Contribuições para a enumeração e para a análise de mecanismos e manipuladores paralelos

Tese (doutorado) - Universidade Federal de Santa Catarina, Centro Tecnológico, Programa de Pós-Graduação em Engenharia Mecânica, Florianópolis, 2010A fase de projeto conceitual demecanismos emanipuladores paralelos, i.e. estruturas cinematicas, destina-se ao desenvolvimento da concepçao da cadeia cinematica. As etapas fundamentais para o desenvolvimento da concepao da cadeia cinematica sao sintese e analise. A sintese corresponde à enumeraçao de concepcoes e a analise corresponde `a seleçao das concepçoes mais promissoras considerando os requisitos de projeto. O objetivo deste trabalho é aplicar ferramentas da teoria de grupos e teoria de grafos para a enumeraçao e para a analise de estruturas cinematicas. A enumeraçao sera desenvolvida de forma sistematica em tres niveis: enumeraçao de cadeias cinematicas, enumeraçao de mecanismos e enumeraçao de manipuladores paralelos. A aplicaçao de ferramentas da teoria de grafos e grupos permite desenvolver novos metodos para enumeraçao e, consequentemente, obter novos resultados. A analise sera simplificada considerando um novo metodo que avalia as simetrias das cadeias cinematicas. Uma cadeia cinematica é representada de forma univoca atraves de um grafo. A representaçao atraves do grafo permite a manipulaçao computacional do problema de enumeraçao de cadeias cinematicas. A aplicaçao de ferramentas integradas da teoria de grafos e teoria de grupos permite identificar as simetrias das cadeias cinematicas atraves do grupo de automorfismos do grafo e, assim, é possivel identificar quais são as possiveis escolhas de base para novos mecanismos e avaliar quais sao as possiveis escolhas de base e efetuador final para manipuladores paralelos. O primeiro nivel da sintese corresponde à enumeraçao de cadeias cinematicas com determinada mobilidade, numero de elos, numero de juntas que operam num determinado sistema de helicoides. O segundo nivel da sintese corresponde a enumeraçao de mecanismos. Um mecanismo é uma cadeia cinematica com um elo escolhido para ser a base. Assim, a enumeraçao de mecanismos consiste em determinar todas as possiveis escolhas de bases para uma determinada cadeia cinematica. O principal conceito empregado neste nivel é o de simetria de grafos não coloridos e orbitas do grupo de automorfismos. O terceiro nivel da sintese corresponde `a enumeraçao de manipuladores paralelos. Um manipulador paralelo é uma cadeia cinematica com um elo escolhido para ser a base e outro para ser o efetuador final. Em outras palavras, um manipulador paralelo é um mecanismo com um elo escolhido para ser o efetuador final. Assim, a enumeraçao de manipuladores paralelos consiste em determinar todas as possiveis escolhas de efetuador final para um determinado mecanismo. O principal conceito empregado neste nivel é a simetria de grafos coloridos e orbitas do grupo de automorfismos de grafos coloridos. Na etapa de analise das concepcoes enumeradas serao abordadas propriedades bem estabelecidas na literatura: mobilidade, variedade, conectividade, grau de controle, redundancia e simetria. Mobilidade e variedade sao propriedades globais das estruturas cinematicas. Conectividade, grau de controle e redundancia sao propriedades locais, i.e. entre dois elos da estrutura cinematica e sao dadas por matrizes n×n, onde n é o número de elos da cadeia. A simetria pode ser considerada uma propriedade global e/ou local da estrutura cinem´atica. A aplicaçao de ferramentas integradas da teoria de grafos e teoria de grupos permite demonstrar que as propriedades locais sao invariantes pela acao do grupo de automorfismos do grafo, i.e. elas sao propriedades simetricas. Desta forma, a representaçao matricial é reduzida de n×n para o×n, onde o é o numero de orbitas do grupo de automorfismos do grafo aassociado à estrutura cinematica. Essa abordagem permite simplificar a analise de estruturas cinematicas apenas considerando as simetrias das cadeia associadas

Applications of the local state-space form of constrained mechanical systems in multibody dynamics and robotics

