How to smooth or overlap bins in pyplot.hist2d? - python

I am plotting a 2D histogram to show, for example, the concentration of lightnings (given by their position registered in longitude and latitude). The number of data points is not too large (53) and the result is too coarse. Here is a picture of the result:
For this reason, I am trying to find a way to weight in data from surrounding bins. For example, there is a bin at longitude = 130 and latitude = 34.395 with 0 lightning registered, but with several around it. I would want this bin to reflect somehow the concentration around it. In other words, I want to smooth the data by having overlapping bins (so that a data point can be counted more than once, by different contiguous bins).
I understand that hist2d has the input option for "weights", but this would only work to make a data point more "important" within its bin.
The simplified code is below and I can clarify anything needed.
import numpy as np
import matplotlib.pyplot as plt
# Here are the data, to experiment if needed
longitude = np.array([119.165, 115.828, 110.354, 117.124, 119.16 , 107.068, 108.628, 126.914, 125.685, 116.608, 122.455, 116.278, 123.43, 128.84, 128.603, 130.192, 124.508, 121.916, 133.245, 125.088, 126.641, 127.224, 113.686, 129.376, 127.312, 121.353, 117.834, 125.219, 138.077, 153.299, 135.66 , 128.391, 118.011, 117.313, 119.986, 118.619, 119.178, 120.295, 121.991, 123.519, 135.948, 132.224, 129.317, 135.334, 132.923, 129.828, 139.006, 140.813, 116.207, 139.254, 120.922, 112.171, 143.508])
latitude = np.array([34.381, 34.351, 34.359, 34.357, 34.364, 34.339, 34.351, 34.38, 34.381, 34.366, 34.373, 34.366, 34.369, 34.387, 34.39 , 34.39 , 34.386, 34.371, 34.394, 34.386, 34.384, 34.387, 34.369, 34.4 , 34.396, 34.37 , 34.374, 34.383, 34.403, 34.429, 34.405, 34.385, 34.367, 34.36 , 34.367, 34.364, 34.363, 34.367, 34.367, 34.369, 34.399, 34.396, 34.382, 34.401, 34.396, 34.392, 34.401, 34.401, 34.362, 34.404, 34.382, 34.346, 34.406])
# Number of bins
Nbins = 15
# Plot histogram of the positions
plt.hist2d(longitude,latitude, bins=Nbins)
plt.plot(longitude,latitude,'o',markersize = 8, color = 'k')
plt.plot(longitude,latitude,'o',markersize = 6, color = 'w')
plt.colorbar()
plt.show()

Perhaps you're getting confused with the concept of 2D-histogram, or histogram. Besides the fact a histogram is a bar plot groupping data into plot, it is also a dicretized estimation of a probability funtion. In your case, the presence probability. For this reason, I would not try to overlap histograms.
Moreover, because the histogram is 'discrete', it will be necessarily coarse. Actually, the resolution of a histogram is an important parameter regarding the desired visualization.
Going back to your question, if you want to disminish the coarse effect, you may to simply want to play on Nbins.
Perhaps, other graph type would suit better your usage: see this gallery and the 2D-density plot with shading.

Related

How can I plot only particular values in xarray?

