The Tensor
class is probably the most important class in
Torch
. Almost every package depends on this class. It is the
class for handling numeric data. As with pretty much anything in
Torch7, tensors are
serializable.
Multi-dimensional matrix
A Tensor
is a potentially multi-dimensional matrix. The number of
dimensions is unlimited that can be created using
LongStorage with more dimensions.
Example:
--- creation of a 4D-tensor 4x5x6x2
z = torch.Tensor(4,5,6,2)
--- for more dimensions, (here a 6D tensor) one can do:
s = torch.LongStorage(6)
s[1] = 4; s[2] = 5; s[3] = 6; s[4] = 2; s[5] = 7; s[6] = 3;
x = torch.Tensor(s)
The number of dimensions of a Tensor
can be queried by
nDimension() or
dim(). Size of the i-th
dimension is
returned by size(i). A LongStorage
containing all the dimensions can be returned by
size().
> print(x:nDimension())
6
> print(x:size())
4
5
6
2
7
3
[torch.LongStorage of size 6]
Internal data representation
The actual data of a Tensor
is contained into a
Storage. It can be accessed using
storage()
. While the memory of a
Tensor
has to be contained in this unique Storage
, it might
not be contiguous: the first position used in the Storage
is given
by storageOffset()
(starting at
1
). And the jump needed to go from one element to another
element in the i-th
dimension is given by
stride(i)
. In other words, given a 3D
tensor
x = torch.Tensor(7,7,7)
accessing the element (3,4,5)
can be done by
= x[3][4][5]
or equivalently (but slowly!)
= x:storage()[x:storageOffset()
+(3-1)*x:stride(1)+(4-1)*x:stride(2)+(5-1)*x:stride(3)]
One could say that a Tensor
is a particular way of viewing a
Storage
: a Storage
only represents a chunk of memory, while the
Tensor
interprets this chunk of memory as having dimensions:
> x = torch.Tensor(4,5)
> s = x:storage()
> for i=1,s:size() do -- fill up the Storage
>> s[i] = i
>> end
> print(x) -- s is interpreted by x as a 2D matrix
1 2 3 4 5
6 7 8 9 10
11 12 13 14 15
16 17 18 19 20
[torch.DoubleTensor of dimension 4x5]
Note also that in Torch7 elements in the same row [elements along the last dimension] are contiguous in memory for a matrix [tensor]:
> x = torch.Tensor(4,5)
> i = 0
>
> x:apply(function()
>> i = i + 1
>> return i
>> end)
>
> print(x)
1 2 3 4 5
6 7 8 9 10
11 12 13 14 15
16 17 18 19 20
[torch.DoubleTensor of dimension 4x5]
> return x:stride()
5
1 -- element in the last dimension are contiguous!
[torch.LongStorage of size 2]
This is exactly like in C (and not Fortran
).
Tensors of different types
Actually, several types of Tensor
exists:
ByteTensor -- contains unsigned chars
CharTensor -- contains signed chars
ShortTensor -- contains shorts
IntTensor -- contains ints
FloatTensor -- contains floats
DoubleTensor -- contains doubles
Most numeric operations are implemented only for FloatTensor
and DoubleTensor
.
Other Tensor types are useful if you want to save memory space.
Default Tensor type
For convenience, an alias torch.Tensor
is provided, which allows the user to write
type-independent scripts, which can then ran after choosing the desired Tensor type with
a call like
torch.setdefaulttensortype('torch.FloatTensor')
See torch.setdefaulttensortype for more details.
By default, the alias "points" on torch.DoubleTensor
.
Efficient memory management
All tensor operations in this class do not make any memory copy. All these methods transform the existing tensor, or return a new tensor referencing the same storage. This magical behavior is internally obtained by good usage of the stride() and storageOffset(). Example:
> x = torch.Tensor(5):zero()
> print(x)
0
0
0
0
0
[torch.DoubleTensor of dimension 5]
> x:narrow(1, 2, 3):fill(1) -- narrow() returns a Tensor
-- referencing the same Storage as x
> print(x)
0
1
1
1
0
[torch.Tensor of dimension 5]
If you really need to copy a Tensor
, you can use the copy() method:
> y = torch.Tensor(x:size()):copy(x)
Or the convenience method
> y = x:clone()
We now describe all the methods for Tensor
. If you want to specify the Tensor type,
just replace Tensor
by the name of the Tensor variant (like CharTensor
).
Tensor constructors, create new Tensor object, optionally, allocating
new memory. By default the elements of a newly allocated memory are
not initialized, therefore, might contain arbitrary numbers. Here are
several ways to construct a new Tensor
.
Returns an empty tensor.
### torch.Tensor(tensor) ###Returns a new tensor which reference the same
Storage than the given tensor
. The
size, stride, and
storage offset are the same than the
given tensor.
