02554nam 2200577 450 991079406780332120200818093311.01-4704-5650-8(CKB)4100000011040217(MiAaPQ)EBC6176743(RPAM)21598072(PPN)249674629(EXLCZ)99410000001104021720200818d2020 uy 0engurcnu||||||||txtrdacontentcrdamediacrrdacarrierGeometric optics for surface waves in nonlinear elasticity /Jean-François Coulombel, Mark WilliamsProvidence, Rhode Island :American Mathematical Society,[2020]©20201 online resource (164 pages)Memoirs of the American Mathematical Society ;number 12711-4704-4037-7 Includes bibliographical references.Derivation of the weakly nonlinear amplitude equation -- Existence of exact solutions -- Approximate solutions -- Error analysis and proof of Theorem 3.8 -- Some extensions.Memoirs of the American Mathematical Society ;number 1271.Partial differential equations -- Hyperbolic equations and systems [See also 58J45] -- Nonlinear second-order hyperbolic equationsmscOptics, electromagnetic theory {For quantum optics, see 81V80} -- General -- Geometric opticsmscMechanics of deformable solids -- Elastic materials -- Nonlinear elasticitymscGeometrical opticsMathematicsNonlinear difference equationsElasticityPartial differential equations -- Hyperbolic equations and systems [See also 58J45] -- Nonlinear second-order hyperbolic equations.Optics, electromagnetic theory {For quantum optics, see 81V80} -- General -- Geometric optics.Mechanics of deformable solids -- Elastic materials -- Nonlinear elasticity.Geometrical opticsMathematics.Nonlinear difference equations.Elasticity.530.4/1635L7074B2078A05mscCoulombel Jean-François1473739Williams Mark(Professor of mathematics),MiAaPQMiAaPQMiAaPQBOOK9910794067803321Geometric optics for surface waves in nonlinear elasticity3687048UNINA