On the inverse problem of galois theory.

Sharary, Ahmad


On the theory of integral equations.
Çelik, Hasan Ali; Department of Mathematics (1965)
On the linear topological structure of holomorphic function spaces.
Shaban, Abdullah; Department of Mathematics (1980)
On the Löwner theory.
Hayfavi, Azize; Arf, Cahit; Department of Mathematics (1983)
On the notion of stability of order convergence in vector lattices
Gorokhova, SG; Emelyanov, Eduard (1994-09-01)
In the theory of Banach lattices the following criterion for a norm to be order continuous is established: a norm is order continuous if and only if every order bounded sequence of positive pairwise disjoint elements in a lattice converges to zero in norm. In this paper we give a criterion for order convergence to be stable in a rather wide class of vector lattices which includes all Köthe spaces. The formulation of the criterion is analogous to that of the above-mentioned criterion for a norm to be order c...
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...
Citation Formats
A. Sharary, “On the inverse problem of galois theory.,” Middle East Technical University, 1974.