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Inleiding Landmeetkunde is bedoeld voor studenten van universiteit en hogeschool. Van de vlakke landmeetkunde worden grondbegrippen, berekenings- en meet methoden, maar ook instrumentele onderwerpen behandeld. Belangrijke hoofdstukken zijn gewijd aan de fotogrammetrie, de kartografie, hydrografische metingen, maatvoering van bouwprojecten en plaats bepaling met radiosatelieten. Voorts wordt aan dacht besteed aan de kadastrale registratie en de landinrichting.
geodesie --- landmeetkunde --- Geodesy. Cartography --- waterpas --- theodoliet --- afstandsmeting --- veelhoeksmeting --- tachymeter --- (zie ook: waterpassing) --- Landmeetkunde. --- Cartografie. --- topografie (landmeetkunde) --- hoogtemeting --- fotogrammetrie --- cartografie --- Kartografie --- Fotogrammetrie --- 712.24
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Geometry --- Discrete mathematics --- Mathematics --- landmeetkunde --- discrete wiskunde --- wiskunde --- geometrie
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Landmeetkunde. --- Rijkscommissie voor geodesie. --- Verenigingen. --- Netherlands. --- History. --- Niederlande.
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ruimtelijke ordening --- administratief recht --- verbintenissenrecht --- milieurecht --- Private law --- Geodesy. Cartography --- Environmental planning --- landmeetkunde --- wetgeving --- Administrative law --- Belgium --- bouwrecht --- topografie (landmeetkunde)
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geodesie --- kadaster --- landmeetkunde --- Geodesy. Cartography --- Detailmeting --- Fotogrammetrie --- Grondslagmeting --- Topografie --- Geodesie --- GPS
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878 --- Literature Latin Miscellaneous writings --- Surveying --- Corpus agrimensorum Romanorum. --- Arpentage --- Landmeetkunde. --- Hyginus, --- Corpus agrimensorum Romanorum
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geodesie --- landmeetkunde --- Geodesy. Cartography --- Geografie --- Statistical hypothesis testing. --- Mathematical models --- Geodesy --- Geodesie. --- Testing. --- Statistical methods.
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This book introduces the reader to modern algebraic geometry. It presents Grothendieck's technically demanding language of schemes that is the basis of the most important developments in the last fifty years within this area. A systematic treatment and motivation of the theory is emphasized, using concrete examples to illustrate its usefulness. Several examples from the realm of Hilbert modular surfaces and of determinantal varieties are used methodically to discuss the covered techniques. Thus the reader experiences that the further development of the theory yields an ever better understanding of these fascinating objects. The text is complemented by many exercises that serve to check the comprehension of the text, treat further examples, or give an outlook on further results. The volume at hand is an introduction to schemes. To get startet, it requires only basic knowledge in abstract algebra and topology. Essential facts from commutative algebra are assembled in an appendix. It will be complemented by a second volume on the cohomology of schemes. Prevarieties - Spectrum of a Ring - Schemes - Fiber products - Schemes over fields - Local properties of schemes - Quasi-coherent modules - Representable functors - Separated morphisms - Finiteness Conditions - Vector bundles - Affine and proper morphisms - Projective morphisms - Flat morphisms and dimension - One-dimensional schemes - Examples Prof. Dr. Ulrich Görtz, Institute of Experimental Mathematics, University Duisburg-Essen Prof. Dr. Torsten Wedhorn, Department of Mathematics, University of Paderborn
Algebra --- Geometry --- algebra --- landmeetkunde --- Geometric geometry. --- Géométrie algébrique --- Géométrie algébrique - Problèmes et exercices
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This monograph focuses on the geometric theory of motivic integration, which takes its values in the Grothendieck ring of varieties. This theory is rooted in a groundbreaking idea of Kontsevich and was further developed by Denef & Loeser and Sebag. It is presented in the context of formal schemes over a discrete valuation ring, without any restriction on the residue characteristic. The text first discusses the main features of the Grothendieck ring of varieties, arc schemes, and Greenberg schemes. It then moves on to motivic integration and its applications to birational geometry and non-Archimedean geometry. Also included in the work is a prologue on p-adic analytic manifolds, which served as a model for motivic integration. With its extensive discussion of preliminaries and applications, this book is an ideal resource for graduate students of algebraic geometry and researchers of motivic integration. It will also serve as a motivation for more recent and sophisticated theories that have been developed since. .
Algebraic geometry --- Geometry --- Mathematics --- Physics --- landmeetkunde --- zeevaartagenten --- wiskunde --- fysica --- geometrie --- Motives (Mathematics) --- Algebraic geometry. --- K-theory. --- Algebraic Geometry. --- K-Theory.
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