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from functools import reduce
from math import pi
import math
def merge_intervals(intervals):
sorted_by_lower_bound = sorted(intervals, key=lambda tup: tup[0])
merged = []
for higher in sorted_by_lower_bound:
if not merged:
merged.append(higher)
else:
lower = merged[-1]
# test for intersection between lower and higher:
# we know via sorting that lower[0] <= higher[0]
if higher[0] <= lower[1]:
upper_bound = max(lower[1], higher[1])
merged[-1] = (lower[0], upper_bound) # replace by merged interval
else:
merged.append(higher)
return merged
def clean_intervals(intervals):
return list(filter(lambda i : i[0]!=i[1],intervals))
def canonicalize_angle_interval(i):
a=i[0] % (2*pi)
b=i[1] % (2*pi)
if a <= b:
return [(a,b)]
else:
return [(0,b),(a,2*pi)]
def invert_angle_intervals(intervals):
flattened = reduce(lambda a,b:a+b, (map(lambda a: [a[0],a[1]], intervals)))
return clean_intervals(list(zip([0]+flattened, flattened+[2*pi]))[::2])
def find_largest_angle_interval(intervals):
if (intervals[0][0]==0 and intervals[-1][1]==2*pi):
# these two intervals actually are one.
intervals_ = intervals[1:-1] + [(intervals[-1][0], intervals[0][1]+2*pi)]
else:
intervals_ = intervals
return max(intervals_, key=lambda p:p[1]-p[0])
def get_point_angle(origin, p):
dx = p[0] - origin[0]
dy = p[1] - origin[1]
return math.atan2(dy,dx)
def check_point_in_interval(origin, p, interval):
ang = get_point_angle(origin, p)
print(interval)
print(canonicalize_angle_interval(interval))
if ang >= interval[0] and ang <= interval[1]:
return True
else:
return False
def get_cells_in_interval(origin, interval, cells):
return list(filter(lambda x: check_point_in_interval(origin, x.pos, interval), cells))
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