Access the full text.
Sign up today, get DeepDyve free for 14 days.
A. Vinogradov (1994)
From symmetries of partial differential equations towards secondary (“quantized”) calculusJournal of Geometry and Physics, 14
A. Vinogradov (1981)
Geometry of nonlinear differential equationsJournal of Soviet Mathematics, 17
A. Verbovetsky (1998)
Secondary Calculus and Cohomological Physics
M. Henneaux, C. Teitelboim (1992)
Quantization of Gauge Systems
A. Vinogradov (1984)
The b-spectral sequence, Lagrangian formalism, and conservation laws. II. The nonlinear theoryJournal of Mathematical Analysis and Applications, 100
I. M. Anderson (1992)
Mathematical Aspects of Classical Field Theory
A. Verbovetsky (1998)
Notes on the horizontal cohomologyarXiv: Differential Geometry
M. Marvan (1990)
Differential Geometry and Its Applications, Proc. Conf., 27 Aug.–2 Sept. 1989, Brno, Czechoslovakia
N. G. Khorkova (1993)
On the $${\mathcal{C}}$$ -spectral sequence of differential equationsDifferential Geom. Appl., 3
T. Tsujishita (1991)
Homological method of computing invariants of systems of differential equationsDifferential Geometry and Its Applications, 1
A. M. Vinogradov (1980)
Geometry of nonlinear differential equationsItogi nauki i tekniki, Problemy geometrii, 11
R. Bryant, P. Griffiths (1995)
Characteristic cohomology of differential systems. I. General theoryJournal of the American Mathematical Society, 8
D. Gessler (1997)
On the Vinogradov $${\mathcal{C}}$$ -spectral sequence for determined systems of differential equationsDifferential Geom. Appl., 7
G. Barnich, Friedemann Brandt, M. Henneaux (1994)
Local BRST cohomology in the antifield formalism: I. General theoremsCommunications in Mathematical Physics, 174
D. Gessler (1997)
On the Vinogradov -spectral sequence for determined systems of differential equationsDifferential Geometry and Its Applications, 7
N. Khorkova (1993)
On the C-spectral sequence of differential equationsDifferential Geometry and Its Applications, 3
A. Vinogradov (1989)
Symmetries of partial differential equations : conservation laws, applications, algorithms
I. S. Krasil'shchik, V. V. Lychagin, A. M. Vinogradov (1986)
Geometry of Jet Spaces and Nonlinear Differential Equations
A. M. Vinogradov (1978)
A spectral sequence associated with a nonlinear differential equation, and algebro-geometric foundations of Lagrangian field theory with constraintsSoviet Math. Dokl., 19
I. Anderson (1992)
Introduction to the Variational Bicomplex, 132
The Vinogradov C-spectral sequence for the Yang–Mills equations is considered and the ‘three-line’ theorem for the term E1 of the C-spectral sequence is proved: E1 p,q = 0 if p > 0 and q < n − 2, where n is the dimension of spacetime.
Acta Applicandae Mathematicae – Springer Journals
Published: Oct 16, 2004
Read and print from thousands of top scholarly journals.
Already have an account? Log in
Bookmark this article. You can see your Bookmarks on your DeepDyve Library.
To save an article, log in first, or sign up for a DeepDyve account if you don’t already have one.
Copy and paste the desired citation format or use the link below to download a file formatted for EndNote
Access the full text.
Sign up today, get DeepDyve free for 14 days.
All DeepDyve websites use cookies to improve your online experience. They were placed on your computer when you launched this website. You can change your cookie settings through your browser.