Computer Vision Talks at Columbia University
A Generative Theory of Shape
Michael Leyton
Rutgers University
Wednesday, April/17, 1 PM
CAVE Lab, 6th Floor CEPSR, Schapiro
Host: Prof. Shree Nayar
Abstract
This talk gives an introduction to my book, A Generative Theory of Shape
(Springer-Verlag, 550pages). The purpose of the book is to develop a
generative theory of shape that has two properties regarded as
fundamental to intelligence - maximizing transfer of structure and
maximizing recoverability of the generative operations. These two
properties are particularly important in the representation of complex
shape - which is the main concern of the book. The primary goal of the
theory is the conversion of complexity into understandability. For this
purpose, a mathematical theory is presented of how understandability is
created in a structure. This is achieved by developing a group-theoretic
approach to formalizing transfer and recoverability. To handle complex
shape, a new class of groups is developed, called unfolding groups. These
unfold structure from a maximally collapsed version of that structure. A
principal aspect of the theory is that it develops a group-theoretic
formalization of major object-oriented concepts such as inheritance. The
result is an object-oriented theory of geometry.
The algebraic theory is applied in detail to CAD, perception, and
robotics. In CAD, lengthy chapters are presented on mechanical and
architectural design. For example, using the theory of unfolding groups,
the book works in detail through the main stages of mechanical CAD/CAM:
part-design, assembly and machining. And within part-design, an extensive
algebraic analysis is given of sketching, alignment, dimensioning,
resolution, editing, sweeping, feature-addition, and intent-management.
The equivalent analysis is also done for architectural design. In
perception, extensive theories are given for grouping and the main
Gestalt motion phenomena (induced motion, separation of systems, the
Johannson relative/absolute motion effects); as well as orientation and
form. In robotics, several levels of analysis are developed for
manipulator structure, using the author's algebraic theory of
object-oriented structure.
This book can be viewed electronically at the following site:
http://link.springer.de/link/service/series/0558/tocs/t2145.htm
Author's email address: mleyton@dimacs.rutgers.edu