Embed Size (px)
DESCRIPTION
Time/frequency analysis of some MOST data. F. Baudin (IAS) & J. Matthews (UBC). Just few words about time/frequency analysis. Classical Fourier transform: FT[S(t)]( w )= S(t) e i w t dt Windowed Fourier transform: WFT[S(t)]( w ,t 0 ) = S(t) W(t-t 0 ) e i w t dt - PowerPoint PPT Presentation
Citation preview
Time/frequency analysisof some MOST data
F. Baudin (IAS) & J. Matthews (UBC)
Just few words about time/frequency analysis
• Classical Fourier transform:
FT[S(t)]()= S(t) eit dt
• Windowed Fourier transform:
WFT[S(t)](,t0) = S(t) W(t-t0) eit dt
If W(t) = gaussian => Gabor transformIf W(t,) => wavelet transform
Just a drawing about time/frequency analysis
MOST data
• Equ [roAp]• Oph [red giant]• Boo [Post MS]• Procyon [MS]
Equ : a simple case?
Equ : a simple case?
Equ : a simple case?
Equ : a simple case of beating
Confirmation with simulation: modulation due to beating
Oph : a more interesting case
Oph : a more interesting case
Oph : a more interesting case
Signal + sine wave of constant amplitude => noise estimation
Oph : a more interesting case
Temporal modulation not due to noise: which origin?
[ Boo] Noise : not so interesting but…
[ Boo] Noise : not so interesting but…
Instrumental periodicities (CCD temperature?)
Procyon: variability of the signal?
Procyon: variability of the signal
T < 10 days
T > 10 days
Procyon: variability of the signal
T < 10 days
T > 10 days
Conclusion
Time/Frequency analysis allows :
• variation with time of the (instrumental) noise [ Boo, Procyon]
• simple interpretation (beating) of amplitude modulation [ Equ]
• evidence of temporal variation of modes of unknown origin [ Oph]
[Procyon] Noise : not so interesting but…
