import sys
import os
sys.path.append(os.path.abspath('..'))
import libpysal
libpysal.examples.available()
['georgia', '__pycache__', 'tests', 'newHaven', 'Polygon_Holes', 'nat', 'Polygon', '10740', 'berlin', 'rio_grande_do_sul', 'sids2', 'sacramento2', 'burkitt', 'arcgis', 'calemp', 'stl', 'virginia', 'geodanet', 'desmith', 'book', 'nyc_bikes', 'Line', 'south', 'snow_maps', 'Point', 'street_net_pts', 'guerry', '__pycache__', 'baltim', 'networks', 'us_income', 'taz', 'columbus', 'tokyo', 'mexico', '__pycache__', 'chicago', 'wmat', 'juvenile', 'clearwater']
libpysal.examples.explain('mexico')
{'name': 'mexico', 'description': 'Decennial per capita incomes of Mexican states 1940-2000', 'explanation': ['* mexico.csv: attribute data. (n=32, k=13)', '* mexico.gal: spatial weights in GAL format.', '* mexicojoin.shp: Polygon shapefile. (n=32)', 'Data used in Rey, S.J. and M.L. Sastre Gutierrez. (2010) "Interregional inequality dynamics in Mexico." Spatial Economic Analysis, 5: 277-298.']}
import geopandas
pth = libpysal.examples.get_path("mexicojoin.shp")
gdf = geopandas.read_file(pth)
from libpysal.weights import Queen, Rook, KNN
%matplotlib inline
import matplotlib.pyplot as plt
ax = gdf.plot()
ax.set_axis_off()
The first set of spatial weights we illustrate use notions of contiguity to define neighboring observations. Rook neighbors are those states that share an edge on their respective borders:
w_rook = Rook.from_dataframe(gdf)
w_rook.n
32
w_rook.pct_nonzero
12.6953125
ax = gdf.plot(edgecolor='grey', facecolor='w')
f,ax = w_rook.plot(gdf, ax=ax,
edge_kws=dict(color='r', linestyle=':', linewidth=1),
node_kws=dict(marker=''))
ax.set_axis_off()
gdf.head()
POLY_ID | AREA | CODE | NAME | PERIMETER | ACRES | HECTARES | PCGDP1940 | PCGDP1950 | PCGDP1960 | ... | GR9000 | LPCGDP40 | LPCGDP50 | LPCGDP60 | LPCGDP70 | LPCGDP80 | LPCGDP90 | LPCGDP00 | TEST | geometry | |
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
0 | 1 | 7.252751e+10 | MX02 | Baja California Norte | 2040312.385 | 1.792187e+07 | 7252751.376 | 22361.0 | 20977.0 | 17865.0 | ... | 0.05 | 4.35 | 4.32 | 4.25 | 4.40 | 4.47 | 4.43 | 4.48 | 1.0 | (POLYGON ((-113.1397171020508 29.0177764892578... |
1 | 2 | 7.225988e+10 | MX03 | Baja California Sur | 2912880.772 | 1.785573e+07 | 7225987.769 | 9573.0 | 16013.0 | 16707.0 | ... | 0.00 | 3.98 | 4.20 | 4.22 | 4.39 | 4.46 | 4.41 | 4.42 | 2.0 | (POLYGON ((-111.2061233520508 25.8027763366699... |
2 | 3 | 2.731957e+10 | MX18 | Nayarit | 1034770.341 | 6.750785e+06 | 2731956.859 | 4836.0 | 7515.0 | 7621.0 | ... | -0.05 | 3.68 | 3.88 | 3.88 | 4.04 | 4.13 | 4.11 | 4.06 | 3.0 | (POLYGON ((-106.6210784912109 21.5653114318847... |
3 | 4 | 7.961008e+10 | MX14 | Jalisco | 2324727.436 | 1.967200e+07 | 7961008.285 | 5309.0 | 8232.0 | 9953.0 | ... | 0.03 | 3.73 | 3.92 | 4.00 | 4.21 | 4.32 | 4.30 | 4.33 | 4.0 | POLYGON ((-101.52490234375 21.85663986206055, ... |
4 | 5 | 5.467030e+09 | MX01 | Aguascalientes | 313895.530 | 1.350927e+06 | 546702.985 | 10384.0 | 6234.0 | 8714.0 | ... | 0.13 | 4.02 | 3.79 | 3.94 | 4.21 | 4.32 | 4.32 | 4.44 | 5.0 | POLYGON ((-101.8461990356445 22.01176071166992... |
5 rows × 35 columns
w_rook.neighbors[0] # the first location has two neighbors at locations 1 and 22
[1, 22]
gdf['NAME'][[0, 1,22]]
0 Baja California Norte 1 Baja California Sur 22 Sonora Name: NAME, dtype: object
So, Baja California Norte has 2 rook neighbors: Baja California Sur and Sonora.