I am using data from cdasws to plot dynamic spectra. I am following the example found here https://cdaweb.gsfc.nasa.gov/WebServices/REST/jupyter/CdasWsExample.html
This is my code which I have modified to obtain a dynamic spectra for STEREO.
from cdasws import CdasWs
from cdasws.datarepresentation import DataRepresentation
import matplotlib.pyplot as plt
cdas = CdasWs()
import numpy as np
datasets = cdas.get_datasets(observatoryGroup='STEREO')
for index, dataset in enumerate(datasets):
print(dataset['Id'], dataset['Label'])
variables = cdas.get_variables('STEREO_LEVEL2_SWAVES')
for variable_1 in variables:
print(variable_1['Name'], variable_1['LongDescription'])
data = cdas.get_data('STEREO_LEVEL2_SWAVES', ['avg_intens_ahead'],
'2020-07-11T02:00:00Z', '2020-07-11T03:00:00Z',
dataRepresentation = DataRepresentation.XARRAY)[1]
print(data)
plt.figure(figsize = (15,7))
# plt.ylim(100,1000)
plt.xticks(fontsize=18)
plt.yticks(fontsize=18)
plt.yscale('log')
sorted_data.transpose().plot()
plt.xlabel("Time",size=18)
plt.ylabel("Frequency (kHz)",size=18)
plt.show()
Using this code gives a plot that looks something like this,
My question is, is there anyway of plotting this spectrum only for a particular frequency? For example, I want to plot just the intensity values at 636 kHz, is there any way I can do that?
Any help is greatly appreciated, I dont understand xarray, I have never worked with it before.
Edit -
Using the command,
data_stereo.avg_intens_ahead.loc[:,625].plot()
generates a plot that looks like,
While this is useful, what I needed is;
for the dynamic spectrum, if i choose a particular frequency like 600khz, can it display something like this (i have just added white boxes to clarify what i mean) -
If you still want the plot to be 2D, but to include a subset of your data along one of the dimensions, you can provide an array of indices or a slice object. For example:
data_stereo.avg_intens_ahead.sel(
frequency=[625]
).plot()
Or
# include a 10% band on either side
data_stereo.avg_intens_ahead.sel(
frequency=slice(625*0.9, 625*1.1)
).plot()
Alternatively, if you would actually like your plot to show white space outside this selected area, you could mask your data with where:
data_stereo.avg_intens_ahead.where(
data_stereo.frequency==625
).plot()

How to make a finer 3D plot with Matplotlib

In Python I have longitude, latitude and height information that I want to plot (3D):
latitudeMeshGrid (100, 100)
longitudeMeshGrid (100, 100)
heightMeshGrid (100, 100)
heightMeshGrid contains 'NaN's for points that are located outside of a specific (long, lat) region (red points in the figure below):
If I try plotting this using:
ax.plot_surface(longitudeMeshGrid, latitudeMeshGrid, heightMeshGrid, cmap=plt.cm.jet, vmin=np.nanmin(heightMeshGrid), vmax=np.nanmax(heightMeshGrid))
I get the following result:
First of all, the colors at the boundaries seem to be incorrect. Secondly, the plot seems rather "coarse" even though I use a fine grid of data. Is there a possibility to reduce the size of the rectangles?
If I remove the NaN data as follows:
longitudeMeshGrid = longitudeMeshGrid[insideBoundary]
latitudeMeshGrid = latitudeMeshGrid[insideBoundary]
heightMeshGrid = heightMeshGrid[insideBoundary]
Then I end up with:
latitudeMeshGrid (7023,)
longitudeMeshGrid (7023,)
heightMeshGrid (7023,)
This I can plot using:
ax.plot_trisurf(longitudeMeshGrid, latitudeMeshGrid, heightMeshGrid, cmap=plt.cm.jet)
With the result:
At least the artifacts at the edges are gone now, but still the plot looks really coarse.
I expect to get something similar as I get in Matlab using:
surf(longitudeMeshGrid, latitudeMeshGrid, heightMeshGrid)
Which ends up as:
which doesn't have any artifacts at the edges and looks much finer/smoother.

How to Convert Color-Code Legends from Logarithmic Scale to Actual Values?

What is the best way to display actual vallues in color-code legend when using logarithmic scale color coding in plotly.figure_factory.create_choropleth?
Here is the sample code:
import plotly.figure_factory as ff
fips = df['fips']
values = np.log10(df['values'])
endpts = list(np.linspace(0, 4, len(colorscale) - 1))
fig = ff.create_choropleth(fips=fips, values=values, scope = ['usa'], binning_endpoints = endpts)
Here is what I have currently:
Here is what I wish to have:
Exactly same as above map except in the legend displaying actual numbers instead of log10(values). For example instead of 0.0-0.5, and 0.5-1.0 (meaning 10^0-to-10^1/2, and 10^1/2-to-10^1) I would like to see: 1-3, 4-10 and so forth.
I am not familiar with Plotly API and since you do not provide a minimal working example, it is hard for me to test, but I am quite confident that you could specify a colormap. If so, then you could just convert the colormap in logarithmic scale while feeding the numbers in liner scale.

