datasets  Reduced datasets¶
Introduction¶
The gammapy.datasets
subpackage contains classes to handle reduced
gammaray data for modeling and fitting.
The Dataset
class bundles reduced data, IRFs and model to perform
likelihood fitting and jointlikelihood fitting.
All datasets contain a Models
container with one or more
SkyModel
objects that represent additive emission
components.
To model and fit data in Gammapy, you have to create a
Datasets
container object with one or multiple
Dataset
objects.
Types of supported datasets¶
Gammapy has builtin support to create and analyse the following datasets:
Dataset Type 
data_type 
reduced irfs 
geometry 
additional quantity 
statistic 
























None 
None 

In general, OnOff
datasets should be used when the
background is estimated from real off counts
(eg: RingBackground
or ReflectedBackground
),
rather than from a background model.
The FluxPointDataset
is used to fit precomputed flux points
when no convolution with IRFs are needed.
The map datasets represent 3D cubes (WcsNDMap
objects) with two
spatial and one energy axis. For 2D images the same map objects and map datasets
are used, an energy axis is present but only has one energy bin.
The spectrum datasets represent 1D spectra (RegionNDMap
objects) with an energy axis. There are no spatial axes or information, the 1D
spectra are obtained for a given on region.
Note that in Gammapy, 2D image analyses are done with 3D cubes with a single energy bin, e.g. for modeling and fitting, see the 2D map analysis tutorial.
To analyse multiple runs, you can either stack the datasets together, or perform a joint fit across multiple datasets.
Predicted counts¶
The total number of predicted counts from a MapDataset
are computed per bin like:
Where \(N_{Bkg}\) is the expected counts from the residual hadronic background model and \(N_{Src}\) the predicted counts from a given source model component. The predicted counts from the hadronic background are computed directly from the model in reconstructed energy and spatial coordinates, while the predicted counts from a source are obtained by forward folding with the instrument response:
Where \(F_{Src}\) is the integrated flux of the source model, \(\mathcal{E}\) the exposure, \(\mathrm{EDISP}\) the energy dispersion matrix and \(\mathrm{PSF}\) the PSF convolution kernel. The corresponding IRFs are extracted at the current position of the model component defined by \((l, b)\) and assumed to be constant across the size of the source. The detailed expressions to compute the predicted number of counts from a source and corresponding IRFs are given in IRF Theory.
Stacking Multiple Datasets¶
Stacking datasets implies that the counts, background and reduced IRFs from all the runs are binned together to get one final dataset for which a likelihood is computed during the fit. Stacking is often useful to reduce the computation effort while analysing multiple runs.
The following table lists how the individual quantities are handled during stacking. Here, \(k\) denotes a bin in reconstructed energy, \(l\) a bin in true energy and \(j\) is the dataset number
Dataset attribute 
Behaviour 
Implementation 


Sum of individual livetimes 
\(\overline{t} = \sum_j t_j\) 

True if the pixel is included in the safe data range. 
\(\overline{\epsilon_k} = \sum_{j} \epsilon_{jk}\) 

Dropped 


Summed in the data range defined by 
\(\overline{\mathrm{counts}_k} = \sum_j \mathrm{counts}_{jk} \cdot \epsilon_{jk}\) 

Summed in the data range defined by 
\(\overline{\mathrm{bkg}_k} = \sum_j \mathrm{bkg}_{jk} \cdot \epsilon_{jk}\) 

Summed in the data range defined by 
\(\overline{\mathrm{exposure}_l} = \sum_{j} \mathrm{exposure}_{jl} \cdot \sum_k \epsilon_{jk}\) 

Exposure weighted average 
\(\overline{\mathrm{psf}_l} = \frac{\sum_{j} \mathrm{psf}_{jl} \cdot \mathrm{exposure}_{jl}} {\sum_{j} \mathrm{exposure}_{jl}}\) 

Exposure weighted average, with mask on reconstructed energy 
\(\overline{\mathrm{edisp}_{kl}} = \frac{\sum_{j}\mathrm{edisp}_{jkl} \cdot \epsilon_{jk} \cdot \mathrm{exposure}_{jl}} {\sum_{j} \mathrm{exposure}_{jl}}\) 

Union of individual 
For the model evaluation, an important factor that needs to be accounted for is
that the energy threshold changes between obseravtions.
With the above implementation using a EDispersionMap
,
the npred
is conserved,
ie, the predicted number of counts on the stacked
dataset is the sum expected by stacking the npred
of the individual runs,
The following plot shows the individual and stacked energy dispersion kernel and npred
for two SpectrumDataset
Note
A stacked analysis is reasonable only when adding runs taken by the same instrument.
Stacking happens inplace, ie,
dataset1.stack(dataset2)
will overwritedataset1
To properly handle masks, it is necessary to stack onto an empty dataset.
Stacking only works for maps with equivalent geometry. Two geometries are called equivalent if one is exactly the same as, or can be obtained from a cutout of, the other.
Joint Analysis¶
An alternative to stacking datasets is a joint fit across all the datasets. For a definition, see Glossary.
The totat fit statistic of datasets is the sum of the fit statistic of each dataset. Note that this is not equal to the stacked fit statistic.
A joint fit usually allows a better modeling of the background because the background model parameters can be fit for each dataset simultaneously with the source models. However, a joint fit is, performance wise, very computationally intensive. The fit convergence time increases nonlinearly with the number of datasets to be fit. Moreover, depending upon the number of parameters in the background model, even fit convergence might be an issue for a large number of datasets.
To strike a balance, what might be a practical solution for analysis of many runs is to stack runs taken under similar conditions and then do a joint fit on the stacked datasets.
Reference/API¶
gammapy.datasets Package¶
Classes¶
Dataset abstract base class. 


Dataset collection. 

Map dataset for onoff likelihood fitting. 



Sample events from a map dataset 

Perform sky model likelihood fit on maps. 



Fit a set of flux points with a parametric model. 
Variables¶
Registry of dataset classes in Gammapy. 