The Previous Years Diffiety Institute Seminar

Last updated May 21, 2008

THE DIFFIETY SEMINAR
The Previous Years

YEARS:	2008	2007	2006	2005	2004	2003	2002	2001	2000	1999	1998	1997	1996
Winter-Spring:
Autumn:

Winter-Spring 2008

May 14, 2008: A. Verbovetsky (Moscow) Marvan's approach to the spectral parameter problem.
May 7, 2008: R. Vitolo (Lecce, Italy) On differential equations characterized by their Lie point symmetries.
Abstract: We study the geometry of differential equations determined uniquely by their point symmetries. The action of the infinitesimal group of point symmetries foliates the jet space where the equation live. Equations which are uniquely determined by their point symmetries are of two types: they either coincide with a leaf of the part of the jet space where the action is regular or they coincide with the singular subset of the action. Many examples are provided, ranging from minimal submanifolds and geodesics to Monge-Ampere equations and some of their generalizations.
April 16, 2008: Yu. N. Bratkov (Moscow) The hyperbolic Monge-Ampère equation: classical solutions on the whole plane.
April 9, 2008: M. F. Prokhorova (Ekaterinburg) Graphene and the Atiyah–Singer index theorem.
April 2, 2008: Paul Kersten (University of Twente, The Netherlands) The Monge-Ampere equation: Hamiltonian and symplectic structures, recursions.
Abstract: After a short introduction/description of equation structure and l- and l*-covering, we describe as a quite complicated application: Monge-Ampere equation. Results for Hamiltonian, symplectic and recursion structures are obtained in a "standard" and "straight-forward" way, demonstrating the intrinsic power of the geometrical picture.
March 26, 2008: A. Verbovetsky (Moscow) What is the cotangent bundle to a differential equation? VI.
March 12, 2008: V. A. Yumaguzhin (Pereslavl) On the obstruction to integrability of an almost complex structure.
March 5, 2008: V. N. Chetverikov (Moscow) An estimate for the order of inverse differential operator in one independent variable.
February 27, 2008: Ilja Miklaszewski (Moscow) Formal solvability of overdetermined systems of differential equations. II.
February 20, 2008: Ilja Miklaszewski (Moscow) Formal solvability of overdetermined systems of differential equations. I.
February 13, 2008: O. I. Morozov (Moscow) Symmetry pseudo-groups and coverings of differential equations.
Abstract: My talk will be devoted to recent results about relations between Maurer-Cartan forms of symmetry pseudo-groups and coverings of differential equations. Examples will include the r-dmKP equation and Plebanski's second heavenly equation.
February 6, 2008: R. Vitolo (Lecce, Italy) Gauge invariance, charge conservation, and variational principles.
Abstract: In this talk I will present new results on the correspondence between symmetries, conservation laws, and variational principles for field equations in general non-abelian gauge theories, obtained jointly with Gianni Manno and Juha Pohjanpelto. Our main result states that second order field equations possessing translational and gauge symmetries and the corresponding conservation laws are always derivable from a variational principle. Counterexamples show that the above result fails in general for third order field equations.

Autumn 2007

December 19, 2007: A. Kiselev (Moscow) Operator-valued involutive distributions of evolutionary vector fields and their affine geometry.
November 21, 2007: R. A. Sarkisyan (Moscow) Local classification problems in analysis according to Arnold. II.
November 14, 2007: I. Men'shov (Moscow) Some questions of hydrodynamic stability of vortical structures.
November 7, 2007: R. A. Sarkisyan (Moscow) Local classification problems in analysis according to Arnold. I.
Abstract: For any pseudogroup D acting on any manifold P there is a natural way to define the jet spaces J^k and J^∞ and to prolong the action of D on J^k and J^∞. The Poincare series for every point of J^∞ may be defined too. For each "local classification problem of analysis" naturally arise the corresponding pseudogroup D acting on corresponding manifold P and we consider the prolong the action on J^k and J^∞. V. I. Arnold proposed the following question: Is it true that the Poincare series are a rational function of t for almost any f (any f that does not belong to some set Z of co-dimension infinity in the space J^∞)?
Followig theorem guaranties only that codim Z is more or equal to 1.
Theorem. There is a dense set V (maximal stratum) in the corresponding infinite jet space J^∞ which is a disjoint union of finite number of open sets V₁,...,V_S (atoms) such that any two points belonging to the same atom have the same Poincare series and these series are rational.
This allows one to prove the Tresse theorem for each point of V.
Among other results we emphasize the following ones:
- In principle one can explicitly derive conditions defining each atom from Lie pseudogroup equations (using finite number of differentiations and algebraic operations).
- In principle for each atom the corresponding Poincare series can be computed explicitly.
- In principle basic invariants and invariant differentiations for each point of the maximal stratum can be computed explicitly (using differentiations, algebraic operations and solution of systems of algebraic equations via implicit function theorem).
We shall discuss also some relating questions concerning pseudogroups.
October 10, 2007: D. Tunitsky (Moscow) Differential geometric structures associated with Monge-Ampère equations.
October 3, 2007: I. Krasil'shchik, V. Golovko (Moscow) Parallel computations for the Camassa–Holm equation.
September 26, 2007: E. Beniaminov (Moscow) Quantization as approximate description of a diffusion process.
September 19, 2007: Sergey Igonin (Utrecht, The Netherlands) Coverings and the fundamental group in the category of differential equations V.
September 12, 2007: A. Verbovetsky (Moscow) What is the cotangent bundle to a differential equation? V.

