Matches in Harvard for { <http://id.lib.harvard.edu/aleph/008758442/catalog> ?p ?o. }
Showing items 1 to 23 of
23
with 100 items per page.
- catalog contributor b12274317.
- catalog created "c2001.".
- catalog date "2001".
- catalog date "c2001.".
- catalog dateCopyrighted "c2001.".
- catalog description "From Symmetries of Partial Differential Equations to Secondary Calculus -- What are symmetries of partial differential equations, and what are partial differential equations themselves? -- Jets -- Higher-order contact structures -- Differential equations are diffieties -- What are symmetries of partial differential equations? -- Infinitesimal symmetries of partial differential equations are secondary quantized vector fields -- Digression: on symmetries of partial differential equations -- Secondary ("quantized") functions -- Higher-order scalar secondary ("quantized") operators -- Secondary ("quantized") differential forms and C-spectral sequences -- How does the C-spectral sequence work? -- Elements of Differential Calculus in Commutative Algebras -- Adjoint operators -- Spencer complexes and the Green formula -- Quadratic Lagrangians and the Euler operator -- Conservation laws in the linear theory -- Automorphisms and the linear Noether theorem -- Geometry of Finite-Order Contact Structures and the Classical Theory of Symmetries of Partial Differential Equations -- Necessary facts from the geometry of jet spaces -- The structure of U-transformations -- Infinitesimal automorphisms of the Cartan distribution -- The structure of automorphisms of the Cartan distribution on the manifolds J[superscript k] (E, m), k [[infinity] -- Classical theory of symmetries of partial differential equations -- Geometry of Infinitely Prolonged Differential Equations and Higher Symmetries.".
- catalog description "Includes bibliographical references (p. 237-242) and index.".
- catalog extent "xv, 247 p. :".
- catalog identifier "082182922X (alk. paper)".
- catalog isPartOf "Translations of mathematical monographs, 0065-9282 ; v. 204".
- catalog issued "2001".
- catalog issued "c2001.".
- catalog language "eng rus".
- catalog language "eng".
- catalog publisher "Providence, R.I. : American Mathematical Society,".
- catalog subject "515/.353 21".
- catalog subject "Differential equations, Nonlinear.".
- catalog subject "Geometry, Differential.".
- catalog subject "Homology theory.".
- catalog subject "QA377 .V54 2001".
- catalog tableOfContents "From Symmetries of Partial Differential Equations to Secondary Calculus -- What are symmetries of partial differential equations, and what are partial differential equations themselves? -- Jets -- Higher-order contact structures -- Differential equations are diffieties -- What are symmetries of partial differential equations? -- Infinitesimal symmetries of partial differential equations are secondary quantized vector fields -- Digression: on symmetries of partial differential equations -- Secondary ("quantized") functions -- Higher-order scalar secondary ("quantized") operators -- Secondary ("quantized") differential forms and C-spectral sequences -- How does the C-spectral sequence work? -- Elements of Differential Calculus in Commutative Algebras -- Adjoint operators -- Spencer complexes and the Green formula -- Quadratic Lagrangians and the Euler operator -- Conservation laws in the linear theory -- Automorphisms and the linear Noether theorem -- Geometry of Finite-Order Contact Structures and the Classical Theory of Symmetries of Partial Differential Equations -- Necessary facts from the geometry of jet spaces -- The structure of U-transformations -- Infinitesimal automorphisms of the Cartan distribution -- The structure of automorphisms of the Cartan distribution on the manifolds J[superscript k] (E, m), k [[infinity] -- Classical theory of symmetries of partial differential equations -- Geometry of Infinitely Prolonged Differential Equations and Higher Symmetries.".
- catalog title "Cohomological analysis of partial differential equations and secondary calculus / A.M. Vinogradov.".
- catalog type "text".