## Algebraic Frames for the Perception-Action Cycle: Second International Workshop, AFPAC 2000, Kiel, Germany, September 10-11, 2000 ProceedingsGerald Sommer, Yehoshua Y. Zeevi This volume presents the proceedings of the 2nd International Workshop on - gebraic Frames for the Perception and Action Cycle. AFPAC 2000. held in Kiel, Germany, 10–11 September 2000. The presented topics cover new results in the conceptualization, design, and implementation of visual sensor-based robotics and autonomous systems. Special emphasis is placed on the role of algebraic modelling in the relevant disciplines, such as robotics, computer vision, theory of multidimensional signals, and neural computation. The aims of the workshop are twofold: ?rst, discussion of the impact of algebraic embedding of the task at hand on the emergence of new qualities of modelling and second, facing the strong relations between dominant geometric problems and algebraic modelling. The ?rst workshop in this series, AFPAC’97. inspired several groups to i- tiate new research programs, or to intensify ongoing research work in this ?eld, and the range of relevant topics was consequently broadened, The approach adopted by this workshop does not necessarily ?t the mainstream of worldwide research-granting policy. However, its search for fundamental problems in our ?eld may very well lead to new results in the relevant disciplines and contribute to their integration in studies of the perception–action cycle. |

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### Contents

Analyzing Action Representations | 1 |

The Systems Theory of Contact | 22 |

An Associative PerceptionAction Structure Using a Localized Space Variant Information Representation | 48 |

The Structure of Colorimetry | 69 |

Fast Calculation Algorithms of Invariants for Color and Multispectral Image Recognition | 78 |

Tracking Analysis and Inverse Kinematics | 104 |

The Lie Model for Euclidean Geometry | 115 |

On the Geometric Structure of Spatiotemporal Patterns | 134 |

LieTheory and Dynamical Illumination Changes | 218 |

A Group Theoretical Formalization of Contact Motion | 229 |

Periodic Pattern Analysis under Affine Distortions Using Wallpaper Groups | 241 |

Wavelet Filter Design via Linear Independent Basic Filters | 251 |

Lie Group Modeling of Nonlinear Point Set Shape Variability | 259 |

Symmetries in World Geometry and Adaptive System Behaviour | 269 |

Pose Estimation in the Language of Kinematics | 284 |

Algebraic Frames for Commutative Hyperharmonic Analysis of Signals and Images | 294 |

Learning Geometric Transformations with Clifford Neurons | 144 |

Hurwitzion Algebra and its Application to the FFT Synthesis | 154 |

DiffusionSnakes Using Statistical Shape Knowledge | 164 |

The Multidimensional Isotropic Generalization of Quadrature Filters in Geometric Algebra | 175 |

Sparse Feature Maps in a Scale Hierarchy | 186 |

Estimation and Tracking of Articulated Motion Using Geometric Algebra | 197 |

Geometric Properties of Central Catadioptric Projections | 208 |

GaborSpace Geodesic Active Contours | 309 |

Color Image Enhancement by a ForwardandBackward Adaptive Beltrami Flow | 319 |

PointBased Registration Assuming Affine Motion | 329 |

Extended Kalman Filter Design for Motion Estimation by Point and Line Observations | 339 |

349 | |

### Other editions - View all

Algebraic Frames for the Perception-Action Cycle: Second International ... Gerald Sommer,Yehoshua Y. Zeevi No preview available - 2014 |

Algebraic Frames for the Perception-Action Cycle: Second International ... Gerald Sommer,Yehoshua Y. Zeevi No preview available - 2000 |

### Common terms and phrases

3D motion AFPAC algorithm analysis analytic signal Berlin Heidelberg 2000 bivector channel Clifford algebra components Computer Vision constraint contour convolution coordinates corresponding deﬁned Deﬁnition denote discrete domain equation Euclidean feature ﬁeld ﬁlters ﬁnd ﬁrst ﬂow Fourier transform Gabor filters geometric algebra gradient homogeneous model hyperplane IEEE input invariants inverse Labunets V. G. Legendre transform Lie circles Lie sphere linear manifold matrix modular multivector nonlinear null vectors object obtain operators oriented contact orthogonal output parameters periodic pattern phase plane point set pose estimation problem projection quadrature filters quaternion recognition representation represented respectively Robotics rotation rotor scalar scale sensor shape signal Sommer and Y. Y. spatial spectral spectrum structure structure tensor surface symmetry group tangent tangential dilation Theorem theory transfer function translation values variability vector field wallpaper groups Y. Y. Zeevi Eds zero