Winter-Spring 2007

June 13, 2007: Sergey Igonin (Utrecht, The Netherlands) Coverings and the fundamental group in the category of differential equations IV.
March 7, 2007: I. S. Krasil'shchik (Moscow) On the structures related to a 3rd-order Monge-Ampere equation.
Abstract: Symmetries, conservation laws, Hamiltonian and symplectic structures for a 3rd-order Monge-Ampere equation are described.
March 21, 2007: V. Poberezhny (Moscow) Isomonodromic deformations.
March 14, 2007: A. Verbovetsky (Moscow) On relation of the Vinogradov spectral sequence to vertex algebras, after the paper "Lagrangian approach to sheaves of vertex algebras" by F. Malikov.
March 7, 2007: I. S. Krasil'shchik (Moscow) The the work Differential-geometric invariants of the Hamiltonian systems of pde's by O. Bogoyavlenskij [Commun. Math. Phys. 265 (2006), 805-817].
February 21, 2007: A. Verbovetsky (Moscow) Kruglikov-Lychagin multi-brackets(after paper arXiv:math.DG/0610930).
February 14, 2007: V. Tolstoy (Moscow) Extremal projectors for algebras and superalgebras Lie.
February 7, 2007: I. S. Krasil'shchik (Moscow) On some nonlinear differential equations.
Abstract: Computational problems related to particular nonlinear differential equations will be exposed and discussed.
January 10, 2007: Sergey Igonin (Bonn, Germany) Coverings and the fundamental group in the category of differential equations III.

Autumn 2006

November 15, 2006: A. Verbovetsky (Moscow) The Marvan theorem on sufficient set of integrability conditions of an orthonomic system.
November 8, 2006: Discussion of I. S. Krasil'shchik's talk "How to commute nonlocal shadows?" of September 27.
November 1, 2006: V. Golovko (Moscow) Poisson-Nijenhuis structures for nonlocal operators.
October 25, 2006: Gerard Helminck (University of Twente, the Netherlands) A flag variety relating matrix hierarchies and Toda-type hierarchies.
Abstract: Commutative subalgebras of the complex k × k-matrices are known to generate both matrix and Toda-type hierarchies. In this talk a certain class of infinite chains of closed subspaces of a separable Hilbert space H will be introduced. To each such a flag one associates a sequence of solutions of the matrix hierarchy related to this subalgebra. They compose to a solution of the lower triangular Toda hierarchy corresponding to the transposed algebra. Both solutions can be expressed in determinants of suitable Fredholm operators, the so-called τ-functions. These last functions also have a geometric interpretation in terms of line bundles over the flagvariety. They measure the failure of equivariance w.r.t. to the commuting flows of certain global sections.
October 18, 2006: R. A. Sarkisyan (Moscow) On the regularity theorem and the Tresse theorem for Lie pseudogroups. II.
October 11, 2006: R. A. Sarkisyan (Moscow) On the regularity theorem and the Tresse theorem for Lie pseudogroups. I.
October 4, 2006: M. Pavlov (Moscow) WDVV equation and its solutions.
Abstract: We consider WDVV equation derived by Marshakov, Mironov, Morozov. We found new set of solutions using some symmetry approaches.
September 27, 2006: I. Krasil'shchik (Moscow) How to commute nonlocal shadows?
Abstract: The problem of a well-defined commutator for shadows of nonlocal symmetries is discussed.
September 20, 2006: O. I. Morozov (Moscow) Coverings of differential equations and Cartan's structure theory of Lie pseudo-groups. II.
September 13, 2006: O. I. Morozov (Moscow) Coverings of differential equations and Cartan's structure theory of Lie pseudo-groups. I.
Abstract: We establish relations between Maurer-Cartan forms of symmetry pseudo-groups and coverings of differential equations. Examples include Liouville's equation, the Khokhlov-Zabolotskaya equation, and the Boyer-Finley equation.

