BEGIN:VCALENDAR VERSION:2.0 PRODID:IEEE vTools.Events//EN CALSCALE:GREGORIAN BEGIN:VTIMEZONE TZID:Australia/Brisbane BEGIN:STANDARD DTSTART:19920301T020000 TZOFFSETFROM:+1100 TZOFFSETTO:+1000 TZNAME:AEST END:STANDARD END:VTIMEZONE BEGIN:VEVENT DTSTAMP:20220509T224752Z UID:28D5DF24-6118-429D-AE05-D595C505E098 DTSTART;TZID=Australia/Brisbane:20220503T173000 DTEND;TZID=Australia/Brisbane:20220503T200000 DESCRIPTION:This month\, Vaughan will discuss the chief citation in the hel p page for Matlab’s nufft function\, which is:\n\nPotter\, Samuel F.\, N ail A. Gumerov\, and Ramani Duraiswami. “Fast Interpolation of Bandlimit ed Functions.” In 2017 IEEE International Conference on Acoustics\, Spee ch and Signal Processing (ICASSP)\, 4516–20. New Orleans\, LA: IEEE\, 20 17. [https://doi.org/10.1109/ICASSP.2017.7953011](https://protect-au.mimec ast.com/s/BrIHCoVz47sr89v8c1arDH?domain=doi.org).\n\nThe paper can also be accessed here: http://users.umiacs.umd.edu/~ramani/pubs/PotterGumerovDura iswami_NUFFT_2017.pdf\n\nFourier analysis plays a natural role in a wide v ariety of applications\, from medical imaging to radio astronomy\, data an alysis and the numerical solution of partial differential equations. When the sampling is uniform and the Fourier transform is desired at equispaced frequencies\, the classical fast Fourier transform (FFT) has played a fun damental role in computation.\n\nHowever\, when the data is irregular in e ither the "physical" or "frequency" domain\, unfortunately\, the FFT does not apply. So Vaughan will show how the NUFFT can be applied in those circ umstances.\n\nLooking forward to seeing you there!\n\nHope & Anchor\, 267 Given Terrace\, Brisbane\, Queensland\, Australia\, 4064 LOCATION:Hope & Anchor\, 267 Given Terrace\, Brisbane\, Queensland\, Austra lia\, 4064 ORGANIZER:mschmidt@fbrice.com.au SEQUENCE:4 SUMMARY:1TJPC - non-uniform fast Fourier transform (NUFFT) URL;VALUE=URI:https://events.vtools.ieee.org/m/312329 X-ALT-DESC:Description: <br /><p>This month\, Vaughan will discuss the chie f citation in the help page for Matlab&rsquo\;s nufft function\, which is: </p>\n<p>Potter\, Samuel F.\, Nail A. Gumerov\, and Ramani Duraiswami. &ld quo\;Fast Interpolation of Bandlimited Functions.&rdquo\; In 2017 IEEE&nbs p\;International Conference on Acoustics\, Speech and Signal Processing (I CASSP)\, 4516&ndash\;20. New Orleans\, LA: IEEE\, 2017.&nbsp\;<a href="htt ps://protect-au.mimecast.com/s/BrIHCoVz47sr89v8c1arDH?domain=doi.org">http s://doi.org/10.1109/ICASSP.2017.7953011</a>.</p>\n<p>The paper can also be accessed here: <a href="http://users.umiacs.umd.edu/~ramani/pubs/PotterGu merovDuraiswami_NUFFT_2017.pdf">http://users.umiacs.umd.edu/~ramani/pubs/P otterGumerovDuraiswami_NUFFT_2017.pdf</a></p>\n<p>Fourier analysis plays a natural role in a wide variety of applications\, from medical imaging to radio astronomy\, data analysis and the numerical solution of partial diff erential equations. When the sampling is uniform and the Fourier transform is desired at equispaced frequencies\, the classical fast Fourier transfo rm (FFT) has played a fundamental role in computation.&nbsp\;</p>\n<p>Howe ver\, when the data is irregular in either the "physical" or "frequency" d omain\, unfortunately\, the FFT does not apply. So Vaughan will show how t he NUFFT can be applied in those circumstances.&nbsp\;</p>\n<p>Looking for ward to seeing you there!</p> END:VEVENT END:VCALENDAR