C. Bozkaya, "Least squares differential quadrature time integration scheme in the dual reciprocity boundary element method solution of convection-diffusion problems," 27th World Conference on Boundary Elements and Other Mesh Reduction Methods , vol.39, Florida, United States Of America, pp.123-131, 2005
Bozkaya, C. 2005. Least squares differential quadrature time integration scheme in the dual reciprocity boundary element method solution of convection-diffusion problems. 27th World Conference on Boundary Elements and Other Mesh Reduction Methods , (Florida, United States Of America), 123-131.
Bozkaya, C., (2005). Least squares differential quadrature time integration scheme in the dual reciprocity boundary element method solution of convection-diffusion problems . 27th World Conference on Boundary Elements and Other Mesh Reduction Methods (pp.123-131). Florida, United States Of America
Bozkaya, CANAN. "Least squares differential quadrature time integration scheme in the dual reciprocity boundary element method solution of convection-diffusion problems," 27th World Conference on Boundary Elements and Other Mesh Reduction Methods, Florida, United States Of America, 2005
Bozkaya, CANAN. "Least squares differential quadrature time integration scheme in the dual reciprocity boundary element method solution of convection-diffusion problems." 27th World Conference on Boundary Elements and Other Mesh Reduction Methods , Florida, United States Of America, pp.123-131, 2005
Bozkaya, C. (2005) . "Least squares differential quadrature time integration scheme in the dual reciprocity boundary element method solution of convection-diffusion problems." 27th World Conference on Boundary Elements and Other Mesh Reduction Methods , Florida, United States Of America, pp.123-131.
@conferencepaper{conferencepaper, author={CANAN BOZKAYA}, title={Least squares differential quadrature time integration scheme in the dual reciprocity boundary element method solution of convection-diffusion problems}, congress name={27th World Conference on Boundary Elements and Other Mesh Reduction Methods}, city={Florida}, country={United States Of America}, year={2005}, pages={123-131} }