Iterated differential forms IV: The ℰ-spectral sequence

@article{Vinogradov2006IteratedDF,
  title={Iterated differential forms IV: The ℰ-spectral sequence},
  author={Alexandre M. Vinogradov and Luca Vitagliano},
  journal={Doklady Mathematics},
  year={2006},
  volume={75},
  pages={403-406}
}
For the multiple differential algebra of iterated differential forms [1, 2, 3, 4] on a diffiety ( 

References

SHOWING 1-10 OF 12 REFERENCES

Iterated differential forms: Riemannian geometry revisited

A natural extension of Riemannian geometry to a much wider context is presented on the basis of the iterated differential form formalism developed in math.DG/0605113 and an application to general

Iterated differential forms: Tensors

We interpret tensors on a smooth manifold M as differential forms over a graded commutative algebra called the algebra of iterated differential forms over M. This allows us to put standard tensor

Cohomological Analysis of Partial Differential Equations and Secondary Calculus

From symmetries of partial differential equations to Secondary Calculus Elements of differential calculus in commutative algebras Geometry of finite-order contact structures and the classical theory

Symmetries and conservation laws for differential equations of mathematical physics

Ordinary differential equations First-order equations The theory of classical symmetries Higher symmetries Conservation laws Nonlocal symmetries From symmetries of partial differential equations

Dokl

  • Math. 73, n 2
  • 2006

in M

  • Henneaux, I. Krasil’shchik, and A. Vinogradov (Eds.), Secondary Calculus and Cohomological Physics, Contemporary Mathematics 219, AMS
  • 1998

See also The Diffiety Inst

  • Secondary Calculus and Cohomological Physics
  • 1998

Soviet Math

  • Dokl. 19
  • 1978

) 182, see also The Diffiety Inst

  • Dokl. Math
  • 2006