Queen neighbors are based on a more inclusive condition that requires only a shared vertex between two states:
w_queen = Queen.from_dataframe(gdf)
w_queen.n == w_rook.n
True
(w_queen.pct_nonzero > w_rook.pct_nonzero) == (w_queen.n == w_rook.n)
True
ax = gdf.plot(edgecolor='grey', facecolor='w')
f,ax = w_queen.plot(gdf, ax=ax,
edge_kws=dict(color='r', linestyle=':', linewidth=1),
node_kws=dict(marker=''))
ax.set_axis_off()
w_queen.histogram
[(1, 1), (2, 6), (3, 6), (4, 6), (5, 5), (6, 2), (7, 3), (8, 2), (9, 1)]
w_rook.histogram
[(1, 1), (2, 6), (3, 7), (4, 7), (5, 3), (6, 4), (7, 3), (8, 1)]
c9 = [idx for idx,c in w_queen.cardinalities.items() if c==9]
gdf['NAME'][c9]
28 San Luis Potosi Name: NAME, dtype: object
w_rook.neighbors[28]
[5, 6, 7, 27, 29, 30, 31]
w_queen.neighbors[28]
[3, 5, 6, 7, 24, 27, 29, 30, 31]
import numpy as np
f,ax = plt.subplots(1,2,figsize=(10, 6), subplot_kw=dict(aspect='equal'))
gdf.plot(edgecolor='grey', facecolor='w', ax=ax[0])
w_rook.plot(gdf, ax=ax[0],
edge_kws=dict(color='r', linestyle=':', linewidth=1),
node_kws=dict(marker=''))
ax[0].set_title('Rook')
ax[0].axis(np.asarray([-105.0, -95.0, 21, 26]))
ax[0].axis('off')
gdf.plot(edgecolor='grey', facecolor='w', ax=ax[1])
w_queen.plot(gdf, ax=ax[1],
edge_kws=dict(color='r', linestyle=':', linewidth=1),
node_kws=dict(marker=''))
ax[1].set_title('Queen')
ax[1].axis('off')
ax[1].axis(np.asarray([-105.0, -95.0, 21, 26]))
array([-105., -95., 21., 26.])
w_knn = KNN.from_dataframe(gdf, k=4)
w_knn.histogram
[(4, 32)]
ax = gdf.plot(edgecolor='grey', facecolor='w')
f,ax = w_knn.plot(gdf, ax=ax,
edge_kws=dict(color='r', linestyle=':', linewidth=1),
node_kws=dict(marker=''))
ax.set_axis_off()
pth = libpysal.examples.get_path("mexicojoin.shp")
from libpysal.weights import Queen, Rook, KNN
w_queen = Queen.from_shapefile(pth)
w_rook = Rook.from_shapefile(pth)
w_knn1 = KNN.from_shapefile(pth)
/home/serge/Dropbox/p/pysal/src/subpackages/libpysal/libpysal/weights/weights.py:170: UserWarning: The weights matrix is not fully connected. There are 2 components warnings.warn("The weights matrix is not fully connected. There are %d components" % self.n_components)
The warning alerts us to the fact that using a first nearest neighbor criterion to define the neighbors results in a connectivity graph that has more than a single component. In this particular case there are 2 components which can be seen in the following plot:
ax = gdf.plot(edgecolor='grey', facecolor='w')
f,ax = w_knn1.plot(gdf, ax=ax,
edge_kws=dict(color='r', linestyle=':', linewidth=1),
node_kws=dict(marker=''))
ax.set_axis_off()
The two components are separated in the southern part of the country, with the smaller component to the east and the larger component running through the rest of the country to the west. For certain types of spatial analytical methods, it is necessary to have a adjacency structure that consists of a single component. To ensure this for the case of Mexican states, we can increase the number of nearest neighbors to three:
w_knn3 = KNN.from_shapefile(pth,k=3)
ax = gdf.plot(edgecolor='grey', facecolor='w')
f,ax = w_knn3.plot(gdf, ax=ax,
edge_kws=dict(color='r', linestyle=':', linewidth=1),
node_kws=dict(marker=''))
ax.set_axis_off()
from libpysal.weights import lat2W
w = lat2W(4,3)
w.n
12
w.pct_nonzero
23.61111111111111
w.neighbors
{0: [3, 1], 3: [0, 6, 4], 1: [0, 4, 2], 4: [1, 3, 7, 5], 2: [1, 5], 5: [2, 4, 8], 6: [3, 9, 7], 7: [4, 6, 10, 8], 8: [5, 7, 11], 9: [6, 10], 10: [7, 9, 11], 11: [8, 10]}
rs = libpysal.examples.get_path('map_RS_BR.shp')
import geopandas as gpd
rs_df = gpd.read_file(rs)
wq = libpysal.weights.Queen.from_dataframe(rs_df)
/home/serge/Dropbox/p/pysal/src/subpackages/libpysal/libpysal/weights/weights.py:168: UserWarning: There are 29 disconnected observations Island ids: 0, 4, 23, 27, 80, 94, 101, 107, 109, 119, 122, 139, 169, 175, 223, 239, 247, 253, 254, 255, 256, 261, 276, 291, 294, 303, 321, 357, 374 " Island ids: %s" % ', '.join(str(island) for island in self.islands))
len(wq.islands)
29
wq[0]
{}
wf = libpysal.weights.fuzzy_contiguity(rs_df)
wf.islands
[]
wf[0]
{239: 1.0, 59: 1.0, 152: 1.0, 23: 1.0, 107: 1.0}
plt.rcParams["figure.figsize"] = (20,15)
ax = rs_df.plot(edgecolor='grey', facecolor='w')
f,ax = wq.plot(rs_df, ax=ax,
edge_kws=dict(color='r', linestyle=':', linewidth=1),
node_kws=dict(marker=''))
ax.set_axis_off()
ax = rs_df.plot(edgecolor='grey', facecolor='w')
f,ax = wf.plot(rs_df, ax=ax,
edge_kws=dict(color='r', linestyle=':', linewidth=1),
node_kws=dict(marker=''))
ax.set_title('Rio Grande do Sul: Nonplanar Weights')
ax.set_axis_off()
plt.savefig('rioGrandeDoSul.png')