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BEGIN:VEVENT
DTSTAMP:20240619T064850Z
UID:5252A536-D79E-44B0-A092-49C1E1AD0EF9
DTSTART;TZID=Europe/Zurich:20240611T140000
DTEND;TZID=Europe/Zurich:20240611T150000
DESCRIPTION:Traditionally\, transitioning from the time domain to the frequ
 ency domain involves Fourier transforms. After computations are performed 
 in the frequency domain\, inverse Fourier transform allows us to return to
  the time domain. However\, these operations are most effective for linear
  behaviors and problems where phase evolution occurs slowly enough. Parsev
 al's relation establishes a direct connection between these two domains. L
 everaging Laplace's transform\, which accommodates functions defined on fi
 nite domains\, along with Parseval's relation applied to local time functi
 ons\, enables simultaneous work in both domains. This approach facilitates
  solving nonlinear problems using frequency representation across various 
 time subdomains. We provide an illustration of this technique.\n\nCo-spons
 ored by: EMC Lab EPFL\n\nSpeaker(s): Dr. Olivier Maurice\, \n\nRoom: 116\,
  Bldg: ELG 116\, EPFL\, Lausanne\, Switzerland\, Switzerland\, 1015
LOCATION:Room: 116\, Bldg: ELG 116\, EPFL\, Lausanne\, Switzerland\, Switze
 rland\, 1015
ORGANIZER:Mohammad.azadifar@epfl.ch
SEQUENCE:12
SUMMARY:Why Should we Choose between Time and Frequency?
URL;VALUE=URI:https://events.vtools.ieee.org/m/422169
X-ALT-DESC:Description: <br /><p class="MsoNormal">Traditionally\, transiti
 oning from the time domain to the frequency domain involves Fourier transf
 orms. After computations are performed in the frequency domain\, inverse F
 ourier transform allows us to return to the time domain. However\, these o
 perations are most effective for linear behaviors and problems where phase
  evolution occurs slowly enough. Parseval's relation establishes a direct 
 connection between these two domains. Leveraging Laplace's transform\, whi
 ch accommodates functions defined on finite domains\, along with Parseval'
 s relation applied to local time functions\, enables simultaneous work in 
 both domains. This approach facilitates solving nonlinear problems using f
 requency representation across various time subdomains. We provide an illu
 stration of this technique.</p>
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