An approach to the analysis of swept volumes is introduced. It is shown that every smooth Euclidean motion or sweep, can be identified with a first-order, linear, ordinary differential equation. This sweep differential equation provides useful insights into the topological and geometrical nature of the swept volume of an object. A certain class, autonomous sweeps, is identified by the form of the associated differential equation, and several properties of the swept volumes of the members of this class are analyzed. The results are applied to generate swept volumes for a number of objects. Implementation of the sweep differential equation approach with computer-based numerical and graphical methods is also discussed
An approach to the study of the topology and geometry of swept volumes is developed based on the the...
A formulation for developing a geometric repre-sentation of swept volumes for compact-manifolds unde...
A formulation for developing a geometric repre sentation of swept volumes for compact n-manifolds un...
The Sweep-Envelope Differential Equation (SEDE) and some aspects of the Sweep Differential Equation ...
The differential equation approach for characterizing swept volume boundaries is extended to include...
A survey of swept volume concepts and methods is presented. It consolidates and relates seemingly di...
The sweep differential equation approach and the boundary-flow method developed for the analysis and...
The sweep differential equation approach is used to classify the swept volumes of robot links in two...
A new method, called the sweep-envelope differential equation, for characterizing swept volume bound...
In this thesis, a method for representing swept volume based on the sweep differential equation and ...
Geometric modeling of a moving object (a generator) depends on two factors: its geometry and motion ...
The swept volume of a moving object (generator) can be constructed from the envelope surfaces of its...
Evaluating the volume swept out by a three-dimensional (3D) object as it moves along an arbitrary pa...
The swept volume problem is practical, dif®cult and interesting enough to have received a great deal...
The trimming problem for swept volumes — concerning the excision of points ostensibly on the boundar...
An approach to the study of the topology and geometry of swept volumes is developed based on the the...
A formulation for developing a geometric repre-sentation of swept volumes for compact-manifolds unde...
A formulation for developing a geometric repre sentation of swept volumes for compact n-manifolds un...
The Sweep-Envelope Differential Equation (SEDE) and some aspects of the Sweep Differential Equation ...
The differential equation approach for characterizing swept volume boundaries is extended to include...
A survey of swept volume concepts and methods is presented. It consolidates and relates seemingly di...
The sweep differential equation approach and the boundary-flow method developed for the analysis and...
The sweep differential equation approach is used to classify the swept volumes of robot links in two...
A new method, called the sweep-envelope differential equation, for characterizing swept volume bound...
In this thesis, a method for representing swept volume based on the sweep differential equation and ...
Geometric modeling of a moving object (a generator) depends on two factors: its geometry and motion ...
The swept volume of a moving object (generator) can be constructed from the envelope surfaces of its...
Evaluating the volume swept out by a three-dimensional (3D) object as it moves along an arbitrary pa...
The swept volume problem is practical, dif®cult and interesting enough to have received a great deal...
The trimming problem for swept volumes — concerning the excision of points ostensibly on the boundar...
An approach to the study of the topology and geometry of swept volumes is developed based on the the...
A formulation for developing a geometric repre-sentation of swept volumes for compact-manifolds unde...
A formulation for developing a geometric repre sentation of swept volumes for compact n-manifolds un...