Winter-Spring 2006

June 21, 2006: Sergey Igonin (Bonn, Germany) Coverings and the fundamental group in the category of differential equations II.
Abstract: In the category of PDEs there is a notion of coverings, which generalize Bæcklund transformations and Lax pairs from soliton theory. As is well known, in topology the fundamental group is responsible for coverings. In this talk we continue to describe an analog of fundamental group for coverings in the category of PDEs. This analog is not a group, but a system of (often infinite-dimensional) Lie algebras.
May 15, 2006: M. Pavlov (Moscow) WDVV and hydrodynamic reductions of 2+1 quasilinear equations.
Abstract: We consider hydrodynamic reductions of the dispersionless limit of dKP equation (as example) for construction of new solutions for WDVV equation.
May 10, 2006 (Wednesday): M. Pavlov (Moscow) Integrability and classification of hydrodynamic chains and corresponding 2+1 quasilinear systems.
Abstract: Several approaches allowing classification of hydrodynamic chains are presented. Infinitely many particular solutions are found.
April 24, 2006: V. Golovko (Moscow) Jacobi bracket on shadows of symmetries and nonlocal Hamiltonian operators.
April 17, 2006: A. Verbovetsky (Moscow) What is the cotangent bundle to a differential equation? III.
March 27, 2006: I. R. Miklaszewski (Moscow) Basics of topos theory III.
March 20, 2006: P. M. Akhmet'ev (Moscow) On high-order analogs of magnetic helicity integral II.
March 13, 2006: Marina Prokhorova (Institute of Mathematics and Mechanics, Ural Branch of RAS) Structure of the category of parabolic equations.
Abstract: The symmetry group is one of the most important notions in the group analysis of differential equations. We generalize this notion, introducing a certain category, whose objects are systems of PDE and their automorphism groups are the corresponding symmetry groups: our contribution is a proposed notion of a morphism between the systems. We are mostly interested in a subcategory that arises from second order parabolic equations on arbitrary manifolds; an example that deals with nonlinear reaction-diffusion equation is discussed in detail.
March 6, 2006: Sergey Igonin (Bonn, Germany) Coverings and the fundamental group in the category of differential equations.
Abstract: In the category of PDEs there is a notion of coverings, which generalize Bæcklund transformations and Lax pairs from soliton theory. As is well known, in topology the fundamental group is responsible for coverings. In this talk we describe an analog of fundamental group for coverings in the category of PDEs. This analog is not a group, but a system of (often infinite-dimensional) Lie algebras.
February 27, 2006: P. M. Akhmet'ev (Moscow) On high-order analogs of magnetic helicity integral I.
February 20, 2006: I. R. Miklaszewski (Moscow) Basics of topos theory II.
February 13, 2006: I. R. Miklaszewski (Moscow) Basics of topos theory I.
February 6, 2006: V. N. Chetverikov (Moscow) Flat partial differential equations with control on the boundary.

Autumn 2005

December 19, 2005: A. M. Lukatsky (Moscow) Structural geometrical properties of infinite-dimensional Lie groups as applied to equations of mathematical physics.
December 12, 2005: A. Verbovetsky (Moscow) What is the cotangent bundle to a differential equation? II.
December 5, 2005: A. Verbovetsky (Moscow) What is the cotangent bundle to a differential equation? I.
November 28, 2005: I. M. Paramonova (Moscow) Deformations of Poisson and Buttin Lie superalgebras.
November 21, 2005: I. R. Miklaszewski (Moscow) Translation of geometry of differential equations into the language of algebra III.
November 14, 2005: I. R. Miklaszewski (Moscow) Translation of geometry of differential equations into the language of algebra II.
November 7, 2005: I. R. Miklaszewski (Moscow) Translation of geometry of differential equations into the language of algebra I.
October 31, 2005: R. A. Sarkisyan (Moscow) On the Tresse theorem for geometric structures V.
October 24, 2005: R. A. Sarkisyan (Moscow) On the Tresse theorem for geometric structures IV.
October 17, 2005: R. A. Sarkisyan (Moscow) On the Tresse theorem for geometric structures III.
October 10, 2005: R. A. Sarkisyan (Moscow) On the Tresse theorem for geometric structures II.
October 3, 2005: R. A. Sarkisyan (Moscow) On the Tresse theorem for geometric structures I.
September 26, 2005: V. Poberezhnii (Moscow) Fuchsian systems: Riemann-Hilbert problem, isomonodromic deformations, Painlevé equations.
September 19, 2005: A. Verbovetsky (Moscow) Involutive systems of differential equations of different orders (after a paper by B. Kruglikov and V. Lychagin) - arXiv:math.DG/0503124.
September 12, 2005: J. Krasil'shchik (Moscow) On the dispersionless Boussinesq equation.
Abstract: The dispersionless Boussinesq equation, which is equivalent to the Benney-Lax equation, being a system of equations of hydrodynamical type, is discussed. The results include: a description of local and nonlocal Hamiltonian and symplectic structures, hierarchies of symmetries, hierarchies of conservation laws, recursion operators for symmetries and generating functions of conservation laws (cosymmetries). Highly interesting are the appearances of operators that map conservation laws and symmetries to each other but are neither Hamiltonian nor symplectic. These operators give rise to a noncommutative infinite-dimensional algebra of recursion operators.

