Full-field two-dimensional least-squares method for phase-shifting interferometry

A set of two-dimensional subsonic flows past certain cylinders is obtained using hodograph methods, in which the true pressure-volume relationship is replaced by various straight-line approximations. It is found that the approximation obtained by a least-squares method possibly gives best results. Comparison is made with values obtained by using the von Kármán-Tsien approximation and also with results obtained by the variational approach of Lush & Cherry (1956).

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A crystallographic and spectroscopic study of mercury(II) dithiocarbamate

Canadian Journal of Chemistry ◽

10.1139/v81-396 ◽

1981 ◽

Vol 59 (18) ◽

pp. 2746-2749 ◽

Cited By ~ 14

Author(s):

Chung Chieh ◽

Sing Kwen Cheung

Keyword(s):

Mass Spectrum ◽

Spectroscopic Study ◽

Least Squares ◽

Least Squares Method ◽

Two Dimensional ◽

Polymeric Compound ◽

Full Matrix ◽

Space Group ◽

Polymeric Networks ◽

Ir Bands

Ammonium dithiocarbamate, H2NCS2NH4, decomposes easily but the anion forms a stable mercury(II) complex, the crystals of which are orthorhombic with a = 7.851(3), b = 17.565(7), c = 12.051(3) Å, and space group Pbca. The structure was solved by the Patterson method and refined by the full-matrix least-squares method to an R of 0.038 for 781 reflections. The structure consists of layers of two-dimensional polymeric networks. The dimeric subunits in the layer containing two each of mutually connected Hg atoms and dithiocarbamates are further linked by other bridging dithiocarbamates forming a sheet-like structure. Each Hg atom bonds to four S atoms from four separate dithiocarbamates with Hg—S distances of 2.499(4), 2.508(4), 2.533(4), and 2.629(4) Å. The ir bands observed were: ν(NH2), 3320, 3220, 3125; δ(NH2), 1600; ν(C—N), 1395; ρr(NH2), 1172; and v(C—S), 840 cm−1. The mass spectrum of this polymeric compound gave peaks corresponding to Hg, S2, CNH2, HNCS, S, CS2, S5, S4, S3, and S8 in the order of their intensities.

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Phase Retrieval of Phase-Shifting Interferometry with Iterative Least-Squares Fitting Algorithm: Experiments

Optical Review ◽

10.1007/s10043-999-0196-z ◽

1999 ◽

Vol 6 (3) ◽

pp. 196-203 ◽

Cited By ~ 5

Author(s):

Hongxin Huang ◽

Masahide Itoh ◽

Toyohiko Yatagai

Keyword(s):

Least Squares ◽

Phase Retrieval ◽

Phase Shifting ◽

Least Squares Fitting ◽

Phase Shifting Interferometry ◽

Fitting Algorithm

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Infrared phase-shifting interferometry using the nitroanisole as a two-dimensional detector

10.1117/12.642732 ◽

2005 ◽

Author(s):

Naoki Miyamoto ◽

Shusuke Nisiyama ◽

Satoshi Tomioka ◽

Takeaki Enoto

Keyword(s):

Phase Shifting ◽

Two Dimensional ◽

Phase Shifting Interferometry

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METODA ZANURZANIA REGRESJI W PRZYPADKU WYSTĘPOWANIA OBSERWACJI NIETYPOWYCH

Metody Ilościowe w Badaniach Ekonomicznych ◽

10.22630/mibe.2019.20.2.9 ◽

2019 ◽

Vol 20 (2) ◽

pp. 83-92

Author(s):

Małgorzata Kobylińska

Keyword(s):

Linear Regression ◽

Least Squares ◽

Least Squares Method ◽

Regression Function ◽

Maximum Depth ◽

Two Dimensional ◽

Structural Elements ◽

Linear Regression Function ◽

Regression Functions

This paper presents the application of the regression maximum depth for the estimation of linear regression function structural elements. For two-dimensional sets including untypical observations, regression functions were developed using the classical least squares method and a method based on the concept of observation depth measure in a sample. The effect of untypical observations on the estimated models has been noted.

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Modified moving least squares method for two-dimensional linear and nonlinear systems of integral equations

Computational and Applied Mathematics ◽

10.1007/s40314-018-0667-6 ◽

2018 ◽

Vol 37 (5) ◽

pp. 5857-5875 ◽

Cited By ~ 3

Author(s):

M. Matinfar ◽

M. Pourabd

Keyword(s):

Nonlinear Systems ◽

Least Squares ◽

Least Squares Method ◽

Moving Least Squares ◽

Two Dimensional ◽

Moving Least Squares Method ◽

Systems Of Integral Equations ◽

Linear And Nonlinear ◽

Linear And Nonlinear Systems ◽

Modified Moving Least Squares

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Multi-surface phase-shifting algorithm using the window function fitted by the nonlinear least squares method

Journal of Modern Optics ◽

10.1080/09500340.2021.2011971 ◽

2021 ◽

pp. 1-12

Author(s):

Lin Chang ◽

Sergiy Valyukh ◽

Tingting He ◽

Zhu Chen ◽

Yingjie Yu

Keyword(s):

Least Squares ◽

Least Squares Method ◽

Nonlinear Least Squares ◽

Phase Shifting ◽

Window Function ◽

Surface Phase ◽

Nonlinear Least Squares Method

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Design of two-dimensional FIR digital filters with specified magnitude and group delay responses by analytical least-squares method

Signal Processing ◽

10.1016/s0165-1684(96)00113-2 ◽

1996 ◽

Vol 54 (3) ◽

pp. 273-283 ◽

Cited By ~ 2

Author(s):

Soo-Chang Pei ◽

Jong-Jy Shyu

Keyword(s):

Least Squares ◽

Digital Filters ◽

Group Delay ◽

Least Squares Method ◽

Two Dimensional ◽

Fir Digital Filters

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Special points for two-dimensional Brillouin zone or Wigner–Seitz cell integrations

Canadian Journal of Physics ◽

10.1139/p80-070 ◽

1980 ◽

Vol 58 (4) ◽

pp. 497-503 ◽

Cited By ~ 7

Author(s):

H. C. Chow ◽

S. H. Vosko

Keyword(s):

Least Squares ◽

Brillouin Zone ◽

Least Squares Method ◽

Two Dimensional ◽

Direct Solution ◽

Large Numbers ◽

Seitz Cell ◽

Transcendental Equations ◽

Sample Points ◽

Special Points

Various methods of generating special point formulae for two–dimensional Brillouin zone or Wigner–Seitz cell integrations, useful for the calculation of surface properties, are compared. The direct solution of the coupled non-linear transcendental equations, which determine the special points and their weights, by means of a least squares method is found to be feasible for small numbers of sample points and yields the most efficient formulae. For large numbers of sample points the product Gauss–Chebychev method is most practical.

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