.. only:: html
.. note::
:class: sphx-glr-download-link-note
Click :ref:`here ` to download the full example code
.. rst-class:: sphx-glr-example-title
.. _sphx_glr_modeling_gallery_spatial_plot_gauss.py:
.. _gaussian-spatial-model:
Gaussian Spatial Model
======================
This is a spatial model parametrising a Gaussian function.
By default, the Gaussian is symmetric:
.. math::
\phi(\text{lon}, \text{lat}) = N \times \exp\left\{-\frac{1}{2}
\frac{1-\cos \theta}{1-\cos \sigma}\right\}\,,
where :math:`\theta` is the sky separation to the model center. In this case, the
Gaussian is normalized to 1 on the sphere:
.. math::
N = \frac{1}{4\pi a\left[1-\exp(-1/a)\right]}\,,\,\,\,\,
a = 1-\cos \sigma\,.
In the limit of small :math:`\theta` and :math:`\sigma`, this definition
reduces to the usual form:
.. math::
\phi(\text{lon}, \text{lat}) = \frac{1}{2\pi\sigma^2} \exp{\left(-\frac{1}{2}
\frac{\theta^2}{\sigma^2}\right)}\,.
In case an eccentricity (:math:`e`) and rotation angle (:math:`\phi`) are passed,
then the model is an elongated Gaussian, whose evaluation is performed as in the symmetric case
but using the effective radius of the Gaussian:
.. math::
\sigma_{eff}(\text{lon}, \text{lat}) = \sqrt{
(\sigma_M \sin(\Delta \phi))^2 +
(\sigma_m \cos(\Delta \phi))^2
}.
Here, :math:`\sigma_M` (:math:`\sigma_m`) is the major (minor) semiaxis of the Gaussian, and
:math:`\Delta \phi` is the difference between `phi`, the position angle of the Gaussian, and the
position angle of the evaluation point.
**Caveat:** For the asymmetric Gaussian, the model is normalized to 1 on the plane, i.e. in small angle
approximation: :math:`N = 1/(2 \pi \sigma_M \sigma_m)`. This means that for huge elongated Gaussians on the sky
this model is not correctly normalized. However, this approximation is perfectly acceptable for the more
common case of models with modest dimensions: indeed, the error introduced by normalizing on the plane
rather than on the sphere is below 0.1\% for Gaussians with radii smaller than ~ 5 deg.
Example plot
------------
Here is an example plot of the model:
.. code-block:: default
import numpy as np
from astropy.coordinates import Angle
from gammapy.maps import WcsGeom
from gammapy.modeling.models import (
GaussianSpatialModel,
Models,
PowerLawSpectralModel,
SkyModel,
)
phi = Angle("30 deg")
model = GaussianSpatialModel(
lon_0="2 deg", lat_0="2 deg", sigma="1 deg", e=0.7, phi=phi, frame="galactic",
)
geom = WcsGeom.create(
skydir=model.position, frame=model.frame, width=(4, 4), binsz=0.02
)
ax = model.plot(geom=geom, add_cbar=True)
# illustrate size parameter
region = model.to_region().to_pixel(ax.wcs)
artist = region.as_artist(facecolor="none", edgecolor="red")
ax.add_artist(artist)
transform = ax.get_transform("galactic")
ax.scatter(2, 2, transform=transform, s=20, edgecolor="red", facecolor="red")
ax.text(1.5, 1.85, r"$(l_0, b_0)$", transform=transform, ha="center")
ax.plot([2, 2 + np.sin(phi)], [2, 2 + np.cos(phi)], color="r", transform=transform)
ax.vlines(x=2, color="r", linestyle="--", transform=transform, ymin=-5, ymax=5)
ax.text(2.25, 2.45, r"$\phi$", transform=transform)
.. image:: /modeling/gallery/spatial/images/sphx_glr_plot_gauss_001.png
:class: sphx-glr-single-img
YAML representation
-------------------
Here is an example YAML file using the model:
.. code-block:: default
pwl = PowerLawSpectralModel()
gauss = GaussianSpatialModel()
model = SkyModel(spectral_model=pwl, spatial_model=gauss, name="pwl-gauss-model")
models = Models([model])
print(models.to_yaml())
.. rst-class:: sphx-glr-script-out
Out:
.. code-block:: none
components:
- name: pwl-gauss-model
type: SkyModel
spectral:
type: PowerLawSpectralModel
parameters:
- {name: index, value: 2.0, unit: '', min: .nan, max: .nan, frozen: false,
error: 0}
- {name: amplitude, value: 1.0e-12, unit: cm-2 s-1 TeV-1, min: .nan, max: .nan,
frozen: false, error: 0}
- {name: reference, value: 1.0, unit: TeV, min: .nan, max: .nan, frozen: true,
error: 0}
spatial:
type: GaussianSpatialModel
frame: icrs
parameters:
- {name: lon_0, value: 0.0, unit: deg, min: .nan, max: .nan, frozen: false,
error: 0}
- {name: lat_0, value: 0.0, unit: deg, min: -90.0, max: 90.0, frozen: false,
error: 0}
- {name: sigma, value: 1.0, unit: deg, min: 0.0, max: .nan, frozen: false,
error: 0}
- {name: e, value: 0.0, unit: '', min: 0.0, max: 1.0, frozen: true, error: 0}
- {name: phi, value: 0.0, unit: deg, min: .nan, max: .nan, frozen: true, error: 0}
.. _sphx_glr_download_modeling_gallery_spatial_plot_gauss.py:
.. only :: html
.. container:: sphx-glr-footer
:class: sphx-glr-footer-example
.. container:: sphx-glr-download sphx-glr-download-python
:download:`Download Python source code: plot_gauss.py `
.. container:: sphx-glr-download sphx-glr-download-jupyter
:download:`Download Jupyter notebook: plot_gauss.ipynb `
.. only:: html
.. rst-class:: sphx-glr-signature
`Gallery generated by Sphinx-Gallery `_