Winter-Spring 2005

May 16, 2005: V. A. Yumaguzhin (Pereslavl) Differential invariants of generic classical hyperbolic Monge-Ampère equations.
May 12, 2005: A. Kushner (Astrakhan) Contact geometry of hyperbolic Monge-Ampère equations.
May 5, 2005: V. N. Chetverikov (Moscow) Flat control systems with time delay.
Abstract: The concept of flat system is extended to delay systems. We show how the flatness of a delay system may be used to track given reference trajectories with stability. Besides, for every autonomous control system with time delay we construct a control system without delay. The flatness of the first system implies the flatness of the second one. This fact gives a necessary condition for the flatness of delay systems.
April 25, 2005: V. N. Chetverikov (Moscow) A linearization method for problems of flatness and searching compatibility operator II.
April 18, 2005: V. N. Chetverikov (Moscow) A linearization method for problems of flatness and searching compatibility operator. I.
Abstract: We solve the total parametrization problem for systems of partial differential equations and the dual problem of the search of compatibility operators. Our approach consists of the following two steps. First the corresponding linear problem is solved. Then the linearization of a nonlinear solution is selected among linear solutions. Necessary and sufficient conditions for the selection are implied by the exactness of a nonlinear Spencer complex for the pseudogroup of invertible C-differential operators. The result about the exactness is formulated. Other applications of the obtained results are discussed.
April 11, 2005: V. Golovko (Moscow) Darboux coverings and their applications to KP hierarchy.
April 4, 2005: A. Kushner (Astrakhan) E-structures of Monge-Ampère equations of variable type.
March 28, 2005: A. Kushner (Astrakhan) Contact and symplectic invariants of Monge-Ampère equations and Jacobi systems.
March 21, 2005: V. L. Chernyshev (Moscow) Differential equations on geometric graphs. Asymptotic and spectral properties.
March 14, 2005: A. V. Penskoi (Moscow) Discrete Lagrangian systems.
March 9, 2005: Enrique G. Reyes (Santiago, Chile) Integrability, differential geometry and nonlocal symmetries.
February 28, 2005: V. Golovko (Moscow) Deformation of Poisson manifolds of hydrodynamics type.
February 21, 2005: A. Verbovetsky (Moscow) Integrable Systems, bihamiltonian approach (part 6).
February 14, 2005: J. Krasil'shchik (Moscow) Symmetries, recursion operators, and Hamiltonian structures of integrable systems.
Abstract: An extensive review of Artur Sergyeyev's recent works will be given.
References:
[1] On recursion operators and nonlocal symmetries of evolution equations, Proc. Sem. Diff. Geom. (Opava, 2000), D. Krupka ed., p.159-173, http://arxiv.org/nlin.SI/0012011
[2] A remark on nonlocal symmetries for the Calogero-Degasperis-Ibragimov-Shabat equation, J. Nonlinear Math. Phys., 10 (2003) 78-85, http://arxiv.org/nlin.SI/0309023 (with J.A.Sanders)
[3] On sufficient conditions of locality for hierarchies of symmetries of evolution systems, Rep. Math. Phys. 50 (2002) 307-314, http://www-sfb288.math.tu-berlin.de/abstractNew/531
[4] Why nonlocal recursion operators produce local symmetries: new results and applications, http://arxiv.org/nlin.SI/0410049
[5] A simple way of making a Hamiltonian system into a bi-Hamiltonian one, Acta Appl. Math., 83 (2004) 183-197, http://arxiv.org/nlin.SI/0310012

Autumn 2004

December 27, 2004: H. M. Khudaverdian (UMIST, Manchester, UK) Berezinians, Exterior Powers, and Recurrent Sequences.
December 20, 2004: A. Verbovetsky (Moscow) Integrable systems, bihamiltonian approach (part 5).
December 13, 2004: O. I. Morozov (Moscow) Lie pseudo-groups, Cartan's equivalence method, and symmetries of differential equations (part 3).
December 6, 2004: O. I. Morozov (Moscow) Lie pseudo-groups, Cartan's equivalence method, and symmetries of differential equations (part 2).
November 29, 2004: O. I. Morozov (Moscow) Lie pseudo-groups, Cartan's equivalence method, and symmetries of differential equations (part 1).
Abstract:
A method of computing Maurer-Cartan forms for symmetry pseudo-groups of differential equations will be described. Examples of applications will include the contact equivalence of the generalized Hunter-Saxton equation and the Euler-Poisson equation, and finding basic differential invariants for the classes of linear hyperbolic equations and the Abel equations.
November 1, 2004: A. Verbovetsky (Moscow) Integrable Systems, bihamiltonian approach (part 4).
October 25, 2004: A. Verbovetsky (Moscow) Integrable Systems, bihamiltonian approach (part 3).
October 18, 2004: A. Verbovetsky (Moscow) Integrable Systems, bihamiltonian approach (part 2).
October 11, 2004: A. Verbovetsky (Moscow) Integrable Systems, bihamiltonian approach (part 1).

