Einstein@Home: Difference between revisions

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[https://einsteinathome.org/ '''''Einstein@Home'''''] is a '''''[[wikipedia:Volunteer computing|volunteer distributed computing]]''''' project that needs your help to find Neutron Stars via their electromagnetic and gravitational wave emission.

[[File:[email protected]|alt=Einstein@Home Screensaver|thumb|<small>Einstein@Home interactive screensaver showing some known pulsars and the [[wikipedia:Supernova|'''''Supernova''''']] that they came from</small>]]

== Wikipedia page ==

[[wikipedia:Einstein@Home|Einstein@Home]]

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* [https://einsteinathome.org/de/content/gravitational-wave-searches '''''Gravitational Wave search''''']

The gravitational wave emitted by a deformed spinning neutron star is very simple. It is almost perfectly monochromatic. This means that it has a single frequency (twice the rotation frequency of the neutron star). This instantaneous frequency decreases slowly over time as the spinning neutron star loses energy through the emission of gravitational (and, if it is a pulsar, electromagnetic) waves. If one were to observe the gravitational-wave emission while floating in space at rest relative to the rotating deformed neutron star, things would be easy. Finding nearly monochromatic gravitational waves in a noisy detector is straightforward: A simple Fourier analysis would quickly reveal the periodicity. But in reality, the actual search is much more complicated and computationally demanding. One of the main reasons: Our detectors are not at rest relative to the neutron star. They sit on the surface of the Earth, which rotates daily and orbits the Sun once a year: The detectors are moving relative to the neutron star. This causes a Doppler shift in the gravitational-wave frequency observed by the detectors. The strength of the Doppler effect depends on time (during a day and within a year) and on the position of the neutron star in the sky. The plot on the right shows a simulation of a continuous gravitational-wave signal received on Earth. You can observe the annual and daily Doppler effect modulations.[[File:[email protected]|alt=Einstein@Home Screensaver|thumb|<small>Einstein@Home interactive screensaver showing some known pulsars and the [[wikipedia:Supernova|'''''Supernova''''']] that they came from</small>]]To describe a continuous gravitational-wave signal, four different parameters are required: the sky position (two parameters, for example: right ascension and declination), the gravitational-wave frequency (one parameter), and the change of the gravitational-wave frequency over time (one parameter, usually called spin-down). To search for a faint signal in noisy detector data, long stretches of data (covering months of observations) must be analyzed. If the parameters of the signal are unknown, many different possible parameter combinations must be tested: Suppose there's a signal with a certain frequency, spin-down, and position in the sky. This combination of parameters will tell you what the expected signal would look like. Now, check the detector data for the presence of the expected signal using Fourier analysis methods. If nothing is found, try again with a different combination of parameters. Such a search requires a very large number of parameter combinations. This is because, over time, even a tiny offset in one of the parameters would cause the search to potentially miss a signal hidden in the detector noise: Assume a frequency value just a little off from the true one, and the signal will not show up in the analysis. The same holds for offsets in sky position or spin-down. To minimize the chance of missing a hidden signal, the data is very finely combed using a large number of parameter combinations.

The gravitational wave emitted by a deformed spinning neutron star is very simple. It is almost perfectly monochromatic. This means that it has a single frequency (twice the rotation frequency of the neutron star). This instantaneous frequency decreases slowly over time as the spinning neutron star loses energy through the emission of gravitational (and, if it is a pulsar, electromagnetic) waves. If one were to observe the gravitational-wave emission while floating in space at rest relative to the rotating deformed neutron star, things would be easy. Finding nearly monochromatic gravitational waves in a noisy detector is straightforward: A simple Fourier analysis would quickly reveal the periodicity. But in reality, the actual search is much more complicated and computationally demanding. One of the main reasons: Our detectors are not at rest relative to the neutron star. They sit on the surface of the Earth, which rotates daily and orbits the Sun once a year: The detectors are moving relative to the neutron star. This causes a Doppler shift in the gravitational-wave frequency observed by the detectors. The strength of the Doppler effect depends on time (during a day and within a year) and on the position of the neutron star in the sky. The plot on the right shows a simulation of a continuous gravitational-wave signal received on Earth. You can observe the annual and daily Doppler effect modulations.