How to make the confidence interval (error bands) show on seaborn lineplot

I'm trying to create a plot of classification accuracy for three ML models, depending on the number of features used from the data (the number of features used is from 1 to 75, ranked according to a feature selection method). I did 100 iterations of calculating the accuracy output for each model and for each "# of features used". Below is what my data looks like (clsf from 0 to 2, timepoint from 1 to 75):
data
I am then calling the seaborn function as shown in documentation files.
sns.lineplot(x= "timepoint", y="acc", hue="clsf", data=ttest_df, ci= "sd", err_style = "band")
The plot comes out like this:
plot
I wanted there to be confidence intervals for each point on the x-axis, and don't know why it is not working. I have 100 y values for each x value, so I don't see why it cannot calculate/show it.
You could try your data set using Seaborn's pointplot function instead. It's specifically for showing an indication of uncertainty around a scatter plot of points. By default pointplot will connect values by a line. This is fine if the categorical variable is ordinal in nature, but it can be a good idea to remove the line via linestyles = "" for nominal data. (I used join = False in my example)
I tried to recreate your notebook to give a visual, but wasn't able to get the confidence interval in my plot exactly as you describe. I hope this is helpful for you.
sb.set(style="darkgrid")
sb.pointplot(x = 'timepoint', y = 'acc', hue = 'clsf',
data = ttest_df, ci = 'sd', palette = 'magma',
join = False);

