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On domain decomposition methods for optimal control problems

Tran, Minh-Binh (2013)

Applications of Mathematics 2013

In this note, we introduce a new approach to study overlapping domain decomposition methods for optimal control systems governed by partial differential equations. The model considered in our paper is systems governed by wave equations. Our technique could be used for several other equations as well.

On embedding curves in surfaces

Bajguz, W. (2001)

Proceedings of the 20th Winter School "Geometry and Physics"

Contrary to a statement of Borsuk the author proves that every locally plane Peano continuum is embeddable into a 2-manifold.

On Feller boundary

Rao, B. V. (1971)

General Topology and Its Relations to Modern Analysis and Algebra

On Finsler-Weyl manifolds and connections

Kozma, L. (1996)

Proceedings of the 15th Winter School "Geometry and Physics"

Let M be a manifold with all structures smooth which admits a metric g . Let Γ be a linear connection on M such that the associated covariant derivative satisfies g = g w for some 1-form w on M . Then one refers to the above setup as a Weyl structure on M and says that the pair ( g , w ) fits Γ . If σ : M and if ( g , w ) fits Γ , then ( e σ g , w + d σ ) fits Γ . Thus if one thinks of this as a map g w , then e σ g w + d σ .In this paper, the author attempts to apply Weyl’s idea above to Finsler spaces. A Finsler fundamental function L : T M satisfies (i) L ( u ) > 0 for...

On Gelfand-Zetlin modules

Drozd, Yu. A., Ovsienko, S. A., Futorny, V. M. (1991)

Proceedings of the Winter School "Geometry and Physics"

[For the entire collection see Zbl 0742.00067.]Let 𝔤 k be the Lie algebra 𝔤 l ( k , 𝒞 ) , and let U k be the universal enveloping algebra for 𝔤 k . Let Z k be the center of U k . The authors consider the chain of Lie algebras 𝔤 n 𝔤 n - 1 𝔤 1 . Then Z = Z k k = 1 , 2 , n is an associative algebra which is called the Gel’fand-Zetlin subalgebra of U n . A 𝔤 n module V is called a G Z -module if V = x V ( x ) , where the summation is over the space of characters of Z and V ( x ) = { v V ( a - x ( a ) ) m v = 0 , m 𝒵 + , a 𝒵 } . The authors describe several properties of G Z - modules. For example, they prove that if V ( x ) = 0 for some x ...

On geodesic mappings of special Finsler spaces

Bácsó, Sándor (1999)

Proceedings of the 18th Winter School "Geometry and Physics"

The author previously studied with F. Ilosvay and B. Kis [Publ. Math. 42, 139-144 (1993; Zbl 0796.53022)] the diffeomorphisms between two Finsler spaces F n = ( M n , L ) and F ¯ n = ( M n , L ¯ ) which map the geodesics of F n to geodesics of F ¯ n (geodesic mappings).Now, he investigates the geodesic mappings between a Finsler space F n and a Riemannian space ¯ n . The main result of this paper is as follows: if F n is of constant curvature K and the mapping F n ¯ n is a strongly geodesic mapping then K = 0 or K 0 and L ¯ = e ϕ ( x ) L .

On holomorphically projective mappings onto Kählerian spaces

Mikeš, Josef, Pokorná, Olga (2002)

Proceedings of the 21st Winter School "Geometry and Physics"

The main result of this paper determines a system of linear partial differential equations of Cauchy type whose solutions correspond exactly to holomorphically projective mappings of a given equiaffine space onto a Kählerian space. The special case of constant holomorphic curvature is also studied.

On homogeneous symmetries for evolution systems with constraints

Sergyeyev, Artur (2002)

Proceedings of the 21st Winter School "Geometry and Physics"

The author obtains sufficient conditions of the finite independence and the commutativity for local as well as non-local homogeneous symmetries of a large class of ( 1 + 1 ) -dimensional evolution systems.

On local flatness of manifolds with AHS-structures

Čap, Andreas, Slovák, Jan (1996)

Proceedings of the 15th Winter School "Geometry and Physics"

Summary: The AHS-structures on manifolds are the simplest cases of the so called parabolic geometries which are modeled on homogeneous spaces corresponding to a parabolic subgroup in a semisimple Lie group. It covers the cases where the negative parts of the graded Lie algebras in question are abelian. In the series the authors developed a consistent frame bundle approach to the subject. Here we give explicit descriptions of the obstructions against the flatness of such structures based on the latter...

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