... Lancet, Vol.337, No. 8 7 46 , pp. 867 -8 72, 0 140 -67 36 (Print) Hattersley, A T & McCarthy, M I (20 05) What makes a good genetic association study? Lancet, Vol. 366 , No. 949 3, pp.1315-1 323 , 0 140 -67 36 Hernán, ... Epidemiology faces its limits Science, Vol . 26 9, No. 522 1, pp.1 64 - 169 , 00 368 075 Tunstall Pedoe, H (20 03) Monica project Monica monograph and multimedia sourcebook: World’s largest study of heart disease, ... mineral density in early adolescence (BMDearly) Bone mineral density increase from early to late adolescence (BMDchange) Total body fat mass in early adolescence (Fatearly) There is a body of evidence...
... for a finite family of nonexpansive mappings,” Nonlinear Analysis: Theory, Methods & Applications, vol 66 , no 12, pp 26 76 26 87, 20 07 V Colao, G Marino, and H.-K Xu, “An iterative method for finding ... Publishers, Yokohama, Japan, 20 00 22 H.-K Xu, “Iterative algorithms for nonlinear operators,” Journal of the London Mathematical Society, vol 66 , no 1, pp 24 0 25 6, 20 02 23 P L Combettes and S ... inversestrongly monotone mappings,” Nonlinear Analysis: Theory, Methods & Applications, vol 61 , no 3, pp 341 –350, 20 05 21 W Takahashi, Nonlinear Functional Analysis, Fixed Point Theory and Its Application,...
... Experiment Experiment No calibration 2. 80/0.301 2. 28/ − 0.53 Calibration (4 points) Calibration (all points) 2. 61 / − 0 .22 2. 39/0.09 1.77/ − 0. 32 1.17/0 .21 Stella Doradus Horn antenna Model 3115 Emitting ... approach proposed in this paper 2.2 Finite-Difference-Based Models The most common approach is the well known FDTD proposed in [ 16] which numerically solves Maxwell’s equations and thus provides ... office MIMO measurements at 5 .2 GHz,” in Proceedings of the 64 th IEEE Vehicular Technology Conference (VTC ’ 06) , pp 22 26 , September 20 06 [6] T K¨ rner and A Meier, “Prediction of outdoor and outdooru...
... yielded by variant B2 (from the published sequence [6, 7]) except for two substitutions located in peptide 62 79 MS and automated sequence analysis actually demonstrated that peptide 62 79 (molecular ... as1-casein Eur J Biochem 24 9, 1–7 21 Jaubert, A & Martin, P (19 92) Reverse-phase HPLC analysis of a goat casein Identification of as1- and as2-casein genetic variants Lait 72, 23 5 24 7 22 Ferranti, P., ... (B) polyclonal antibodies against as1-Cas a–e identify as1-Cas bands of the MF sample in order of increasing mobility towards the anode Ó FEBS 20 02 129 6 C Bevilacqua et al (Eur J Biochem 26 9)...
... [5] 2, 4 ' [2] [3] i Graphical Data Display Manager, Application Programming Guide, SC33-0 148 -2, IBM Corp., 19 84 SUPERL REL > C0MPAI~TIVE > < ' p i u " > ... expressions like three billions 5 64 millions 23 40 00 and to cwduate thcrn into their equivalent numeric form (3 56 42 3 40 00) The talcs arc applied any time the analyzer finds the words miliardi (billions), ... be directly accessed by the program, because the homogeneity of their structure The disadvantage is a performance degradation when the size of data increases, since Prolog is not provided with...
... research needed Neurol Rehabil 20 04, 10: 123 -130 Hogan N, Krebs HI, Charnarong J, Sharon A: Interactive robotics therapist Cambridge, Massachusetts Institute of Technology: US Patent No. 5 46 62 1 3; 1995 ... 14 15 16 17 18 19 20 21 22 23 24 25 26 27 Hesse S, Werner C, Pohl M, Rueckriem S, Mehrholz J, Lingnau ML: Computerized arm training improves the motor control of the severely affected arm after ... robot-aided sensorimotor stimulation Neurology 20 00, 54( 10):1938-1 944 Page of (page number not for citation purposes) Journal of NeuroEngineering and Rehabilitation 20 08, 5 :21 10 11 12 13 14 15 16...