Winter-Spring 2004

May 12, 2004: V. Golovko (Moscow) On computation of Poisson cohomology for Hamiltonian operators on jets.
April 28, 2004: R. A. Sarkisyan (Moscow) On differential invariants of geometric structures.
Abstract:
       All objects (functions, manifolds, etc.) and mappings are assumed to be real and smooth. "Bundle" means locally trivial fiber bundle.
       The following theorem is proved in the first part of the talk:
       Theorem 1. Let fiber dimension of the bundle P --> X of geometric structures be greater that dimension of base X. As the differential invariant's order q (i.e., the greatest common degree of derivatives in differential invariant expression) grows, the number t(q) of general (i.e., defined for geometric structures in general position) functionally independent scalar differential invariants of order q grows to infinity at any general position point of P. An asymptotic lower bound for t(q) is also given.
       Note that for some geometric structures, including Riemann metrics, the explicit values of t(q) for geometric structures in general position was found in [1].
       A generalization of Theorem 1 exists, in particular for the case of tensor invariants.
       The second part of the talk will deal with special bundles of geometric structures, i.e., such bundles whose fiber dimension is no greater that dimension of base.
       It will be shown that in the neighborhood of general position point any special bundle is locally isomorphic to one of 19 standard special bundles P₁,..., P₁₉.
       The Darboux theorem states that differential 1-form in general position on X can be locally transformed to canonical form with suitable change of coordinates. Analogously, nonzero vector field on X can be straightened. Similar statement is proved for typical special geometric structures, i.e., for sections in general position of any standard special geometric structure bundle. Each typical special geometric structure can be transformed to its own canonical form with suitable change of coordinates. These canonical forms are found and they are used to formulate the following theorem:
       Theorem 2. Let z be the general position point of some special geometric structure bundle. Only a finite number of general independent differential invariants exit at the point z and full collection of such functionally independent invariants is written down for each of 19 types. Any general differential invariant of special bundle at point z is a function of invariants from such collection.
       Therefore, Theorems 1 and 2 establish a fundamental difference of differential invariants for special and non-special bundles.
       These results apply towards Tresse theorem.
1. T.Y. Thomas The differential invariants of generalized spaces, Cambridge Univ. Press, 1934; 2nd (textually unaltered) ed. Chelsea, New York, 1991.

Autumn 2003

October 29, 2003: A. Verbovetsky (Moscow) The C.Martínez Ontalba--J.Muñoz Masqué--À.Valdés theorem on the structure of the moduli of jets of some G-structures.
October 15, 2003: I. Krasil'shchik (Moscow) On Ghost symmetries by P.J.Olver, J.A.Sanders & J.P.Wang and Nonlocal Symmetries and Ghosts by P.J.Olver.
October 8, 2003: A. Kiselev (Moscow) On integrable hierarchies associated with continuous limit of one-dimensional Toda lattice.
October 1, 2003: A. Verbovetsky (Moscow) On the integrability of operators invariant with respect to nonsingular evolution equations.
September 9, 2003: J. Krasil'shchik (Moscow) Three applications of the long exact sequence of a covering.
Abstract: For any covering over a differential equation, we construct the long exact sequence of C-cohomologies and use this sequence to:
1. Give a short and coordinate-free proof of the reconstruction theorem for shadows of nonlocal symmetries.
2. Show that action of recursion operators on symmetries leads to shadows.
3. Describe smooth families of pair-wise inequivalent coverings.

Winter-Spring 2003

June 4, 2003: V. N. Chetverikov (Moscow) Nonlinear Spencer complex for invertible differential operators and compatibility operators.
May 21, 2003: A. Verbovetsky (Moscow) On the Zharinov sequence.
April 23, 2003: A. Verbovetsky (Moscow) Some bits about involutiveness.
April 16, 2003: H. Khudaverdian (Manchester, UK) On geometry of differential operators and odd Laplacians.
Abstract: In this talk we discuss geometrical structures naturally associated with differential operators acting on functions on a manifold M. Every such operator defines a bracket on functions and an "upper connection" in the bundle of volume forms on M. It turns out that the natural framework here is the algebra of densities of all weights on the manifold M.
The results are applied to analysis and generalization of Batalin-Vilkovisky geometry. The talk is based on a joint work with T. Voronov (arXiv:math.DG/0301236 and arXiv:math.DG/0212311).
April 9, 2003: V. A. Yumaguzhin (Pereslavl) On the obstruction to linearizability of 2-order ODEs by point transformations.
Abstract: In this talk, we discuss the action of pseudogroup of all point transformations on the bundle F of equations y'' =u⁰(x,y) +u¹(x,y)y' +u²(x,y)(y')² +u³(x,y)(y')³. We calculate the 1-st nontrivial differential invariant of this action. It is a horizontal differential 2-form on the jet bundle J²F with values in some algebra. We prove that this form is a unique obstruction to linearizability of the considered equations by point transformations. Note that the construction of this invariant recall the well known construction of structure functions of prolongations of G--structures.
April 2, 2003: A. Verbovetsky (Moscow) Kupershmidt's dark equations.
March 19, 2003: Paul Kersten (University of Twente, Holland) All in one: conservation laws for classical KdV-equation.
March 12, 2003: I. S. Krasil'shchik (Moscow) A simple method to establish locality of integrable hierarchies.
Abstract: It is well known that integrable hierarchies are usually generated by recursion operators containing nonlocal terms of the D^-1 type. Thus, dealing with such hierarchies the problem to establish their locality arises. To see nontriviality of this problem it is sufficient to have a look at the beautiful but rather complicated proof for the KdV hierarchy given in the book by I. Dorfman (Dirac Structures and Integrability of Nonlinear Evolution Equations, John Wiley & Sons, 1993, p. 87).
We propose a simple scheme of proving locality for scaling invariant scalar equation based on graded structure of polynomial functions on such equations and Green's formula. For more details see here.
March 5, 2003: M. M. Vinogradov (Moscow) De Rham complex in the diole category (part II).
February 26, 2003: M. M. Vinogradov (Moscow) De Rham complex in the diole category (part I).
February 19, 2003: V. N. Chetverikov (Moscow) Nonlinear Spencer complex for the group of invertible differential operators and its applications (part II).
February 12, 2003: V. N. Chetverikov (Moscow) Nonlinear Spencer complex for the group of invertible differential operators and its applications (part I).