This thesis explores several areas in dynamics which can be viewed as applications of the local state-space form of a mechanical system. The simulation of mechanical systems often involves the solution of differential algebraic equations (DAEs). DAEs occur in every mechanism containing kinematic loops. Such systems can be found in a wide range of areas including the aerospace, automotive, construction, and farm equipment industries. The numerical treatment of DAEs is a topic which is relatively recent and continues to be studied. One can regard DAEs as ordinary differential equations (ODEs) on certain invariant manifolds after index reduction. Thus, the numerical solutions of the DAEs can be obtained through integration of their underlying ODEs. In certain circumstances, difficulties may occur since the numerical solutions of the underlying ODE can drift away from the invariant manifold. In this thesis, the underlying ODEs are locally transformed into ODEs of minimal dimension via local parameterizations of the invariant manifold. By their nature, such ODEs are local and implicit, but their solutions do not suffer from the drift phenomenon. Since the states of these minimal ODEs are independent, they are known as a local state-space form of the equations of motion. This work focuses on generalizing the application of the local state-space form and applying it towards problem areas in multibody dynamics and robotics. The first application of the local state-space form is in deriving a formulation of dynamics called the Singularity Robust Null Space Formulation. This formulation utilizes several aspects of the singular value decomposition for an approach which is efficient, does not fail at singularities, and is better suited than most near singularities. The second application area in this work is the study of the linearized mechanical system. Since the linearized model is also useful in optimization and implicit integration problems, an efficient recursive algorithm for its construction is derived. The algorithm appeals to a formulation of the dynamics found in robotics to ease in a coherent derivation

Euclidean distance geometry and applications

Euclidean distance geometry is the study of Euclidean geometry based on the concept of distance. This is useful in several applications where the input data consists of an incomplete set of distances, and the output is a set of points in Euclidean space that realizes the given distances. We survey some of the theory of Euclidean distance geometry and some of the most important applications: molecular conformation, localization of sensor networks and statics.Comment: 64 pages, 21 figure

Contributions to Open Problems on Cable Driven Robots and Persistent Manifolds for the Synthesis of Mechanisms

Although many efforts are continuously devoted to the advancement of robotics, there are still many open and unresolved problems to be faced. This thesis, therefore, sets out to tackle some of them with the aim of scratching the surface and look a little further for new ideas or solutions. The topics covered are mainly two. The first part deals with the development and improvement of control techniques for cable-driven robots. The second focuses on the study of persistent manifolds seen as constituting aspects of theoretical kinematics. In detail, -Part I deals with cable-driven platforms. In it, both techniques for selecting cable tensions and the design of a robust controller are developed. The aim is, therefore, to enhance the two building blocks of the overall control scheme in order to improve the performance of these robots during the execution of tracking tasks. -- The first chapter introduces to open problems and recalls the main concepts necessary to understand the following chapters; -- the contribution of the second chapter consists of the introduction of the Analytic Centre. It allows the generation of continuous and differentiable tension profiles while taking into account non-linear phenomena such as friction in the computation of tensions to be applied; -- the third chapter, although still at a preliminary stage, introduces sensitivity for tension calculation methods, offering perspectives of considerable interest for tension control in the current scientific context; -- the fourth chapter proposes the design of an adaptive controller. It allows external disturbances and/or uncertainties in the model to be faced such that the task can be performed with as little error as possible. The controller architecture is the innovative peculiarity conferring autonomy to cable systems. Initially applied to counteract wind in aerial systems it is now also used for cable breakage scenarios; -- the conclusions, at first, draw together the results obtained. In addition, they emphasise the lack of the techniques introduced in order to outline possible future paths and topics that need further investigation. - Part II delves into theoretical kinematics. The discovery and classification of invariant screw systems shed light on numerous aspects of robot mobility and synthesis. Nevertheless, this generated the emergence of new ideas and questions that are still unresolved. Among them, one of the more notable concerns the identification and classification of 5-dimensional persistent manifolds. -- Similarly to the first part, the first chapter provides an overview of the problems addressed and the theoretical notions necessary to understand the subsequent contributions; -- the second chapter contributes by directly tackling the above-mentioned question by exploiting the properties of dual quaternions, the Study quadric and differential geometry. A library of 5-persistent varieties, so far missing in the literature, is presented along with theorems that complete and generalise previous ones in the literature; -- an original work, concerning line motions and synthesis of mechanisms that generate them, is reported in the third chapter as a spin-off of the studies on persistent manifolds; -- the conclusions wrap up the obtained results trying to highlight gaps and deficiencies to be dealt with in the future. Here, two small sections are dedicated to ongoing works regarding the persistence definition and the screw systems' invariants and subvariants

Advanced Strategies for Robot Manipulators

Amongst the robotic systems, robot manipulators have proven themselves to be of increasing importance and are widely adopted to substitute for human in repetitive and/or hazardous tasks. Modern manipulators are designed complicatedly and need to do more precise, crucial and critical tasks. So, the simple traditional control methods cannot be efficient, and advanced control strategies with considering special constraints are needed to establish. In spite of the fact that groundbreaking researches have been carried out in this realm until now, there are still many novel aspects which have to be explored