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Adaptation of the LOWL Pipeline for PICARD Medium-l Program. David Salabert Sebastian Jim é nez-Reyes, Pere Pall é Instituto de Astrof í sica de Canarias. Peak-fitting pipelines.
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Adaptation of the LOWL Pipeline for PICARD Medium-l Program David Salabert Sebastian Jiménez-Reyes, Pere Pallé Instituto de Astrofísica de Canarias
Peak-fitting pipelines • Two “production” peak-fitting pipelines: p-mode parameters provided on a routine basis by the GONG (Tucson) and MDI (Stanford) projects. > GONG pipeline: 108-day time series > MDI pipeline: 72-day time series > Modes up l = 200 • + several other peak-fitting pipelines developed (e.g., Korzennik, …) • All those pipelines have their own specifications: > m-components fitted individually or simultaneously / m-averaged tech. > adapted for short or long time series > include or not the leakage matrix > use Lorenztian or asymmetric profiles to describe the mode > …
LOWL/ECHO instruments > LOWL/ECHO: velocity imaging instrument > Spatial resolution (25’’): large range of p-mode degrees observed, optimized for intermediate and low degrees (LOW-L degrees) > LOWL: February 24, 1994 (Mauna Loa, Hawaii) > Network ECHO: Experiment for Coordinated Helioseismic Observations Observatorio del Teide, Tenerife (December 1999) + LOWL (Hawaii) replaced in September 2000 > Shutdown in 2006
LOWL pipeline • Developed by S. Jiménez-Reyes • Written in fortran 90 • Fits the (2l+1) components simultaneously by minimizing a set of a-coefficients (the number of fitted a-coefficients being customizable) • Includes the leakage matrix information: both l-leaks and m-leaks • Possibility to use asymmetric profile
LOWL pipeline • Velocity image determination using the blue and red intensity images • Calibration of the velocity images and analysis of the non-linearities of the instrumental signal • Computation of the time-series for each oscillation mode (n,l,m) by applying a spherical harmonic decomposition to the velocity maps • Spectral analysis of the time-series, • allowing to study the main features • of the acoustic modes
LOWL pipeline • To extract a single (l, m) mode from resolved observations, a spatial filter has to be applied to the velocity images spherical harmonics • BUT, the spherical harmonics are not orthogonalover the observed area (half of the Sun) imperfect isolation of the individual modes (l,m) leads to the existence of other modes in the Fourier spectrum for a givenl,m
LOWL pipeline:Leakage matrix • Fourier transform for a given (l,m) mode (yl,m) is not given by the Fourier transform of a single mode (xl,m), but rather as a sum over several modes as: • with • contribution from eachone of the modes (l’,m’) to a given mode (l,m) • LEAKAGE MATRIX • - 2 types of leakage: • m-leakage: correlation between different m-components with equal l • l-leakage: correlation between different degrees l • Leakage: main source of systematic errors
LOWL pipeline:Fitting procedure • - fit all the multiplets m(2l+1) of a given degree lsimultaneously • fits computationally expensive and complicated • p-mode profile approximated by a Lorentzian profile: • Frequencies n,l,m for each m-component (2l+1) represented by: • wheren,l , the unperturbed central • frequency of the multiplet • Pl(m), Clebsch-Gordon polynomials (Pl(l)=l) • ai(n,l)’s, shift in frequency induced • mainly by the internal rotation. • 9 ai(n,l)’s are fitted
LOWL Pipeline: Fitting procedure Power spectrum of each m-component of a given degree l fitted simultaneously
LOWL Pipeline: Fitting procedure Note the presence of the sidebands at 11.57 Hz : fitted mode multiplets : fitted leaked modes (l 3)
LOWL Pipeline: Fitting procedure Note the presence of the sidebands at 11.57 Hz : fitted mode multiplets : fitted leaked modes (l 3)
Currently adapting this pipeline… > To apply to rebinned 256x256 (“macro-pixel like”) MDI intensity images and to evaluate the mode measurement with the PICARD Medium-l program. > Be ready to provide to the PICARD community p-mode parameters when data become available. > Provide mode frequencies, a-coefficients, amplitudes, lifetimes, … from the PICARD time series on a routine basis.
Low-Frequency Solar p Modes:Observations Obtained from m-Averaged Spectra David Salabert John Leibacher, Thierry Appourchaux, Frank Hill
m-averaged spectrum: average the (2l+1) m-componentsof an oscillation multiplet (n, l) > Rotational and structural effects: degeneracy lift of mode frequency into (2l+1) m-multiplets. > The shifts (a-coefficients) are determined as we are searching for the low-frequency modes. >Several way to find the best estimates of the a-coefficients: - minimum likelihood, - narrowest peak in the m-averaged spectrum, - smallest entropy. > Considerably improves SNR even when the m-components have too low SNR to be measured in the individual-m spectra.
l = 12, n = 4 mode at ~ 1187 μHz m-averaged spectrum technique m-ν diagram m-averaged spectrum Figure-of-merit (a1)
l = 10,n = 5 mode at ~ 1288 μHz l = 12,n = 4 mode at ~ 1187 μHz l = 4,n = 4 mode at ~ 913.5 μHz l = 33,n = 1 mode at ~ 931 μHz
a1 a2 a3 a4 a5 a6 Frequency (ν) ν/ sqrt[l(l+1)] 3960 days of GONG data Six first a-coefficients estimated using the m-averaged spectrum technique of the low-frequency p modes (1 ≤ l ≤ 35)
Mode asymmetries Mode linewidths (FWHMs) Mode amplitudes background level 3960 days of GONG dataFitted mode parameters
2088-day: comparison with other measurement (Korzennik 2005)
MDI 72-day & GONG 108-day time series Example of a m-averaged spectrum with 72 days of MDI observations MDI 72-day time series GONG 108-day time series
Conclusions > New method to measure and fit the low-frequency modes in spatially-resolved data > Lower frequencywhere classic peak-fitting methods fail because low SNR > Better precision of the fitted modes > Rotation/Structure: deeper and better resolution throughout the Sun > Method being extended towards modes with higher degrees and frequencies Development for a parallel “routine” peak-fitting pipeline for the 108-day GONG data
Overall summary • Two separate and distinct peak-fitting pipelines: > pipeline_1: developed for the LOWL data which fits the (2l+1) m-components simultaneously (includes l-leaks and m-leaks) > pipeline_2: m-averaged spectrum technique developed for GONG and MDI data and adapted to measure and fit modes with low SNR where the classic peak-fitting methods fail. • Both pipelines can be applied to the PICARD medium-l data to provide mode parameters.
(Garcia, R.A, et al. 2007) Low-frequency p modes: WHY…? • Lower reflection points in outer part of the Sun less sensitive to turbulence and magnetic fields in the outer layers, where the physics is poorly understood • Longer lifetime frequency and splitting determination more accurate • Modes l ≤ 35: sensitive to structure of solar core and radiative interior • Open questions: • Deep radiative interior and solar core • > rotation (…faster…???) • > structure (density, temperature, chemical composition …) • Turbulence models: Mode damping and excitation mechanisms and physical properties of outer layers • ….
l = 1, m = -1 mode amplitude low-frequency range mode linewidth: α (1/lifetime) Low-frequency p modes: BUT… (Acoustic) p-mode power spectrum (GONG) • Difficult to measure low-frequency modes, because: • Decreasing signal-to-noise ratio (SNR) as frequency decreases > classic methods of peak fitting the individual-m spectra fail • Very long lifetimes, as much as several years • >long-duration, high-quality data available today (GONG, MDI, BiSON, GOLF)
