Citation: Ms. Wei, PERTURBATION-THEORY FOR THE ECKART-YOUNG-MIRSKY THEOREM AND THE CONSTRAINED TOTAL LEAST-SQUARES PROBLEM, Linear algebra and its applications, 280(2-3), 1998, pp. 267-287
Citation: Ar. Depierro et Ms. Wei, REVERSE ORDER LAW FOR REFLEXIVE GENERALIZED INVERSES OF PRODUCTS OF MATRICES, Linear algebra and its applications, 277(1-3), 1998, pp. 299-311
Citation: Ms. Wei, EQUIVALENT FORMULAS FOR THE SUPREMUM AND STABILITY OF WEIGHTED PSEUDOINVERSES, Mathematics of computation, 66(220), 1997, pp. 1487-1508
Citation: Gl. Chen et al., PERTURBATION ANALYSIS OF THE LEAST-SQUARES SOLUTION IN HILBERT-SPACES, Linear algebra and its applications, 244, 1996, pp. 69-80
Citation: Ms. Wei, AIR-QUALITY ASSESSMENT AT HAZARDOUS-WASTE SITES, Journal of environmental science and health. Part A: Environmental science and engineering, 30(7), 1995, pp. 1543-1547
Citation: G. Majda et Ms. Wei, RELATIONSHIPS BETWEEN A POTENTIAL AND ITS SCATTERING FREQUENCIES, SIAM journal on applied mathematics, 55(4), 1995, pp. 1094-1116
Citation: Sy. Chou et al., SINGLE-DOMAIN MAGNETIC PILLAR ARRAY OF 35-NM DIAMETER AND 65-GBITS IN(2) DENSITY FOR ULTRAHIGH DENSITY QUANTUM MAGNETIC STORAGE/, Journal of applied physics, 76(10), 1994, pp. 6673-6675
Citation: Ms. Wei et Sy. Chou, SIZE EFFECTS ON SWITCHING FIELD OF ISOLATED AND INTERACTIVE ARRAYS OFNANOSCALE SINGLE-DOMAIN NI BARS FABRICATED USING ELECTRON-BEAM NANOLITHOGRAPHY, Journal of applied physics, 76(10), 1994, pp. 6679-6681
Citation: Sy. Chou et al., AN ULTRA-HIGH-RESOLUTION SINGLE-DOMAIN MAGNETIC FORCE MICROSCOPE TIP FABRICATED USING NANOLITHOGRAPHY, IEEE transactions on magnetics, 30(6), 1994, pp. 4485-4487
Citation: Pb. Fischer et al., ULTRAHIGH-RESOLUTION MAGNETIC FORCE MICROSCOPE TIP FABRICATED USING ELECTRON-BEAM LITHOGRAPHY, Journal of vacuum science & technology. B, Microelectronics and nanometer structures processing, measurement and phenomena, 11(6), 1993, pp. 2570-2573
Citation: Cc. Paige et Ms. Wei, ANALYSIS OF THE GENERALIZED TOTAL LEAST-SQUARES PROBLEM AX-APPROXIMATE-TO-B WHEN SOME COLUMNS OF A ARE FREE OF ERROR, Numerische Mathematik, 65(2), 1993, pp. 177-202