TY - THES A1 - Bock, Sebastian T1 - Über funktionentheoretische Methoden in der räumlichen Elastizitätstheorie T1 - On the use of monogenic functions in the spatial theory of elasticity N2 - Die Behandlung von geometrischen Singularitäten bei der Lösung von Randwertaufgaben der Elastostatik stellt erhöhte Anforderungen an die mathematische Modellierung des Randwertproblems und erfordert für eine effiziente Auswertung speziell angepasste Berechnungsverfahren. Diese Arbeit beschäftigt sich mit der systematischen Verallgemeinerung der Methode der komplexen Spannungsfunktionen auf den Raum, wobei der Schwerpunkt in erster Linie auf der Begründung des mathematischen Verfahrens unter besonderer Berücksichtigung der praktischen Anwendbarkeit liegt. Den theoretischen Rahmen hierfür bildet die Theorie quaternionenwertiger Funktionen. Dementsprechend wird die Klasse der monogenen Funktionen als Grundlage verwendet, um im ersten Teil der Arbeit ein räumliches Analogon zum Darstellungssatz von Goursat zu beweisen und verallgemeinerte Kolosov-Muskhelishvili Formeln zu konstruieren. Im Hinblick auf die vielfältigen Anwendungsbereiche der Methode beschäftigt sich der zweite Teil der Arbeit mit der lokalen und globalen Approximation von monogenen Funktionen. Hierzu werden vollständige Orthogonalsysteme monogener Kugelfunktionen konstruiert, infolge dessen neuartige Darstellungen der kanonischen Reihenentwicklungen (Taylor, Fourier, Laurent) definiert werden. In Analogie zu den komplexen Potenz- und Laurentreihen auf der Grundlage der holomorphen z-Potenzen werden durch diese monogenen Orthogonalreihen alle wesentlichen Eigenschaften bezüglich der hyperkomplexen Ableitung und der monogenen Stammfunktion verallgemeinert. Anhand repräsentativer Beispiele werden die qualitativen und numerischen Eigenschaften der entwickelten funktionentheoretischen Verfahren abschließend evaluiert. In diesem Kontext werden ferner einige weiterführende Anwendungsbereiche im Rahmen der räumlichen Funktionentheorie betrachtet, welche die speziellen Struktureigenschaften der monogenen Potenz- und Laurentreihenentwicklungen benötigen. N2 - In structural mechanics, boundary value problems with geometrical singularities require advanced mathematical modeling techniques and especially adapted numerical methods in order to obtain a precise description of the singular near field. This doctoral thesis deals with a systematic approach to a spatial analog of the method of complex stress functions. Here, the main focus is on the generalization of the mathematical method in consideration of the practical applicability. The theoretical framework is therefore constituted by methods of hypercomplex function theory in particular the theory of quaternion-valued functions. Thus, the class of monogenic functions is methodically used in the first part of the thesis to prove a spatial counterpart of Goursat's representation theorem that enables the construction of generalized Kolosov-Muskhelishvili formulae in three dimensions. The second part of the thesis is concerned with the local and global approximation of monogenic functions. In this context, new monogenic representation formulae of the canonical series expansions (Taylor, Fourier, Laurent) are defined by using complete orthogonal systems of solid spherical monogenics. These monogenic orthogonal series generalize the important structural properties of the complex-one-dimensional power and Laurent series expansions concerning the hypercomplex derivative and the monogenic primitive. Finally, representative examples are studied to evaluate the function-theoretical methods constructed here by means of their qualitative and numerical characteristics. In this connection, some further fields of application in the framework of hypercomplex function theory are considered, which essentially need the specific structural properties of the monogenic power and Laurent series expansions. KW - Lineare Elastizitätstheorie KW - Funktionentheorie KW - Clifford-Analysis KW - Hyperkomplexe Funktion KW - Fourier-Reihe KW - Taylor-Reihe KW - Laurent-Reihe KW - Darstellungssatz von Goursat KW - verallgemeinerte Kolosov-Muskhelishvili Formeln KW - monogene Orthogonalreihenentwicklungen KW - Fourier KW - Taylor KW - Laurent KW - generalized theorem of Goursat KW - generalized Kolosov-Muskhelishvili formulae KW - monogenic orthogonal series expansions Fourier KW - Taylor KW - Laurent Y1 - 2010 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:gbv:wim2-20100407-15030 UR - http://vg08.met.vgwort.de/na/cd7b10419c7f444490a4fdd5ef4184d1 ER - TY - CHAP A1 - Almamou, Abd Albasset A1 - Gebhardt, Thomas A1 - Bock, Sebastian A1 - Hildebrand, Jörg A1 - Schwarz, Willfried ED - Gürlebeck, Klaus ED - Lahmer, Tom T1 - QUALITY CONTROL OF CONSTRUCTED MODELS USING 3D POINT CLOUD T2 - Digital Proceedings, International Conference on the Applications of Computer Science and Mathematics in Architecture and Civil Engineering : July 20 - 22 2015, Bauhaus-University Weimar N2 - Over the last decade, the technology of constructing buildings has been dramatically developed especially with the huge growth of CAD tools that help in modeling buildings, bridges, roads and other construction objects. Often quality control and size accuracy in the factory or on construction site are based on manual measurements of discrete points. These measured points of the realized object or a part of it will be compared with the points of the corresponding CAD model to see whether and where the construction element fits into the respective CAD model. This process is very complicated and difficult even when using modern measuring technology. This is due to the complicated shape of the components, the large amount of manually detected measured data and the high cost of manual processing of measured values. However, by using a modern 3D scanner one gets information of the whole constructed object and one can make a complete comparison against the CAD model. It gives an idea about quality of objects on the whole. In this paper, we present a case study of controlling the quality of measurement during the constructing phase of a steel bridge by using 3D point cloud technology. Preliminary results show that an early detection of mismatching between real element and CAD model could save a lot of time, efforts and obviously expenses. KW - Angewandte Informatik KW - Angewandte Mathematik KW - Building Information Modeling KW - Computerunterstütztes Verfahren KW - Data, information and knowledge modeling in civil engineering; Function theoretic methods and PDE in engineering sciences; Mathematical methods for (robotics and) computer vision; Numerical modeling in engineering; Optimization in engineering applications Y1 - 2015 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:gbv:wim2-20170314-27944 SN - 1611-4086 ER - TY - CHAP A1 - Gürlebeck, Klaus A1 - Bock, Sebastian A1 - Falcao, M. Irene T1 - Applications of Bergman kernel functions N2 - In this paper we revisit the so-called Bergman kernel method (BKM) for solving conformal mapping problems. This method is based on the reproducing property of the Bergman kernel function. The main drawback of this well known technique is that it involves an orthonormalization process and thus is numerically unstable. This difficulty can be, in some cases, overcome by using the Maple system, which makes no use of numeric quadrature. We illustrate this implementation by presenting a numerical example. The construction of reproducing kernel functions is not restricted to real dimension 2. Results concerning the construction of Bergman kernel functions in closed form for special domains in the framework of hypercomplex function theory suggest that BKM can also be extended to mapping problems in higher dimensions, particularly 3-dimensional cases. We describe such a generalized BKM-approach and present numerical examples obtained by the use of specially developed software packages for quaternions. KW - Konforme Abbildung KW - Kernel Y1 - 2003 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:gbv:wim2-20111215-2994 ER - TY - THES A1 - Bock, Sebastian T1 - Approximation mit polynomialen Lösungen der Laméschen Differentialgleichung T1 - Approximation with Polynomial Solutions of Lamé Differential Equation N2 - Grundidee der Arbeit ist es, Lösungen von Randwertaufgaben durch Linearkombinationen exakter klassischer Lösungen der Differentialgleichung zu approximieren. Die freien Koeffizienten werden dabei durch die