Autumn 2002

October 30, 2002: A. V. Kiselev (Moscow) On Toda equations associated to Lie algebras.
October 9, 2002: A. V. Kiselev (Moscow) On the Hamiltonian and Lagrangian structures of time-dependent reductions of evolutionary PDEs (arXiv:math.DG/0112255 by Monica Ugaglia).
September 18, 2002: A. Verbovetsky (Moscow) What is the cotangent bundle to a differential equation? The talk covers a joint work with P. Kersten and I.S.Krasil'shchik Hamiltonian operators and -coverings.
September 11, 2002: J. Krasil'shchik (Moscow) On symmetries and cohomological invariants of equations possessing flat representations.
September 4, 2002: S. Igonin (Yaroslavl, Twente) Coverings and the fundamental group in the category of differential equations.

Winter-Spring 2002

May 6, 2002: Joseph Krasil'shchik (Moscow) From recursion operators to Hamiltonian structures. The factorization method.
Abstract: A simple algorithmic method of constructing Hamiltonian structures for nonlinear PDE will be described. It is based on the geometrical theory of nonlinear differential equations and is in a sense inverse to the well-known Magri scheme. As an illustrative example, the KdV equation and the Boussinesq equation will be discussed. Further applications include the construction of previously unknown Hamiltonian structures.
April 24, 2002: A. Kiselev (Moscow) Bicomplexes and Bæcklund transformations, an overview of a paper by A. Dimakis and F. Muller-Hoissen (J. Phys. A 34 (2001), 9163-9194; arXiv:nlin.SI/0104071).
April 17, 2002: B. Kruglikov Mayer brackets and solvability of scalar PDEs.
April 3, 2002: V. N. Chetverikov (Moscow) Covering control systems by flat ones.
March 27, 2002: A. S. Dzhumadildaev (Alma-Ata, Kazakhstan) N-commutators of vector fields.
Abstract: The question whether the N-commutator $s_N(X_1,...,X_N) = \sum_{\sigma\in\Sym_N} sign\sigma X_{\sigma(1)} \cdots X_{\sigma(N)}$ is a well defined operation on Vect(n) is studied. It is if N=n²+2n-2. A theory of N-commutators with emphasis on 5- and 6-commutators on two-dimensional manifolds is developed.
March 20, 2002: M. Vinogradov (Moscow) Der-operators and frodules.
March 13, 2002: B. Kruglikov Are there pseudoholomorphic submanifolds of complex dimensions greater than one?
March 6, 2002: A. Verbovetsky (Moscow) Asymptotic conservation laws: survey of results (part II).
February 27, 2002: A. Verbovetsky (Moscow) Asymptotic conservation laws: survey of results (part I).
February 20, 2002: I. V. Tyutin (Lebedev Phys. Inst., Moscow) The general form of the *-deformations on the Grassman algebra.
February 13, 2002: A. Kiselev (Moscow) On a family of Bæcklund autotransformations for the Liouville equation, preprint DIPS 15/2001.
Autmn 2001
December 19: V. Trushkov (Moscow) Group foliation and non-invariant solutions of the heavenly equation, an overview of a paper by L. Martina, M. B. Sheftel, and P. Winternitz (J. Phys. A: Math. Gen. 34 (2001) 92439263, math-ph/0108004).
December 5, 2001: V. Chetverikov (Moscow) Secondary calculus framework for some control problems.
November 28, 2001: A. Kiselyov (Moscow) The variational bicomplex for hyperbolic second-order scalar partial differential equations in the plane, an overview of a paper by I. Anderson and N. Kamran, Duke J. Math. 87(1997), 265--319 (see full text here).
November 21, 2001: A. Verbovetsky (Moscow) On Voronov complexes, an overview of a paper On complexes related with calculus of variations by H. Khudaverdian, T. Voronov.
November 14, 2001: V. Chetverikov (Moscow) A survey of methods illustrated by the Benny equations, an overview of a paper by N. H. Ibragimov, V. V. Kovalev, and V. V. Pustovalov (math-ph/0109012).
October 31, 2001: R.F.Polischuk (Moscow) Nonlocal conservation laws in general relativity.
October 24, 2001: Alexander Verbovetsky (Moscow) Geometry of Voronov-Tyutin-Shakhverdiev operators.
October 10, 2001: Joseph Krasil'shchik (Moscow) On natural differential equations.
Abstract: Dealing with particular differential equation, one can invent them or take them from Nature. One of the sources of natural equations is geometry. For example, we can consider equations describing Poisson structures, flat connections in a certain bundle, integrable distributions, etc. Equations of this type possess a gauge group and thus are not "2-line ones".
For example, computing symmetries of the equation that describes flat connections, Paul Kersten (Univ. of Twente) discovered a family of symmetries depending on arbitrary functions on infinite prolongation of this equation. Later, Sergei Igonin constructed a complex whose 1-st differential delivers symmetries found by Kersten.
We plan to explain these result in a general context and discuss some problems arising in relation with natural equations.
October 3, 2001: S. Yu. Dobrokhotov (Moscow) On the effects of the integrability of Hugoniot-Maslov chains for vortex singular equations.

