30

I was wondering if there is an easy way to calculate the dot product of two vectors (i.e. 1-d tensors) and return a scalar value in tensorflow.

Given two vectors X=(x1,...,xn) and Y=(y1,...,yn), the dot product is dot(X,Y) = x1 * y1 + ... + xn * yn

I know that it is possible to achieve this by first broadcasting the vectors X and Y to a 2-d tensor and then using tf.matmul. However, the result is a matrix, and I am after a scalar.

Is there an operator like tf.matmul that is specific to vectors?

10 Answers 10

31

One of the easiest way to calculate dot product between two tensors (vector is 1D tensor) is using tf.tensordot

a = tf.placeholder(tf.float32, shape=(5))
b = tf.placeholder(tf.float32, shape=(5))

dot_a_b = tf.tensordot(a, b, 1)

with tf.Session() as sess:
    print(dot_a_b.eval(feed_dict={a: [1, 2, 3, 4, 5], b: [6, 7, 8, 9, 10]}))
# results: 130.0
27

In addition to tf.reduce_sum(tf.multiply(x, y)), you can also do tf.matmul(x, tf.reshape(y, [-1, 1])).

1
  • note that this is the only correct answer if you have a vector with dimensions (1234,)
    – ihadanny
    Jul 1, 2017 at 17:16
18

you can use tf.matmul and tf.transpose

tf.matmul(x,tf.transpose(y))

or

tf.matmul(tf.transpose(x),y)

depending on the dimensions of x and y

1
  • 12
    matmul can transpose things for you: e.g. tf.matmul(a, b, transpose_a=True, transpose_b=False) you can also transpose b obviously. Mar 17, 2017 at 18:57
4
import tensorflow as tf

x = tf.Variable([1, -2, 3], tf.float32, name='x')
y = tf.Variable([-1, 2, -3], tf.float32, name='y')

dot_product = tf.reduce_sum(tf.multiply(x, y))

sess = tf.InteractiveSession()
init_op = tf.global_variables_initializer()
sess.run(init_op)

dot_product.eval()

Out[46]: -14

Here, x and y are both vectors. We can do element wise product and then use tf.reduce_sum to sum the elements of the resulting vector. This solution is easy to read and does not require reshaping.

Interestingly, it does not seem like there is a built in dot product operator in the docs.

Note that you can easily check intermediate steps:

In [48]: tf.multiply(x, y).eval()
Out[48]: array([-1, -4, -9], dtype=int32)
3

In newer versions (I think since 0.12), you should be able to do

tf.einsum('i,i->', x, y)

(Before that, the reduction to a scalar seemed not to be allowed/possible.)

2
  • apparently einsum is slow
    – joel
    Jul 19, 2022 at 17:33
  • That can happen, it depends on the concrete operation and how well the reduction is optimized. Cf. opt-einsum. Jul 25, 2022 at 8:23
2

You can do tf.mul(x,y), followed by tf.reduce_sum()

1
  • ( it should of course be tf.multiply(x,y) )
    – Mathy
    Oct 22, 2021 at 17:06
2

Just use * and reduce_sum

ab = tf.reduce_sum(a*b)

Take a simple example as follows:

import tensorflow as tf
a = tf.constant([1,2,3])
b = tf.constant([2,3,4])

print(a.get_shape())
print(b.get_shape())

c = a*b
ab = tf.reduce_sum(c)

with tf.Session() as sess:
    print(c.eval())
    print(ab.eval())

# output
# (3,)
# (3,)
# [2 6 12]
# 20
1
1

Maybe with the new docs you can just set the transpose option to true for either the first argument of the dot product or the second argument:

tf.matmul(a, b, transpose_a=False, transpose_b=False, adjoint_a=False, adjoint_b=False, a_is_sparse=False, b_is_sparse=False, name=None)

leading:

tf.matmul(a, b, transpose_a=True, transpose_b=False)
tf.matmul(a, b, transpose_a=False, transpose_b=True)
1

Let us assume that you have two column vectors

u = tf.constant([[2.], [3.]])
v = tf.constant([[5.], [7.]])

If you want a 1x1 matrix you can use

tf.einsum('ij,ik->jk',x,y)

If you are interested in a scalar you can use

tf.einsum('ij,ik->',x,y)
0

Use tf.reduce_sum(tf.multiply(x,y)) if you want the dot product of 2 vectors.

To be clear, using tf.matmul(x,tf.transpose(y)) won't get you the dot product, even if you add all the elements of the matrix together afterward.

I'm only mentioning this because of how often it comes up in the above answers when it has nothing to do with the question being asked. I'd just make a comment, but don't have the rep to do that.

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