How to remove/omit smaller contour lines using matplotlib

I am trying to plot contour lines of pressure level. I am using a netCDF file which contain the higher resolution data (ranges from 3 km to 27 km). Due to higher resolution data set, I get lot of pressure values which are not required to be plotted (rather I don't mind omitting certain contour line of insignificant values). I have written some plotting script based on the examples given in this link http://matplotlib.org/basemap/users/examples.html.
After plotting the image looks like this
From the image I have encircled the contours which are small and not required to be plotted. Also, I would like to plot all the contour lines smoother as mentioned in the above image. Overall I would like to get the contour image like this:-
Possible solution I think of are
Find out the number of points required for plotting contour and mask/omit those lines if they are small in number.
or
Find the area of the contour (as I want to omit only circled contour) and omit/mask those are smaller.
or
Reduce the resolution (only contour) by increasing the distance to 50 km - 100 km.
I am able to successfully get the points using SO thread Python: find contour lines from matplotlib.pyplot.contour()
But I am not able to implement any of the suggested solution above using those points.
Any solution to implement the above suggested solution is really appreciated.
Edit:-
# Andras Deak
I used print 'diameter is ', diameter line just above del(level.get_paths()[kp]) line to check if the code filters out the required diameter. Here is the filterd messages when I set if diameter < 15000::
diameter is 9099.66295612
diameter is 13264.7838257
diameter is 445.574234531
diameter is 1618.74618114
diameter is 1512.58974168
However the resulting image does not have any effect. All look same as posed image above. I am pretty sure that I have saved the figure (after plotting the wind barbs).
Regarding the solution for reducing the resolution, plt.contour(x[::2,::2],y[::2,::2],mslp[::2,::2]) it works. I have to apply some filter to make the curve smooth.
Full working example code for removing lines:-
Here is the example code for your review
#!/usr/bin/env python
from netCDF4 import Dataset
import matplotlib
matplotlib.use('agg')
import matplotlib.pyplot as plt
import numpy as np
import scipy.ndimage
from mpl_toolkits.basemap import interp
from mpl_toolkits.basemap import Basemap
# Set default map
west_lon = 68
east_lon = 93
south_lat = 7
north_lat = 23
nc = Dataset('ncfile.nc')
# Get this variable for later calucation
temps = nc.variables['T2']
time = 0 # We will take only first interval for this example
# Draw basemap
m = Basemap(projection='merc', llcrnrlat=south_lat, urcrnrlat=north_lat,
llcrnrlon=west_lon, urcrnrlon=east_lon, resolution='l')
m.drawcoastlines()
m.drawcountries(linewidth=1.0)
# This sets the standard grid point structure at full resolution
x, y = m(nc.variables['XLONG'][0], nc.variables['XLAT'][0])
# Set figure margins
width = 10
height = 8
plt.figure(figsize=(width, height))
plt.rc("figure.subplot", left=.001)
plt.rc("figure.subplot", right=.999)
plt.rc("figure.subplot", bottom=.001)
plt.rc("figure.subplot", top=.999)
plt.figure(figsize=(width, height), frameon=False)
# Convert Surface Pressure to Mean Sea Level Pressure
stemps = temps[time] + 6.5 * nc.variables['HGT'][time] / 1000.
mslp = nc.variables['PSFC'][time] * np.exp(9.81 / (287.0 * stemps) * nc.variables['HGT'][time]) * 0.01 + (
6.7 * nc.variables['HGT'][time] / 1000)
# Contour only at 2 hpa interval
level = []
for i in range(mslp.min(), mslp.max(), 1):
if i % 2 == 0:
if i >= 1006 and i <= 1018:
level.append(i)
# Save mslp values to upload to SO thread
# np.savetxt('mslp.txt', mslp, fmt='%.14f', delimiter=',')
P = plt.contour(x, y, mslp, V=2, colors='b', linewidths=2, levels=level)
# Solution suggested by Andras Deak
for level in P.collections:
for kp,path in enumerate(level.get_paths()):
# include test for "smallness" of your choice here:
# I'm using a simple estimation for the diameter based on the
# x and y diameter...
verts = path.vertices # (N,2)-shape array of contour line coordinates
diameter = np.max(verts.max(axis=0) - verts.min(axis=0))
if diameter < 15000: # threshold to be refined for your actual dimensions!
#print 'diameter is ', diameter
del(level.get_paths()[kp]) # no remove() for Path objects:(
#level.remove() # This does not work. produces ValueError: list.remove(x): x not in list
plt.gcf().canvas.draw()
plt.savefig('dummy', bbox_inches='tight')
plt.close()
After the plot is saved I get the same image
You can see that the lines are not removed yet. Here is the link to mslp array which we are trying to play with http://www.mediafire.com/download/7vi0mxqoe0y6pm9/mslp.txt
If you want x and y data which are being used in the above code, I can upload for your review.
Smooth line
