Python Programmable Filter
ParaView3's python programmable filter.
The python programmable filter is a general purpose filter that the end user can program within the paraview GUI to manipulate datasets as needed. To use the filter, turn the PARAVIEW_ENABLE_PYTHON cmake option on. This causes the make process to wrap paraview's classes into python callable format.
The filter is a wrapper around VTK's vtkProgrammableFilter class and adds to it:
- a string containing the user's script for the filter to execute
- an instance of the python interpreter with the wrapped paraview libraries imported
- the ability to easily change the output dataset type.
When the user selects Programmable Filter from the Filters menu, an empty programmable filter is created. The default behavior of the empty script is create a dataset if the same type as its input and to copy through the input dataset's structure. The GUI provides a selection menu where the user can choose from the five primary VTK dataset types for the output. The GUI also provides a text entry area where the user can type, edit or paste in a python script.
The following figure shows a python script that modifies the geometry of its input dataset.
This result is produced by the following python script set as the Script
from paraview import vtk pdi = self.GetPolyDataInput() pdo = self.GetPolyDataOutput() newPoints = vtk.vtkPoints() numPoints = pdi.GetNumberOfPoints() for i in range(0, numPoints): coord = pdi.GetPoint(i) x, y, z = coord[:3] x = x * 1 y = y * 1 z = 1 + z*0.3 newPoints.InsertPoint(i, x, y, z) pdo.SetPoints(newPoints)
from paraview import vtk #this example creates an Nx1x1 imagedata output #and populates its cells with the point centered #scalars of the input dataset #get a hold of the input pdi = self.GetInput() numPts = pdi.GetNumberOfPoints() #create the output dataset with one cell per point ido = self.GetOutput() ido.SetDimensions(numPts+1,2,2) ido.SetOrigin(-1,-1,-1) ido.SetSpacing(.1,.1,.1) ido.SetWholeExtent(0,numPts,0,1,0,1) ido.AllocateScalars() #choose an input point data array to copy ivals = pdi.GetPointData().GetScalars() ca = vtk.vtkFloatArray() ca.SetName(ivals.GetName()) ca.SetNumberOfComponents(1) ca.SetNumberOfTuples(numPts) #add the new array to the output ido.GetCellData().AddArray(ca) #copy the values over element by element for i in range(0, numPts): ca.SetValue(i, ivals.GetValue(i))
#This script generates a helix curve. #This is intended as the script of a 'Programmable Source' import math numPts = 80.0 # Points along Helix length = 8.0 # Length of Helix rounds = 3.0 # Number of times around #Get a paraview.vtk.PolyData object for the output pdo = self.GetPolyDataOutput() #This will store the points for the Helix newPts = paraview.vtkPoints() for i in range(0, numPts): #Generate the Points along the Helix x = i*length/numPts y = math.sin(i*rounds*2*math.pi/numPts) z = math.cos(i*rounds*2*math.pi/numPts) #Insert the Points into the vtkPoints object #The first parameter indicates the reference. #value for the point. Here we add them sequentially. #Note that the first point is at index 0 (not 1). newPts.InsertPoint(i, x,y,z) #Add the points to the vtkPolyData object #Right now the points are not associated with a line - #it is just a set of unconnected points. We need to #create a 'cell' object that ties points together #to make a curve (in this case). This is done below. #A 'cell' is just an object that tells how points are #connected to make a 1D, 2D, or 3D object. pdo.SetPoints(newPts) #Make a vtkPolyLine which holds the info necessary #to create a curve composed of line segments. This #really just hold constructor data that will be passed #to vtkPolyData to add a new line. aPolyLine = paraview.vtkPolyLine() #Indicate the number of points along the line aPolyLine.GetPointIds().SetNumberOfIds(numPts) for i in range(0,numPts): #Add the points to the line. The first value indicates #the order of the point on the line. The second value #is a reference to a point in a vtkPoints object. Depends #on the order that Points were added to vtkPoints object. #Note that this will not be associated with actual points #until it is added to a vtkPolyData object which holds a #vtkPoints object. aPolyLine.GetPointIds().SetId(i, i) #Allocate the number of 'cells' that will be added. We are just #adding one vtkPolyLine 'cell' to the vtkPolyData object. pdo.Allocate(1, 1) #Add the poly line 'cell' to the vtkPolyData object. pdo.InsertNextCell(aPolyLine.GetCellType(), aPolyLine.GetPointIds()) #The Helix is ready to plot! Click 'Apply'.