Winter-Spring 2001

April 25, 2001: A. Kiselyov (Moscow) Exactly integrable hyperbolic Liouville type equations.
April 18, 2001: I. S. Krasil'shchik (Moscow) On one-parametric families of Bæcklund transformations.
April 11, 2001: Raffaele Vitolo (Univ. of Lecce, Italy) Geometry of the phase space in general relativistic mechanics.
April 4, 2001: A. Verbovetsky (Moscow) The Koszul-Tate resolution vs. the compatibility complex. II.
March 28, 2001: A. Verbovetsky (Moscow) The Koszul-Tate resolution vs. the compatibility complex. I.
March 21, 2001: V. Trushkov (Moscow) On differential equations, integrability, and differential geometry.
March 14, 2001: Luuk Hoevenaars (Univ. of Twente, the Netherlands) Generalized associativity equations in Seiberg-Witten theory.
February 28, 2001: Nina Khor'kova (Moscow) On recursion operators and nonlocal symmetries of evolution equations by Artur Sergyeyev.
February 21, 2001: V. Yumaguzhin (Pereslavl-Zalesski) Contact classification of linear ODEs.

Autumn 2000

December 27, 2000: V. Trushkov (Moscow) Symmetries and conservation laws for some hydrodynamic systems .
December 20, 2000: V. Chetverikov (Moscow) New flatness conditions for control systems .
November 29, 2000: D. Khangoulyan (Moscow) Jumping Oscillator (Discontinuous trajectories of Lagrangian systems with singular hypersurface), an overview of a paper by F. Pugliese and A. M. Vinogradov (DIPS 11/98).
November 22, 2000: A. Verbovetsky (Moscow) On the geometry of singular Lagrangians, an overview of a paper by F. Pugliese and A. M. Vinogradov (DIPS 2/99).
November 15, 2000: I. S. Krasil'shchik (Moscow) On integrability of homogeneous scalar evolution equatuins , an overview of results Jan Sanders and Jing Ping Wang.
November 1, 2000: V. Trushkov (Moscow) Scale symmetries of differential equations and Newton polyhedra , an overview of a paper Self-similar solutions and power geometry by A. D. Bruno ( Uspekhi mat. nauk, t. 55, vyp. 1, c. 3-43. (Russian); English transl.: ( Russian Math. Surveys 55 (2000), no. 1, 1-42).
October 25, 2000: A. Kiselev (Moscow) Hierarchies of evolution equations defined by Lax Equations II, an overview of results Kazuhiro Kiso.

Winter-Spring 2000

May 31, 2000: V. Yumaguzhin (Pereslavl-Zalesski) On Monge-Ampere Equations.
May 24, 2000: V. Chetverikov (Moscow) Bihamiltonian Geometry and Bæcklund-Darboux transformations, an overview of results by F. Magri, M. Pedroni, G. Falqui, C. Morosi, G. Tondo, and others. II.
May 17, 2000: V. Yumaguzhin (Pereslavl-Zalesski) On Classification of Linear ODE up to an Equivalence.
May 10, 2000: V. Soloviev (Protvino) Boundary Terms in the Field Theory Hamiltonian Formalism.
April 12, 2000: S. Igonin (Yaroslavl) An overview of paper K. Yamaguchi, Differential systems associated with simple graded Lie algebras. Adv. Studies in Pure Math. 22, (1993), 413-494. I.
April 5, 2000: V. Chetverikov (Moscow) Bihamiltonian Geometry and Bæcklund-Darboux transformations, an overview of results by F. Magri, M. Pedroni, G. Falqui, C. Morosi, G. Tondo, and others. I.
March 29, 2000: R. Matyushkin (Moscow) G-invariant variational bicomplex, an overview of results by I. Anderson and M. Fells. IV.
March 22, 2000: R. Matyushkin (Moscow) G-invariant variational bicomplex, an overview of results by I. Anderson and M. Fells. III.
March 15, 2000: R. Matyushkin (Moscow) G-invariant variational bicomplex, an overview of results by I. Anderson and M. Fells. II.
March 1, 2000: R. Matyushkin (Moscow) G-invariant variational bicomplex, an overview of results by I. Anderson and M. Fells. I.
February 23, 2000: A. Semenov (Moscow) Quantum SL(2), an overview of results. III.
February 16, 2000: A. Semenov (Moscow) Quantum SL(2), an overview of results. II.
February 9, 2000: A. Semenov (Moscow) Quantum SL(2), an overview of results. I.
January 12, 2000: I. Miklashevsky (Moscow) Some aspects of formal integrability.
January 5, 2000: V. Trushkov (Moscow), The WDVV equations, an overview of results. III.