You code to remove the smaller circles working perfectly. However the other question I have asked in the original post (smooth line) does not seems to work. I have used your code to slice the array to get minimal values and contoured it. I have used the following code to reduce the array size:-
slice = 15
CS = plt.contour(x[::slice,::slice],y[::slice,::slice],mslp[::slice,::slice], colors='b', linewidths=1, levels=levels)
The result is below.
After searching for few hours I found this SO thread having simmilar issue:-
Regridding regular netcdf data
But none of the solution provided over there works.The questions similar to mine above does not have proper solutions. If this issue is solved then the code is perfect and complete.
General idea
Your question seems to have 2 very different halves: one about omitting small contours, and another one about smoothing the contour lines. The latter is simpler, since I can't really think of anything else other than decreasing the resolution of your contour() call, just like you said.
As for removing a few contour lines, here's a solution which is based on directly removing contour lines individually. You have to loop over the collections of the object returned by contour(), and for each element check each Path, and delete the ones you don't need. Redrawing the figure's canvas will get rid of the unnecessary lines:
# dummy example based on matplotlib.pyplot.clabel example:
import matplotlib
import numpy as np
import matplotlib.cm as cm
import matplotlib.mlab as mlab
import matplotlib.pyplot as plt
delta = 0.025
x = np.arange(-3.0, 3.0, delta)
y = np.arange(-2.0, 2.0, delta)
X, Y = np.meshgrid(x, y)
Z1 = mlab.bivariate_normal(X, Y, 1.0, 1.0, 0.0, 0.0)
Z2 = mlab.bivariate_normal(X, Y, 1.5, 0.5, 1, 1)
# difference of Gaussians
Z = 10.0 * (Z2 - Z1)
plt.figure()
CS = plt.contour(X, Y, Z)
for level in CS.collections:
for kp,path in reversed(list(enumerate(level.get_paths()))):
# go in reversed order due to deletions!
# include test for "smallness" of your choice here:
# I'm using a simple estimation for the diameter based on the
# x and y diameter...
verts = path.vertices # (N,2)-shape array of contour line coordinates
diameter = np.max(verts.max(axis=0) - verts.min(axis=0))
if diameter<1: # threshold to be refined for your actual dimensions!
del(level.get_paths()[kp]) # no remove() for Path objects:(
# this might be necessary on interactive sessions: redraw figure
plt.gcf().canvas.draw()
Here's the original(left) and the removed version(right) for a diameter threshold of 1 (note the little piece of the 0 level at the top):
Note that the top little line is removed while the huge cyan one in the middle doesn't, even though both correspond to the same collections element i.e. the same contour level. If we didn't want to allow this, we could've called CS.collections[k].remove(), which would probably be a much safer way of doing the same thing (but it wouldn't allow us to differentiate between multiple lines corresponding to the same contour level).
To show that fiddling around with the cut-off diameter works as expected, here's the result for a threshold of 2:
All in all it seems quite reasonable.
Your actual case
Since you've added your actual data, here's the application to your case. Note that you can directly generate the levels in a single line using np, which will almost give you the same result. The exact same can be achieved in 2 lines (generating an arange, then selecting those that fall between p1 and p2). Also, since you're setting levels in the call to contour, I believe the V=2 part of the function call has no effect.
import numpy as np
import matplotlib.pyplot as plt
# insert actual data here...
Z = np.loadtxt('mslp.txt',delimiter=',')
X,Y = np.meshgrid(np.linspace(0,300000,Z.shape[1]),np.linspace(0,200000,Z.shape[0]))
p1,p2 = 1006,1018
# this is almost the same as the original, although it will produce
# [p1, p1+2, ...] instead of `[Z.min()+n, Z.min()+n+2, ...]`
levels = np.arange(np.maximum(Z.min(),p1),np.minimum(Z.max(),p2),2)
#control
plt.figure()
CS = plt.contour(X, Y, Z, colors='b', linewidths=2, levels=levels)
#modified
plt.figure()
CS = plt.contour(X, Y, Z, colors='b', linewidths=2, levels=levels)
for level in CS.collections:
for kp,path in reversed(list(enumerate(level.get_paths()))):
# go in reversed order due to deletions!
# include test for "smallness" of your choice here:
# I'm using a simple estimation for the diameter based on the
# x and y diameter...
verts = path.vertices # (N,2)-shape array of contour line coordinates
diameter = np.max(verts.max(axis=0) - verts.min(axis=0))
if diameter<15000: # threshold to be refined for your actual dimensions!
del(level.get_paths()[kp]) # no remove() for Path objects:(
# this might be necessary on interactive sessions: redraw figure
plt.gcf().canvas.draw()
plt.show()
Results, original(left) vs new(right):
Smoothing by resampling
