Browsing by Author "Çalışkan, Cafer"
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An Analysis for the Use of Compressed Sensing Method in Microwave Imaging
Yiğit, Enes; Tekbaş, Mustafa; Ünal, İlhami; Erdoğan, Sercan; Çalışkan, Cafer (IEEE, 2017)One of the most important problems encountered in microwave imaging methods is intensive data processing traffic that occurs when high resolution and real time tracking is desired. Radar signals can be recovered without ... -
An analysis for the use of compressed sensing method in microwave imaging [Mikrodalga Görüntülemede Sıkıştırılmış Algılama Yönteminin Kullanımına Yönelik Bir Analiz]
Yiğit, Enes; Tekbaş, Mustafa; Ünal, İlhami; Erdogan, Sercan; Çalışkan, Cafer (Institute of Electrical and Electronics Engineers Inc., 2017)One of the most important problems encountered in microwave imaging methods is intensive data processing traffic that occurs when high resolution and real time tracking is desired. Radar signals can be recovered without ... -
New 2-Edge-Balanced Graphs from Bipartite Graphs
Çalışkan, Cafer (Wiley-Blackwell, 2016)Let G be a graph of order n satisfying that there exists lambda epsilon Z(+) for which every graph of order n and size t is contained in exactly. distinct subgraphs of the complete graph K-n isomorphic to G. Then G is ... -
New Infinite Families of 2-Edge-Balanced Graphs
Çalışkan, Cafer; Chee, Yeow Meng (Wiley-Blackwell, 2014)A graph G of order n is called t-edge-balanced if G satisfies the property that there exists a positive for which every graph of order n and size t is contained in exactly distinct subgraphs of Kn isomorphic to G. We call ... -
Orthogonal projection and liftings of Hamilton-decomposable Cayley graphs on abelian groups
Alspach, Brian; Çalışkan, Cafer; Kreher, Donald L. (Elsevier Science Bv, 2013)In this article we introduce the concept of (p alpha)-switching trees and use it to provide sufficient conditions on the abelian groups G and H for when CAY (G x H -
Partitioning 3-arcs into Steiner Triple Systems
Çalışkan, Cafer (Wiley, 2017)In this article it is shown that there is a partitioning of the set of 3-arcs in a projective plane of order three into nine pairwise disjoint Steiner triple systems of order 13.