... and a finite family of quasinonexpansive mappings,” Journal of Inequalities and Applications, vol 20 10, Article ID 45 8 24 7, 25 pages, 20 10 Fixed Point Theory and Applications 27 29 M Liu, S S Chang, ... Theory, Methods & Applications, vol 69 , no 2, pp 45 64 62 , 20 08 36 K Shimoji and W Takahashi, “Strong convergence to common fixed points of infinite nonexpansive mappings and applications,” Taiwanese ... − p − λn Ayn − Ap JM2 ,δn p − 2 ≤ yn − p − 2 n yn − p, Ayn − Ap ≤ xn − p − 2 n γ Ayn − Ap ≤ xn − p λn λn − 2 0, where 2 Ayn − Ap n 2 Ayn − Ap n Ayn − Ap2 3.31 Similarly, we can show that...
... Applications, vol 28 , pp 3 26 – 329 , 1 969 T.-H Kim and H.-K Xu, “Strong convergence of modified Mann iterations,” Nonlinear Analysis Theory, Methods & Applications, vol 61 , no 1 -2, pp 51 60 , 20 05 K Nakajo ... Analysis and Applications, vol 24 1, no 1, pp 46 –55, 20 00 24 G Marino and H.-K Xu, “A general iterative method for nonexpansive mappings in Hilbert spaces,” Journal of Mathematical Analysis and Applications, ... pseudo-contractions in Hilbert spaces,” Nonlinear Analysis, Theory, Methods and Applications, vol 69 , no 2, pp 45 64 62 , 20 08 Fixed Point Theory and Applications 19 X Qin and Y Su, “Approximation of a zero point...
... ∈ C 2.6 Let I denote the identity operator of H and let {xn } be a sequence in a Hilbert space H and x ∈ H Throughout this paper, xn → x denotes that {xn } strongly converges to x and x denotes ... A2 , respectively, h1 x x ∈ C, 4 .2 h2 x x ∈ C Obviously, if we find a solution x ∈ A1 ∩ A2 , then one must have x ∈ A Now, let Φ1 and 2 be two bifunctions from C × C to R de ned by Φ1 x, y h2 ... ∈ C, h2 y − h2 u2n y − u2n , u2n − xn ≥ 0, r2n ∀y ∈ C, zn xn αn − αn σn xn γ1 u1n − γ1 u2n , − αn − σn − λn μ zn , ∀n ≥ 4.4 Fixed Point Theory and Applications 17 By Corollary 3 .6, we know that...
... Analysis and Applications, vol 29 8, no 1, pp 27 9 29 1, 20 04 G Marino and H K Xu, “A general iterative method for nonexpansive mappings in Hilbert spaces,” Journal of Mathematical Analysis and Applications, ... 318, no 1, pp 43 – 52, 20 06 H Iiduka and W Takahashi, “Strong convergence theorems for nonexpansive mappings and inversestrongly monotone mappings,” Nonlinear Analysis: Theory, Methods & Applications, ... T y imply x − y, u − v ≥ A monotone mapping T : H → 2H is maximal if the graph G T of T is not properly contained in the graph of any other monotone mapping It is known that a monotone mapping...
... and hence p − x∗ 2 T2 U1 p − x∗ From 2. 16 , we know that U1 p − x∗ p − x∗ T2 p − x ∗ − 2 p − x∗ T2 U1 p − x∗ Since U1 p 2 T2 p − x∗ − 22. 21 p, we have p − x∗ Applying Lemma 2. 5 to 2. 22 , ... and Applied Mathematics, vol 21 4, no 1, pp 1 86 20 1, 20 08 E Blum and W Oettli, “From optimization and variational inequalities to equilibrium problems,” The Mathematics Student, vol 63 , no 1 4, ... Journal of Mathematical Analysis and Applications, vol 24 8, no 2, pp 43 8 45 4, 20 00 26 P Cholamjiak, “A hybrid iterative scheme for equilibrium problems, variational inequality problems, and fixed...