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Power geometry in algebraic...

Power geometry in algebraic and differential equations

Briuno, Aleksandr Dmitrievich

Elsevier 2000

The geometry of power exponents includes the Newton polyhedron, normal cones of its faces, power and logarithmic transformations. On the basis of the geometry universal algorithms for simplifications of systems of nonlinear equations (algebraic, ordinary differential and partial differential) were developed. The algorithms form a new calculus which allows to make local and asymptotical analysis of solutions to those systems. The efficiency of the calculus is demonstrated with regard to several complicated problems from Robotics, Celestial Mechanics, Hydrodynamics and Thermodynamics. The calculus also gives classical results obtained earlier intuitively and is an alternative to Algebraic Geometry, Differential Algebra, Lie group Analysis and Nonstandard Analysis

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monografia Rebiun19905836 https://catalogo.rebiun.org/rebiun/record/Rebiun19905836 c| 070802s2000 ne a sb 001 0 eng d 9780444502971 0444502971 9780080539331 0080539335 CUNEF 991000509250308131 UPVA 997185726603706 UCAR 991008503563704213 CBUC 991010913841306709 OPELS OPELS CBUA eng Briuno, Aleksandr Dmitrievich Stepennaia geometriia v algebraicheskikh i differentsialnykh uravneniiakh. English Power geometry in algebraic and differential equations Recurso electrónico] Alexander D. Bruno 1st ed Amsterdam New York Elsevier 2000 Amsterdam New York Amsterdam New York Elsevier ix, 385 p. ill. 23 cm ix, 385 p. North-Holland mathematical library v. 57 Includes bibliographical references (pages 359-381) and index Preface. Introduction. The linear inequalitites. Singularities of algebraic equations. Hamiltonian truncations. Local analysis of an ODE system. Systems of arbitrary equations. Self-similar solutions. On complexity of problems of Power Geometry. Bibliography. Subject index Acceso restringido a los miembros de la UAL The geometry of power exponents includes the Newton polyhedron, normal cones of its faces, power and logarithmic transformations. On the basis of the geometry universal algorithms for simplifications of systems of nonlinear equations (algebraic, ordinary differential and partial differential) were developed. The algorithms form a new calculus which allows to make local and asymptotical analysis of solutions to those systems. The efficiency of the calculus is demonstrated with regard to several complicated problems from Robotics, Celestial Mechanics, Hydrodynamics and Thermodynamics. The calculus also gives classical results obtained earlier intuitively and is an alternative to Algebraic Geometry, Differential Algebra, Lie group Analysis and Nonstandard Analysis Geometry, Plane Differential-algebraic equations ScienceDirect e-books (Servicio en línea)

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monografia Rebiun19905836 https://catalogo.rebiun.org/rebiun/record/Rebiun19905836 c| 070802s2000 ne a sb 001 0 eng d 9780444502971 0444502971 9780080539331 0080539335 CUNEF 991000509250308131 UPVA 997185726603706 UCAR 991008503563704213 CBUC 991010913841306709 OPELS OPELS CBUA eng Briuno, Aleksandr Dmitrievich Stepennaia geometriia v algebraicheskikh i differentsialnykh uravneniiakh. English Power geometry in algebraic and differential equations Recurso electrónico] Alexander D. Bruno 1st ed Amsterdam New York Elsevier 2000 Amsterdam New York Amsterdam New York Elsevier ix, 385 p. ill. 23 cm ix, 385 p. North-Holland mathematical library v. 57 Includes bibliographical references (pages 359-381) and index Preface. Introduction. The linear inequalitites. Singularities of algebraic equations. Hamiltonian truncations. Local analysis of an ODE system. Systems of arbitrary equations. Self-similar solutions. On complexity of problems of Power Geometry. Bibliography. Subject index Acceso restringido a los miembros de la UAL The geometry of power exponents includes the Newton polyhedron, normal cones of its faces, power and logarithmic transformations. On the basis of the geometry universal algorithms for simplifications of systems of nonlinear equations (algebraic, ordinary differential and partial differential) were developed. The algorithms form a new calculus which allows to make local and asymptotical analysis of solutions to those systems. The efficiency of the calculus is demonstrated with regard to several complicated problems from Robotics, Celestial Mechanics, Hydrodynamics and Thermodynamics. The calculus also gives classical results obtained earlier intuitively and is an alternative to Algebraic Geometry, Differential Algebra, Lie group Analysis and Nonstandard Analysis Geometry, Plane Differential-algebraic equations ScienceDirect e-books (Servicio en línea)