To describe a continuous gravitational-wave signal, four different parameters are required: the sky position (two parameters, for example: right ascension and declination), the gravitational-wave frequency (one parameter), and the change of the gravitational-wave frequency over time (one parameter, usually called spin-down). To search for a faint signal in noisy detector data, long stretches of data (covering months of observations) must be analyzed. If the parameters of the signal are unknown, many different possible parameter combinations must be tested: Suppose there's a signal with a certain frequency, spin-down, and position in the sky. This combination of parameters will tell you what the expected signal would look like. Now, check the detector data for the presence of the expected signal using Fourier analysis methods. If nothing is found, try again with a different combination of parameters. Such a search requires a very large number of parameter combinations. This is because, over time, even a tiny offset in one of the parameters would cause the search to potentially miss a signal hidden in the detector noise: Assume a frequency value just a little off from the true one, and the signal will not show up in the analysis. The same holds for offsets in sky position or spin-down. To minimize the chance of missing a hidden signal, the data is very finely combed using a large number of parameter combinations.

* [https://einsteinathome.org/de/content/fgrp '''''The Fermi Gamma-ray Pulsar search''''']

Finding the periodic pulsations from gamma-ray pulsars is very difficult – even more so from the very fast millisecond pulsars. On average only 10 photons per day are detected from a typical pulsar by the LAT onboard the Fermi spacecraft. To detect periodicities, years of data must be analyzed, during which the pulsar might rotate tens of billions of times. For each photon one must determine exactly when during a single milliseconds rotation period it was emitted. This requires searching over long data sets with very fine resolution in order not to miss any signals. The computing power required for these “blind searches” – when little to no information about the pulsar is known beforehand – is enormous.

