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This book showcases powerful new hybrid methods that combine numerical and symbolic algorithms. Hybrid algorithm research is currently one of the most promising directions in the context of geosciences mathematics and computer mathematics in general. One important topic addressed here with a broad range of applications is the solution of multivariate polynomial systems by means of resultants and Groebner bases. But that’s barely the beginning, as the authors proceed to discuss genetic algorithms, integer programming, symbolic regression, parallel computing, and many other topics. The book is strictly goal-oriented, focusing on the solution of fundamental problems in the geosciences, such as positioning and point cloud problems. As such, at no point does it discuss purely theoretical mathematics. "The book delivers hybrid symbolic-numeric solutions, which are a large and growing area at the boundary of mathematics and computer science." Dr. Daniel Li chtbau.

Earth sciences. --- Geology. --- Atmospheric sciences. --- Geographical information systems. --- Mathematical physics. --- Environmental sciences. --- Earth Sciences. --- Mathematical Applications in the Physical Sciences. --- Math. Appl. in Environmental Science. --- Geographical Information Systems/Cartography. --- Atmospheric Sciences. --- Environmental science --- Science --- Physical mathematics --- Physics --- Geographical information systems --- GIS (Information systems) --- Information storage and retrieval systems --- Aerophysics --- Meteorology, Physical --- Physical meteorology --- Atmospheric science --- Geognosy --- Geoscience --- Earth sciences --- Natural history --- Geosciences --- Environmental sciences --- Physical sciences --- Mathematics --- Geography --- Atmospheric sciences --- Geophysics --- Mathematics. --- Statistical methods. --- Atmosphere

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This book showcases powerful new hybrid methods that combine numerical and symbolic algorithms. Hybrid algorithm research is currently one of the most promising directions in the context of geosciences mathematics and computer mathematics in general. One important topic addressed here with a broad range of applications is the solution of multivariate polynomial systems by means of resultants and Groebner bases. But that’s barely the beginning, as the authors proceed to discuss genetic algorithms, integer programming, symbolic regression, parallel computing, and many other topics. The book is strictly goal-oriented, focusing on the solution of fundamental problems in the geosciences, such as positioning and point cloud problems. As such, at no point does it discuss purely theoretical mathematics. "The book delivers hybrid symbolic-numeric solutions, which are a large and growing area at the boundary of mathematics and computer science." Dr. Daniel Li chtbau.

Mathematics --- Geodesy. Cartography --- Meteorology. Climatology --- Geology. Earth sciences --- General ecology and biosociology --- Environmental protection. Environmental technology --- Geography --- geodesie --- atmosfeerchemie --- atmosfeerfysica --- GIS (geografisch informatiesysteem) --- metrologie --- milieukunde --- cloud computing --- wiskunde --- geologie --- milieutechnologie --- atmosfeer

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This second edition of Mathematical Geosciences book adds five new topics: Solution equations with uncertainty, which proposes two novel methods for solving nonlinear geodetic equations as stochastic variables when the parameters of these equations have uncertainty characterized by probability distribution. The first method, an algebraic technique, partly employs symbolic computations and is applicable to polynomial systems having different uncertainty distributions of the parameters. The second method, a numerical technique, uses stochastic differential equation in Ito form; Nature Inspired Global Optimization where Meta-heuristic algorithms are based on natural phenomenon such as Particle Swarm Optimization. This approach simulates, e.g., schools of fish or flocks of birds, and is extended through discussion of geodetic applications. Black Hole Algorithm, which is based on the black hole phenomena is added and a new variant of the algorithm code is introduced and illustrated based on examples; The application of the Gröbner Basis to integer programming based on numeric symbolic computation is introduced and illustrated by solving some standard problems; An extension of the applications of integer programming solving phase ambiguity in Global Navigation Satellite Systems (GNSSs) is considered as a global quadratic mixed integer programming task, which can be transformed into a pure integer problem with a given digit of accuracy. Three alternative algorithms are suggested, two of which are based on local and global linearization via McCormic Envelopes; and Machine learning techniques (MLT) that offer effective tools for stochastic process modelling. The Stochastic Modelling section is extended by the stochastic modelling via MLT and their effectiveness is compared with that of the modelling via stochastic differential equations (SDE). Mixing MLT with SDE also known as frequently Neural Differential Equations is also introduced and illustrated by an image classification via a regression problem.

Mathematics --- Solar system --- Mathematical physics --- Geophysics --- Geology. Earth sciences --- Physical geography --- wiskunde --- geografie --- geologie --- fysica --- fysische geografie --- aarde (astronomie) --- geofysica