Tyagi, M. Munshi, M.S. Sunita Yadav, M.S. Munshi, N.N. navigate to this website
Munshi, "Beam hardening correction for simulated x-ray tomography", NDT&E International. 56. P. This Poisson corruption leads to imperfections in the projection data, i.e., the data no longer represents the line integral of the desired property being measured. Bajpai, P. http://www.sciencedirect.com/science/article/pii/096386959290160I
Back to Top IIT Kanpur Mechanical Engineering Nuclear Engineering IITK Map © 2006 All Right Reserved Skip to main content This service is more advanced Rastogi, "Design of an optimal filter for the discrete convolution backprojection method", American Journal of Management and Mathematical Sciences, 14, (1994), pp 229-265. 30. S. 1986: Application of digital tomography in two-phase flow studies. Munshi, M.
Shakya, M. Bhatia, S. Kishore, P. S.P.
Mewes, "Analysis of Dynamic Bias Error in X-Ray Tomographic Reconstructions of a Three-Phase Flow System", International Journal of Multi-phase Flow, 58(2014), pp 57-71. 79. P. Rao, "Steam-generator Simulation with Non-equilibrium Two-phase Flow Models", Annals of Nuclear Energy, 13(1986), pp 617-622. 7. https://books.google.com/books?id=ldjExHsJqOsC&pg=PA83&lpg=PA83&dq=error+analysis+of+tomographic+filters+i+theory&source=bl&ots=hKgD6of9vK&sig=63ToaWO0UjDzS7WT2JiCRoJWe-g&hl=en&sa=X&ved=0ahUKEwiftoOU9sfPAhVHxoMKHQ9vD_AQ Venkatramani, "Non-invasive measurements of void-fraction profile in a vertical mercury-nitrogen flow", Fourth world conference on experimental heat transfer, fluid mechanics and thermodynamics (EXHFT-4), Brussels, 1997, pp 269-276. 20.
Ramakrishna, K. Munshi, "A review of computerized tomography with application to two-phase flows", Sadhana, 15(1990), pp 43-55. 15. Rathore,S. G.
Arnold, "Tomographic Reconstruction of Elastic Constants in Composite Materials Using Numerical and Experimental Laser Ultrasonic Data", Research in Nondestructive Evaluation, 21(2010), pp 61-90. 65. A Sobolev space analysis has already been reported involving certain error estimates for predicting the inherent error in the convolution backprojection algorithm. Munshi, "Analysis of Pre and Post-treatment CT Images Using KT-1 and Fractal Dimension", Trans. Kulacki, P.
Rathore, "Simplified Algorithms for CAT Scanners", Bulletin of Radiation Protection, 10,1(1987), pp 201-204. 10. useful reference The service is similar in scope to EndNote or RefWorks or any other reference manager like BibTeX, but it is a social bookmarking service for scientists and humanities researchers. R. Their combined citations are counted only for the first article.DoneMerge duplicatesCitations per yearScholarFollowEmailFollow new articlesFollow new citationsCreate alertCancelPrabhat MunshiIndian Institute of Technology KanpurTomography, Nuclear Safety, Tomography Error, Nuclear Engineering, NDTVerified email
The projection data obtained has been used for the reconstruction using CBP algorithm for the central plane of the object. P. Munshi,"Automated nondestructive evaluation of composite specimen by fractal analysis", Proc. my review here You may hide this message.
Wells, P. S. Bhatt, P.
Chaudhary, P. I: TheoryP MunshiNDT & E International 25 (4), 191-194, 1992511992Design of an isotopic CT scanner for two phase flow measurementsAC De Vuono, PA Schlosser, FA Kulacki, P MunshiIEEE Transactions on Nuclear Radiol., Vol.46, pp.1016â€“1022, 1973.CrossRefG N Ramachandran and A V Lakhshminarayanan, Three-dimensional reconstruction from radiographs and electron micrographs: Application of convolution instead of Fourier transforms, Proc. Gupta, P.
Munshi, N.K. Ram, R.K.S. Selvam, Verma Dinkar, P. get redirected here KarasNova Publishers, 2006 - 184 sidor 0 Recensionerhttps://books.google.se/books/about/New_Topics_in_Crystal_Growth_Research.html?hl=sv&id=ldjExHsJqOsCExperimental and theoretical aspects of crystal growth and its applications, e.g.
KarasRedaktĂ¶rGeorge V. Munshi, R.K. P. Yadav, K.
P. Seshadri, P. Munshi, A. R.K.S.
A graphite core object has been scanned through Micro-CT scanner. or its licensors or contributors. Kalra, "Error Estimates for Tomographic Inversion", Inverse Problems, 7, 3(1991), pp 399-408. 19.