An example that draws a double helix with connecting lines (like DNA). Provides an example of using multiple drawing objects 'cells' in the same vtkPolyData output object. The 'Output Data Set Type' should be set of 'vtkPolyData'.
#This script generates a helix double. #This is intended as the script of a 'Programmable Source' import math numPts = 80.0 # Points along each Helix length = 8.0 # Length of each Helix rounds = 3.0 # Number of times around phase_shift = math.pi/1.5 # Phase shift between Helixes #Get a paraview.vtk.PolyData object for the output pdo = self.GetPolyDataOutput() #This will store the points for the Helix newPts = paraview.vtkPoints() for i in range(0, numPts): #Generate Points for first Helix x = i*length/numPts y = math.sin(i*rounds*2*math.pi/numPts) z = math.cos(i*rounds*2*math.pi/numPts) newPts.InsertPoint(i, x,y,z) #Generate Points for second Helix. Add a phase offset to y and z. y = math.sin(i*rounds*2*math.pi/numPts+phase_shift) z = math.cos(i*rounds*2*math.pi/numPts+phase_shift) #Offset Helix 2 pts by 'numPts' to keep separate from Helix 1 Pts newPts.InsertPoint(i+numPts, x,y,z) #Add the points to the vtkPolyData object pdo.SetPoints(newPts) #Make two vtkPolyLine objects to hold curve construction data aPolyLine1 = paraview.vtkPolyLine() aPolyLine2 = paraview.vtkPolyLine() #Indicate the number of points along the line aPolyLine1.GetPointIds().SetNumberOfIds(numPts) aPolyLine2.GetPointIds().SetNumberOfIds(numPts) for i in range(0,numPts): #First Helix - use the first set of points aPolyLine1.GetPointIds().SetId(i, i) #Second Helix - use the second set of points #(Offset the point reference by 'numPts'). aPolyLine2.GetPointIds().SetId(i,i+numPts) #Allocate the number of 'cells' that will be added. #Two 'cells' for the Helix curves, and one 'cell' #for every 3rd point along the Helixes. links = range(0,numPts,3) pdo.Allocate(2+len(links), 1) #Add the poly line 'cell' to the vtkPolyData object. pdo.InsertNextCell(aPolyLine1.GetCellType(), aPolyLine1.GetPointIds()) pdo.InsertNextCell(aPolyLine2.GetCellType(), aPolyLine2.GetPointIds()) for i in links: #Add a line connecting the two Helixes. aLine = paraview.vtkLine() aLine.GetPointIds().SetId(0, i) aLine.GetPointIds().SetId(1, i+numPts) pdo.InsertNextCell(aLine.GetCellType(), aLine.GetPointIds())
Paraview is built from VTK, and the python bindings for Paraview mirror the python bindings for VTK although the package names seem to be different. For example, there is a vtk.vtkLine in VTK which seems to behave the same as paraview.vtkLine in Paraview. While the online documentation for Paraview seems to be pretty limited, there is more extensive documentation with examples on the VTK documentation site. Examples are organized by class name and often include Python examples along with c++ and TCL examples:
The examples list is a little hard to navigate. Perhaps an easier way to find examples is to go to the class list, look up the class you are interested in, and click on the class name which brings up the documentation for that class. Many of the class pages include an 'examples' section that links to code examples for the class. From the examples page you can choose the 'Python' example associated with the particular class (not every class has a Python example). The VTK class index can be found here:
NOTE: You may not be able to directly copy the examples from the VTK documentation because the package names may not match Paraview package names, but with a little modification I have been able to get examples from VTK to work in Paraview.