On the linear topological structure of holomorphic function spaces.

Shaban, Abdullah


On the algebraic structure of relative hamiltonian diffeomorphism group
Demir, Ali Sait; Ozan, Yıldıray; Department of Mathematics (2008)
Let M be smooth symplectic closed manifold and L a closed Lagrangian submanifold of M. It was shown by Ozan that Ham(M,L): the relative Hamiltonian diffeomorphisms on M fixing the Lagrangian submanifold L setwise is a subgroup which is equal to the kernel of the restriction of the flux homomorphism to the universal cover of the identity component of the relative symplectomorphisms. In this thesis we show that Ham(M,L) is a non-simple perfect group, by adopting a technique due to Thurston, Herman, and Banyag...
On the inverse problem of galois theory.
Sharary, Ahmad; Department of Mathematics (1974)
On de Rham-Witt complex and crystalline cohomology.
Tekman, Okan; Department of Mathematics (1986)
On the Structure of Automorphism Groups of Rational Elliptic Surfaces
Karayayla, Tolga (null; 2013-08-12)
On the dynamics of singular continuous systems
Güler, Y (1989-04-01)
The Hamilton–Jacobi theory of a special type of singular continuous systems is investigated by the equivalent Lagrangians method. The Hamiltonian is constructed in such a way that the constraint equations are involved in the canonical equations implicitly. The Hamilton–Jacobi partial differential equation is set up in a similar manner to the regular case
Citation Formats
A. Shaban, “On the linear topological structure of holomorphic function spaces.,” Middle East Technical University, 1980.