I've decided to tackle the smoothing problem as well. All I could come up with is downsampling your original data, then upsampling again using griddata (interpolation). The downsampling part could also be done with interpolation, although the small-scale variation in your input data might make this problem ill-posed. So here's the crude version:
import scipy.interpolate as interp #the new one
# assume you have X,Y,Z,levels defined as before
# start resampling stuff
dN = 10 # use every dN'th element of the gridded input data
my_slice = [slice(None,None,dN),slice(None,None,dN)]
# downsampled data
X2,Y2,Z2 = X[my_slice],Y[my_slice],Z[my_slice]
# same as X2 = X[::dN,::dN] etc.
# upsampling with griddata over original mesh
Zsmooth = interp.griddata(np.array([X2.ravel(),Y2.ravel()]).T,Z2.ravel(),(X,Y),method='cubic')
# plot
plt.figure()
CS = plt.contour(X, Y, Zsmooth, colors='b', linewidths=2, levels=levels)
You can freely play around with the grids used for interpolation, in this case I just used the original mesh, as it was at hand. You can also play around with different kinds of interpolation: the default 'linear' one will be faster, but less smooth.
Result after downsampling(left) and upsampling(right):
Of course you should still apply the small-line-removal algorithm after this resampling business, and keep in mind that this heavily distorts your input data (since if it wasn't distorted, then it wouldn't be smooth). Also, note that due to the crude method used in the downsampling step, we introduce some missing values near the top/right edges of the region under consideraton. If this is a problem, you should consider doing the downsampling based on griddata as I've noted earlier.
This is a pretty bad solution, but it's the only one that I've come up with. Use the get_contour_verts function in this solution you linked to, possibly with the matplotlib._cntr module so that nothing gets plotted initially. That gives you a list of contour lines, sections, vertices, etc. Then you have to go through that list and pop the contours you don't want. You could do this by calculating a minimum diameter, for example; if the max distance between points is less than some cutoff, throw it out.
That leaves you with a list of LineCollection objects. Now if you make a Figure and Axes instance, you can use Axes.add_collection to add all of the LineCollections in the list.
I checked this out really quick, but it seemed to work. I'll come back with a minimum working example if I get a chance. Hope it helps!
Edit: Here's an MWE of the basic idea. I wasn't familiar with plt._cntr.Cntr, so I ended up using plt.contour to get the initial contour object. As a result, you end up making two figures; you just have to close the first one. You can replace checkDiameter with whatever function works. I think you could turn the line segments into a Polygon and calculate areas, but you'd have to figure that out on your own. Let me know if you run into problems with this code, but it at least works for me.
import numpy as np
import matplotlib as mpl
import matplotlib.pyplot as plt
def checkDiameter(seg, tol=.3):
# Function for screening line segments. NB: Not actually a proper diameter.
diam = (seg[:,0].max() - seg[:,0].min(),
seg[:,1].max() - seg[:,1].min())
return not (diam[0] < tol or diam[1] < tol)
# Create testing data
x = np.linspace(-1,1, 21)
xx, yy = np.meshgrid(x,x)
z = np.exp(-(xx**2 + .5*yy**2))
# Original plot with plt.contour
fig0, ax0 = plt.subplots()
# Make sure this contour object actually has a tiny contour to remove
cntrObj = ax0.contour(xx,yy,z, levels=[.2,.4,.6,.8,.9,.95,.99,.999])
# Primary loop: Copy contours into a new LineCollection
lineNew = list()
for lineOriginal in cntrObj.collections:
# Get properties of the original LineCollection
segments = lineOriginal.get_segments()
propDict = lineOriginal.properties()
propDict = {key: value for (key,value) in propDict.items()
if key in ['linewidth','color','linestyle']} # Whatever parameters you want to carry over
# Filter out the lines with small diameters
segments = [seg for seg in segments if checkDiameter(seg)]
# Create new LineCollection out of the OK segments
if len(segments) > 0:
lineNew.append(mpl.collections.LineCollection(segments, **propDict))
# Make new plot with only these line collections; display results
fig1, ax1 = plt.subplots()
ax1.set_xlim(ax0.get_xlim())
ax1.set_ylim(ax0.get_ylim())
for line in lineNew:
ax1.add_collection(line)
plt.show()
FYI: The bit with propDict is just to automate bringing over some of the line properties from the original plot. You can't use the whole dictionary at once, though. First, it contains the old plot's line segments, but you can just swap those for the new ones. But second, it appears to contain a number of parameters that are in conflict with each other: multiple linewidths, facecolors, etc. The {key for key in propDict if I want key} workaround is my way to bypass that, but I'm sure someone else can do it more cleanly.

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