Loading...

Searching...

No Matches

vo005_Combinations.py File Reference

## Namespaces | |

namespace | vo005_Combinations |

In this tutorial we learn how combinations of RVecs can be build.

import ROOT

# RVec can be sorted in Python with the inbuilt sorting function because

# PyROOT implements a Python iterator

v1 = RVec("double")(3)

v1[0], v1[1], v1[2] = 1, 2, 3

v2 = RVec("double")(2)

v2[0], v2[1] = -4, -5

# To get the indices, which result in all combinations, you can call the

# following helper.

# Note that you can also pass the size of the vectors directly.

idx = Combinations(v1, v2)

# Next, the respective elements can be taken via the computed indices.

c1 = Take(v1, idx[0])

c2 = Take(v2, idx[1])

# Finally, you can perform any set of operations conveniently.

v3 = c1 * c2

print("Combinations of {} and {}:".format(v1, v2))

for i in range(len(v3)):

print("{} * {} = {}".format(c1[i], c2[i], v3[i]))

print

# However, if you want to compute operations on unique combinations of a

# single RVec, you can perform this as follows.

# Get the indices of unique triples for the given vector.

v4 = RVec("double")(4)

v4[0], v4[1], v4[2], v4[3] = 1, 2, 3, 4

idx2 = Combinations(v4, 3)

# Take the elements and compute any operation on the returned collections.

c3 = Take(v4, idx2[0])

c4 = Take(v4, idx2[1])

c5 = Take(v4, idx2[2])

v5 = c3 * c4 * c5

print("Unique triples of {}:".format(v4))

for i in range(len(v5)):

print("{} * {} * {} = {}".format(c3[i], c4[i], c5[i], v5[i]))

- Date
- August 2018

Definition in file vo005_Combinations.py.