On order properties of compact operators in Banach lattices.

Gök, Ömer


On Isomorphic classification of cartesian products of lp-Finite and lq-Infinite power series spaces
Şimşek, Aytaç; Yurdakul, Murat; Department of Mathematics (1999)
On semilinear elliptic boundary value problems.
Sağsen, Onur; Department of Mathematics (1982)
On the linear topological structure of holomorphic function spaces.
Shaban, Abdullah; Department of Mathematics (1980)
On higher order approximations for hermite-gaussian functions and discrete fractional Fourier transforms
Candan, Çağatay (Institute of Electrical and Electronics Engineers (IEEE), 2007-10-01)
Discrete equivalents of Hermite-Gaussian functions play a critical role in the definition of a discrete fractional Fourier transform. The discrete equivalents are typically calculated through the eigendecomposition of a commutator matrix. In this letter, we first characterize the space of DFT-commuting matrices and then construct matrices approximating the Hermite-Gaussian generating differential equation and use the matrices to accurately generate the discrete equivalents of Hermite-Gaussians.
On representations of Clifford algebras of Ternary cubic forms
Coşkun, Emre; Mustopa, Yusuf (2010-08-14)
In this article, we provide an overview of a one-to-one correspondence between representations of the generalized Clifford algebra C-f of a ternary cubic form f and certain vector bundles (called Ulrich bundles) on a cubic surface X. We study general properties of Ulrich bundles, and using a recent classification of Casanellas and Hartshorne, deduce the existence of irreducible representations of C-f of every possible dimension.
Citation Formats
Ö. Gök, “On order properties of compact operators in Banach lattices.,” Middle East Technical University, 1985.