Bestimmung der besten Approximation der Randwerte berechnet. Als Basis der Approximation werden vollständige orthogonale und nahezu orthogonale Funktionensysteme verwendet. Anhand ausgewählter Beispiele mit Randvorgaben unterschiedlicher Glattheit wird am Beispiel der Kugel die prinzipielle Anwendbarkeit der Methode getestet und hinsichtlich der Entwicklung des Fehlers der Näherungslösung, der Stabilität des Verfahrens und des numerischen Aufwandes untersucht. Die erhaltenen Resultate geben einen begründeten Anlass, die Anwendung der Methode als Bestandteil einer hybriden analytisch-numerischen Methode, insbesondere der Verknüpfung mit der FEM, weiterzuverfolgen. KW - Legendre-Funktion KW - Lamé-Gleichung KW - Festkörpermechanik KW - Orthonormalbasis KW - Beste Approximation KW - Fourier-Reihe KW - Hyperholomorphe-Funktion KW - spherical harmonics KW - Lamé-equation KW - continuum mechanic KW - complete orthonormal system KW - best approximation Y1 - 2004 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:gbv:wim2-20111215-6409 N1 - Der Volltext-Zugang wurde im Zusammenhang mit der Klärung urheberrechtlicher Fragen mit sofortiger Wirkung gesperrt. ER - TY - JOUR A1 - Stein, Peter A1 - Lahmer, Tom A1 - Bock, Sebastian T1 - Synthese und Analyse von gekoppelten Modellen im konstruktiven Ingenieurbau BT - Sonderdruck‐DFG Graduiertenkolleg JF - Bautechnik N2 - Synthese und Analyse von gekoppelten Modellen im konstruktiven Ingenieurbau KW - Angewandte Mathematik KW - Stochastik KW - Strukturmechanik Y1 - 2011 SP - 8 EP - 11 ER - TY - JOUR A1 - Lahmer, Tom A1 - Bock, Sebastian A1 - Hildebrand, Jörg A1 - Gürlebeck, Klaus T1 - Non-destructive identification of residual stresses in steel under thermal loadings JF - Inverse Problems in Science and Engineering N2 - Non-destructive identification of residual stresses in steel under thermal loadings KW - Angewandte Mathematik KW - Stochastik KW - Strukturmechanik Y1 - 2016 SP - 1 EP - 17 ER - TY - CHAP A1 - Bock, Sebastian A1 - Gürlebeck, Klaus ED - Gürlebeck, Klaus ED - Könke, Carsten T1 - A Coupled Ritz-Galerkin Approach Using Holomorphic and Anti-holomorphic Functions N2 - The contribution focuses on the development of a basic computational scheme that provides a suitable calculation environment for the coupling of analytical near-field solutions with numerical standard procedures in the far-field of the singularity. The proposed calculation scheme uses classical methods of complex function theory, which can be generalized to 3-dimensional problems by using the framework of hypercomplex analysis. The adapted approach is mainly based on the factorization of the Laplace operator EMBED Equation.3 by the Cauchy-Riemann operator EMBED Equation.3 , where exact solutions of the respective differential equation are constructed by using an orthonormal basis of holomorphic and anti-holomorphic functions. KW - Architektur KW - CAD KW - Computerunterstütztes Verfahren Y1 - 2006 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:gbv:wim2-20170327-29281 UR - http://euklid.bauing.uni-weimar.de/ikm2006/index.php_lang=de&what=papers.html ER - TY - CHAP A1 - Legatiuk, Dmitrii A1 - Bock, Sebastian A1 - Gürlebeck, Klaus ED - Gürlebeck, Klaus ED - Lahmer, Tom ED - Werner, Frank T1 - THE PROBLEM OF COUPLING BETWEEN ANALYTICAL SOLUTION AND FINITE ELEMENT METHOD T2 - Digital Proceedings, International Conference on the Applications of Computer Science and Mathematics in Architecture and Civil Engineering : July 04 - 06 2012, Bauhaus-University Weimar N2 - This paper is focused on the first numerical tests for coupling between analytical solution and finite element method on the example of one problem of fracture mechanics. The calculations were done according to ideas proposed in [1]. The analytical solutions are constructed by using an orthogonal basis of holomorphic and anti-holomorphic functions. For coupling with finite element method the special elements are constructed by using the trigonometric interpolation theorem. KW - Angewandte Informatik KW - Angewandte Mathematik KW - Computerunterstütztes Verfahren Y1 - 2012 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:gbv:wim2-20170314-27730 UR - http://euklid.bauing.uni-weimar.de/ikm2012 SN - 1611-4086 ER -