The Parallel Approximation Problem and Subset Sums

Patakı, Gabor
Tural, Mustafa Kemal


ERIS, A; GURSES, M; Karasu, Atalay (1983-01-01)
The strong partial transitive-closure problem: Algorithms and performance evaluation
Toroslu, İsmail Hakkı (1996-08-01)
The development of efficient algorithms to process the different forms of transitive-closure (To) queries within the context of large database systems has recently attracted a large volume of research efforts. In this paper, we present two new algorithms suitable for processing one of these forms, the so called strong partially instantiated transitive closure, in which one of the query's arguments is instantiated to a set of constants and the processing of which yields a set of tuples that draw their values...
The Dirac-Yukawa problem in view of pseudospin symmetry
AYDOĞDU, OKTAY; Sever, Ramazan (IOP Publishing, 2011-08-01)
An approximate analytical solution of the Dirac equation for the Yukawa potential under the pseudospin symmetry condition is obtained using the asymptotic iteration method. We discover the energy eigenvalue equation and some of the numerical results are listed. Wave functions are obtained in terms of hypergeometric functions. Extra degeneracies are removed by adding a new term, A/r(2), to the Yukawa potential. The effects of tensor interaction on the two states in the pseudospin doublet are also investigated.
The Schur algorithm and reproducing kernel Hilbert spaces in the ball
Alpay, D; Bolotnikov, V; Kaptanoglu, HT (Elsevier BV, 2002-02-15)
Using reproducing kernel Hilbert spaces methods we develop a Schur-type algorithm for a subclass of the functions analytic and contractive in the ball. We also consider the Nevanlinna-Pick interpolation problem in that class. (C) 2002 Elsevier Science Inc. All rights reserved.
The pseudopotential method.
Erbarut, Erkan; Department of Physics (1980)
Citation Formats
G. Patakı and M. K. Tural, “The Parallel Approximation Problem and Subset Sums,” 2007, Accessed: 00, 2021. [Online]. Available: