You can use the mllib package to compute the L2 norm of the TF-IDF of every row. Then multiply the table with itself to get the cosine similarity as the dot product of two by two L2norms:
1. RDD
rdd = sc.parallelize([[1, "Delhi, Mumbai, Gandhinagar"],[2, " Delhi, Mandi"], [3, "Hyderbad, Jaipur"]])
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Compute
TF-IDF:documents = rdd.map(lambda l: l[1].replace(" ", "").split(",")) from pyspark.mllib.feature import HashingTF, IDF hashingTF = HashingTF() tf = hashingTF.transform(documents)
You can specify the number of features in HashingTF to make the feature matrix smaller (fewer columns).
tf.cache()
idf = IDF().fit(tf)
tfidf = idf.transform(tf)
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Compute
L2norm:from pyspark.mllib.feature import Normalizer labels = rdd.map(lambda l: l[0]) features = tfidf normalizer = Normalizer() data = labels.zip(normalizer.transform(features)) -
Compute cosine similarity by multiplying the matrix with itself:
from pyspark.mllib.linalg.distributed import IndexedRowMatrix mat = IndexedRowMatrix(data).toBlockMatrix() dot = mat.multiply(mat.transpose()) dot.toLocalMatrix().toArray() array([[ 0. , 0. , 0. , 0. ], [ 0. , 1. , 0.10794634, 0. ], [ 0. , 0.10794634, 1. , 0. ], [ 0. , 0. , 0. , 1. ]])OR: Using a Cartesian product and the function
doton numpy arrays:data.cartesian(data)\ .map(lambda l: ((l[0][0], l[1][0]), l[0][1].dot(l[1][1])))\ .sortByKey()\ .collect() [((1, 1), 1.0), ((1, 2), 0.10794633570596117), ((1, 3), 0.0), ((2, 1), 0.10794633570596117), ((2, 2), 1.0), ((2, 3), 0.0), ((3, 1), 0.0), ((3, 2), 0.0), ((3, 3), 1.0)]
2. DataFrame
Since you seem to be using dataframes, you can use the spark mlpackage instead:
import pyspark.sql.functions as psf
df = rdd.toDF(["ID", "Office_Loc"])\
.withColumn("Office_Loc", psf.split(psf.regexp_replace("Office_Loc", " ", ""), ','))
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Compute TF-IDF:
from pyspark.ml.feature import HashingTF, IDF hashingTF = HashingTF(inputCol="Office_Loc", outputCol="tf") tf = hashingTF.transform(df) idf = IDF(inputCol="tf", outputCol="feature").fit(tf) tfidf = idf.transform(tf) -
Compute
L2norm:from pyspark.ml.feature import Normalizer normalizer = Normalizer(inputCol="feature", outputCol="norm") data = normalizer.transform(tfidf) -
Compute matrix product:
from pyspark.mllib.linalg.distributed import IndexedRow, IndexedRowMatrix mat = IndexedRowMatrix( data.select("ID", "norm")\ .rdd.map(lambda row: IndexedRow(row.ID, row.norm.toArray()))).toBlockMatrix() dot = mat.multiply(mat.transpose()) dot.toLocalMatrix().toArray()OR: using a join and a
UDFfor functiondot:dot_udf = psf.udf(lambda x,y: float(x.dot(y)), DoubleType()) data.alias("i").join(data.alias("j"), psf.col("i.ID") < psf.col("j.ID"))\ .select( psf.col("i.ID").alias("i"), psf.col("j.ID").alias("j"), dot_udf("i.norm", "j.norm").alias("dot"))\ .sort("i", "j")\ .show() +---+---+-------------------+ | i| j| dot| +---+---+-------------------+ | 1| 2|0.10794633570596117| | 1| 3| 0.0| | 2| 3| 0.0| +---+---+-------------------+
This tutorial lists different methods to multiply large scale matrices: https://labs.yodas.com/large-scale-matrix-multiplication-with-pyspark-or-how-to-match-two-large-datasets-of-company-1be4b1b2871e