03620nmm a2200337 u 4500001001200000003002700012005001700039007002400056008004100080020001800121100001700139245019000156250001700346260004700363300002700410505100200437653002201439653002601461653002601487653002801513653005501541700003001596700003201626710003401658041001901692989003801711490003001749856007201779082001101851520142001862EB000620347EBX0100000000000000047342900000000000000.0cr|||||||||||||||||||||140122 ||| eng a97814612515451 aArnold, V.I.00aSingularities of Differentiable MapshElektronische RessourcebVolume I: The Classification of Critical Points Caustics and Wave Frontscby V.I. Arnold, A.N. Varchenko, S.M. Gusein-Zade a1st ed. 1985 aBoston, MAbBirkhĂ¤user Bostonc1985, 1985 a396 pbonline resource0 aI. Basic concepts -- 1. The simplest examples -- 2. The classes ?I -- 3. The quadratic differential of a map -- 4. The local algebra of a map and the Weierstrass preparation theorem -- 5. The local multiplicity of a holomorphic map -- 6. Stability and infinitesimal stability -- 7. The proof of the stability theorem -- 8. Versai deformations -- 9. The classification of stable germs by genotype -- 10. Review of further results -- II. Critical points of smooth functions -- 11. A start to the classification of critical points -- 12. Quasihomogeneous and semiquasihomogeneous singularities -- 13. The classification of quasihomogeneous functions -- 14. Spectral sequences for the reduction to normal forms -- 15. Lists of singularities -- 16. The determinator of singularities -- 17. Real, symmetric and boundary singularities -- III. Singularities of caustics and wave fronts -- 18. Lagrangian singularities -- 19. Generating families -- 20. Legendrian singularities -- 21. The classification of aComplex manifolds aDifferential Geometry aDifferential geometry aManifolds (Mathematics) aManifolds and Cell Complexes (incl. Diff.Topology)1 aVarchenko, A.N.e[author]1 aGusein-Zade, S.M.e[author]2 aSpringerLink (Online service)07aeng2ISO 639-2 bSBAaSpringer Book Archives -20040 aMonographs in Mathematics uhttps://doi.org/10.1007/978-1-4612-5154-5?nosfx=yxVerlag3Volltext0 a516.36 a... there is nothing so enthralling, so grandiose, nothing that stuns or captivates the human soul quite so much as a first course in a science. After the first five or six lectures one already holds the brightest hopes, already sees oneself as a seeker after truth. I too have wholeheartedly pursued science passionately, as one would a beloved woman. I was a slave, and sought no other sun in my life. Day and night I crammed myself, bending my back, ruining myself over my books; I wept when I beheld others exploiting science fot personal gain. But I was not long enthralled. The truth is every science has a beginning, but never an end - they go on for ever like periodic fractions. Zoology, for example, has discovered thirty-five thousand forms of life ... A. P. Chekhov. "On the road" In this book a start is made to the "zoology" of the singularities of differentiable maps. This theory is a young branch of analysis which currently occupies a central place in mathematics; it is the crossroads of paths leading from very abstract corners of mathematics (such as algebraic and differential geometry and topology, Lie groups and algebras, complex manifolds, commutative algebra and the like) to the most applied areas (such as differential equations and dynamical systems, optimal control, the theory of bifurcations and catastrophes, short-wave and saddle-point asymptotics and geometrical and wave optics)