Autumn 1999

December 29, 1999: V. Trushkov (Moscow), The WDVV equations, an overview of results. II.
December 8, 1999: V. Trushkov (Moscow), The WDVV equations, an overview of results. I.
November 24, 1999: J. Krasil'shchik (Moscow), Overview of the paper On the equivalence problem for partial nonlinear equations by B. Kruglikov, V. Lychagin. III.
November 17, 1999: J. Krasil'shchik (Moscow), Overview of the paper On the equivalence problem for partial nonlinear equations by B. Kruglikov, V. Lychagin. II.
November 10, 1999: 1. S. Igonin (Yaroslavl), Overview of the paper Fedosov manifolds by I. Gelfand. V. Retakh, M. Shubin.
2. J. Krasil'shchik (Moscow), Overview of the paper On the equivalence problem for partial nonlinear equations by B. Kruglikov, V. Lychagin. I.
November 3, 1999: M. Vinogradov (Moscow), On multiple generalizations of graded Lie algebras and Poisson manifolds.
October 27, 1999: A. A. Verbovetsky (Moscow), Overview of the paper Decomposition of higher order tangent fields and calculus of variations by P. J. Alonso.

Autumn 1998

November 25, 1998: B. Kruglikov (Moscow), Nonlinear Cauchy-Riemann equation, pseudoholomorphic curves and Kobayashi pseudodistance.
November 18, 1998: A. Sossinsky (Moscow), Smooth manofolds with singularities and classical mechanics.
November 11, 1998: A. Kotov (Moscow), On Poisson homology of R-matrix brackets, II .
November 4, 1998: A. Kotov (Moscow), On Poisson homology of R-matrix brackets, I .
October 21, 1998: V. Chetverikov (Moscow), Linearization of control systems, higher symmetries and infinitesimal Brunovsky form.

Winter-Spring 1998

March 11, 1998: M. Vinogradov (Moscow), On multiple generalizations of Lie algebras and Poisson manifolds, II .
March 4, 1998: M. Vinogradov (Moscow), On multiple generalizations of Lie algebras and Poisson manifolds, I .
February 11, 1998: A. Vinogradov (Salerno-Moscow), On secondary modules over a secondary smooth function algebra.

Autumn 1997

December 10, 1997: O.M. Khudaverdian (Dubna) Double Complexes and Cohomological Hierarchy in a Space of Weakly Invariant Lagrangians of Mechanics.
November 19, 1997: A. Samokhin (Moscow) Overview of jet approach to control problem.
November 12,1997: N. Khor'kova (Moscow), Bæklund transformation and zero-curvatured representations. (F. Brandt, hep-th/9405064).
October 29, 1997: A. Verbovetsky (Moscow), Overview of cohomological physics, II.
October 22, 1997: I. Kanatchikov (Warszawa), Poisson brackets on differential forms in field theory and related algebraic structures.
October 15, 1997: A. Verbovetsky (Moscow), Overview of cohomological physics, I.

Winter-Spring 1997

May 21, 1997: N. Khor'kova (Moscow) A criterion for local action of recursion operators.
May 14, 1997: Ye. Al'berdin (Moscow) Integro-differential equations in quantum statistics.
April 23, 1997: I. Krasil'shchik (Moscow) On SH-algebras and C-spectral sequence.
April 16, 1997: V. Shemarulin (Sarov) Conservation laws and initial-value problems.
April 9, 1997: V. Yumaguzhin (Pereslavl-Zalesski) On reducibility of ODE to $y'''=0$.
April 2, 1997: A. Samokhin (Moscow) On action of vector fields on differential operators.
March 19, 1997: B. Kruglikov (Moscow), On Nijenhujs structures.
March 12, 1997: N. Khor'kova (Moscow), On the Euler equation: bi-hamiltonian structure.
March 5, 1997: B. Kruglikov (Moscow), On connections and quantization.
February 26, 1997: V. Chetverikov (Moscow), On symmetry approach to integro differential equationsII.
February 19, 1997: I. Krasil'shchik (Moscow), Generalized Poisson structures and Nambu mechanics III.
V. Chetverikov (Moscow), On symmetry approach to integro-differential equations I.
February 12, 1997: I. Krasil'shchik (Moscow), Generalized Poisson structures and Nambu mechanics (a review of recent symmetry approach to integro differential equations II.

1996

December 25, 1996: I. Krasil'shchik (Moscow), On Poisson-Nijenhuis structures over nonlinear PDE I.
December 11, 1996: V. Chetverikov (Moscow), On symmetry approach to integro differential equations (the Benjamin-Ono equation).
November 27, 1996: M. Vinogradov (Moscow), On n-ary Lie algebras II.
October 30, 1996: M. Vinogradov (Moscow), On n-ary Lie algebras I.
October 16, 1996: B. Kruglikov (Moscow), Nijenhuis tensor for quasi-complex manifolds.
October 2, 1996: A. Verbovetsky (Moscow), On some examples of the C-spectral sequence computation.

Questions and suggestions should go to Joseph S. Krasil'shchik, josephk @ diffiety.ac.ru.

THE DIFFIETY SEMINAR The Previous Years

THE DIFFIETY SEMINAR
The Previous Years