tool for feature-...
The Morse-Smale complex is an efficient representation of the gradient behavior of a scalar function...