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 [https://einsteinathome.org/ '''''Einstein@Home'''''] is a '''''[[wikipedia:Volunteer computing|volunteer distributed computing]]''''' project that needs your help to find Neutron Stars via their electromagnetic and gravitational wave emission.
+[[File:[email protected]|alt=Einstein@Home Screensaver|thumb|<small>Einstein@Home interactive screensaver showing some known pulsars and the [[wikipedia:Supernova|'''''Supernova''''']] that they came from</small>]]
 == Wikipedia page ==
 [[wikipedia:Einstein@Home|Einstein@Home]]
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 * [https://einsteinathome.org/de/content/gravitational-wave-searches '''''Gravitational Wave search''''']
-The gravitational wave emitted by a deformed spinning neutron star is very simple. It is almost perfectly monochromatic. This means that it has a single frequency (twice the rotation frequency of the neutron star). This instantaneous frequency decreases slowly over time as the spinning neutron star loses energy through the emission of gravitational (and, if it is a pulsar, electromagnetic) waves. If one were to observe the gravitational-wave emission while floating in space at rest relative to the rotating deformed neutron star, things would be easy. Finding nearly monochromatic gravitational waves in a noisy detector is straightforward: A simple Fourier analysis would quickly reveal the periodicity.  But in reality, the actual search is much more complicated and computationally demanding. One of the main reasons: Our detectors are not at rest relative to the neutron star. They sit on the surface of the Earth, which rotates daily and orbits the Sun once a year: The detectors are moving relative to the neutron star. This causes a Doppler shift in the gravitational-wave frequency observed by the detectors. The strength of the Doppler effect depends on time (during a day and within a year) and on the position of the neutron star in the sky. The plot on the right shows a simulation of a continuous gravitational-wave signal received on Earth. You can observe the annual and daily Doppler effect modulations.[[File:[email protected]|alt=Einstein@Home Screensaver|thumb|<small>Einstein@Home interactive screensaver showing some known pulsars and the [[wikipedia:Supernova|'''''Supernova''''']] that they came from</small>]]To describe a continuous gravitational-wave signal, four different parameters are required: the sky position (two parameters, for example: right ascension and declination), the gravitational-wave frequency (one parameter), and the change of the gravitational-wave frequency over time (one parameter, usually called spin-down).  To search for a faint signal in noisy detector data, long stretches of data (covering months of observations) must be analyzed. If the parameters of the signal are unknown, many different possible parameter combinations must be tested: Suppose there's a signal with a certain frequency, spin-down, and position in the sky. This combination of parameters will tell you what the expected signal would look like. Now, check the detector data for the presence of the expected signal using Fourier analysis methods. If nothing is found, try again with a different combination of parameters.  Such a search requires a very large number of parameter combinations. This is because, over time, even a tiny offset in one of the parameters would cause the search to potentially miss a signal hidden in the detector noise: Assume a frequency value just a little off from the true one, and the signal will not show up in the analysis. The same holds for offsets in sky position or spin-down. To minimize the chance of missing a hidden signal, the data is very finely combed using a large number of parameter combinations.
+The gravitational wave emitted by a deformed spinning neutron star is very simple. It is almost perfectly monochromatic. This means that it has a single frequency (twice the rotation frequency of the neutron star). This instantaneous frequency decreases slowly over time as the spinning neutron star loses energy through the emission of gravitational (and, if it is a pulsar, electromagnetic) waves. If one were to observe the gravitational-wave emission while floating in space at rest relative to the rotating deformed neutron star, things would be easy. Finding nearly monochromatic gravitational waves in a noisy detector is straightforward: A simple Fourier analysis would quickly reveal the periodicity.  But in reality, the actual search is much more complicated and computationally demanding. One of the main reasons: Our detectors are not at rest relative to the neutron star. They sit on the surface of the Earth, which rotates daily and orbits the Sun once a year: The detectors are moving relative to the neutron star. This causes a Doppler shift in the gravitational-wave frequency observed by the detectors. The strength of the Doppler effect depends on time (during a day and within a year) and on the position of the neutron star in the sky. The plot on the right shows a simulation of a continuous gravitational-wave signal received on Earth. You can observe the annual and daily Doppler effect modulations.
+To describe a continuous gravitational-wave signal, four different parameters are required: the sky position (two parameters, for example: right ascension and declination), the gravitational-wave frequency (one parameter), and the change of the gravitational-wave frequency over time (one parameter, usually called spin-down).  To search for a faint signal in noisy detector data, long stretches of data (covering months of observations) must be analyzed. If the parameters of the signal are unknown, many different possible parameter combinations must be tested: Suppose there's a signal with a certain frequency, spin-down, and position in the sky. This combination of parameters will tell you what the expected signal would look like. Now, check the detector data for the presence of the expected signal using Fourier analysis methods. If nothing is found, try again with a different combination of parameters.  Such a search requires a very large number of parameter combinations. This is because, over time, even a tiny offset in one of the parameters would cause the search to potentially miss a signal hidden in the detector noise: Assume a frequency value just a little off from the true one, and the signal will not show up in the analysis. The same holds for offsets in sky position or spin-down. To minimize the chance of missing a hidden signal, the data is very finely combed using a large number of parameter combinations.
 * [https://einsteinathome.org/de/content/fgrp '''''The Fermi Gamma-ray Pulsar search''''']
 Finding the periodic pulsations from gamma-ray pulsars is very difficult – even more so from the very fast millisecond pulsars. On average only 10 photons per day are detected from a typical pulsar by the LAT onboard the Fermi spacecraft. To detect periodicities, years of data must be analyzed, during which the pulsar might rotate tens of billions of times. For each photon one must determine exactly when during a single milliseconds rotation period it was emitted. This requires searching over long data sets with very fine resolution in order not to miss any signals. The computing power required for these “blind searches” – when little to no information about the pulsar is known beforehand – is enormous.