The new Tensor
is now going to "view" the same storage
as the given tensor
. As a result, any modification in the elements
of the Tensor
will have a impact on the elements of the given
tensor
, and vice-versa. No memory copy!
> x = torch.Tensor(2,5):fill(3.14)
> print(x)
3.1400 3.1400 3.1400 3.1400 3.1400
3.1400 3.1400 3.1400 3.1400 3.1400
[torch.DoubleTensor of dimension 2x5]
> y = torch.Tensor(x)
> print(y)
3.1400 3.1400 3.1400 3.1400 3.1400
3.1400 3.1400 3.1400 3.1400 3.1400
[torch.DoubleTensor of dimension 2x5]
> y:zero()
> print(x) -- elements of x are the same as y!
0 0 0 0 0
0 0 0 0 0
[torch.DoubleTensor of dimension 2x5]
Create a tensor up to 4 dimensions. The tensor size will be sz1 x sz2 x sx3 x sz4
.
Create a tensor of any number of dimensions. The
LongStorage sizes
gives the size in each dimension of
the tensor. The optional LongStorage strides
gives the
jump necessary to go from one element to the next one in the each
dimension. Of course, sizes
and strides
must have the same
number of elements. If not given, or if some elements of strides
are negative, the stride() will be
computed such that the tensor is as contiguous as possible in memory.
Example, create a 4D 4x4x3x2 tensor:
x = torch.Tensor(torch.LongStorage({4,4,3,2}))
Playing with the strides can give some interesting things:
x = torch.Tensor(torch.LongStorage({4}), torch.LongStorage({0})):zero() -- zeroes the tensor
x[1] = 1 -- all elements point to the same address!
print(x)
1
1
1
1
[torch.DoubleTensor of dimension 4]
Note that negative strides are not allowed, and, if given as argument when constructing the Tensor, will be interpreted as //choose the right stride such that the Tensor is contiguous in memory//.
### torch.Tensor(storage, [storageOffset, sizes, [strides]]) ###Returns a tensor which uses the existing Storage
storage
, starting at position storageOffset
(>=1). The size
of each dimension of the tensor is given by the
LongStorage sizes
.
If only storage
is provided, it will create a 1D Tensor viewing
the all Storage.
The jump necessary to go from one element to the next one in each
dimension is given by the optional argument LongStorage
strides
. If not given, or if some elements of strides
are
negative, the stride() will be computed such
that the tensor is as contiguous as possible in memory.
Any modification in the elements of the Storage
will have an
impact on the elements of the new Tensor
, and vice-versa. There is
no memory copy!
-- creates a storage with 10 elements
> s = torch.Storage(10):fill(1)
-- we want to see it as a 2x5 tensor
> x = torch.Tensor(s, 1, torch.LongStorage{2,5})
> print(x)
1 1 1 1 1
1 1 1 1 1
[torch.DoubleTensor of dimension 2x5]
> x:zero()
> print(s) -- the storage contents have been modified
> print(s)
0
0
0
0
0
0
0
0
0
0
[torch.DoubleStorage of size 10]
Convenience constructor (for the previous constructor) assuming a
number of dimensions inferior or equal to 4. szi
is the size in
the i-th
dimension, and sti
it the stride in the i-th
dimension.
The argument is assumed to be a Lua array of numbers. The constructor returns a new Tensor of the size of the table, containing all the table elements. The table might be multi-dimensional.
Example:
> = torch.Tensor({{1,2,3,4}, {5,6,7,8}})
1 2 3 4
5 6 7 8
[torch.DoubleTensor of dimension 2x4]
Returns a clone of a tensor. The memory is copied.
i = 0
x = torch.Tensor(5):apply(function(x)
i = i + 1
return i
end)
= x
1
2
3
4
5
[torch.DoubleTensor of dimension 5]
-- create a clone of x
y = x:clone()
= y
1
2
3
4
5
[torch.DoubleTensor of dimension 5]
-- fill up y with 1
y:fill(1)
= y
1
1
1
1
1
[torch.DoubleTensor of dimension 5]
-- the contents of x were not changed:
= x
1
2
3
4
5
[torch.DoubleTensor of dimension 5]
- If the given Tensor contents are contiguous in memory, returns the exact same Tensor (no memory copy).
- Otherwise (not contiguous in memory), returns a clone (memory copy).
x = torch.Tensor(2,3):fill(1)
= x
1 1 1
1 1 1
[torch.DoubleTensor of dimension 2x3]
-- x is contiguous, so y points to the same thing
y = x:contiguous():fill(2)
= y
2 2 2
2 2 2
[torch.DoubleTensor of dimension 2x3]
-- contents of x have been changed
= x
2 2 2
2 2 2
[torch.DoubleTensor of dimension 2x3]
-- x:t() is not contiguous, so z is a clone
z = x:t():contiguous():fill(3.14)
= z
3.1400 3.1400
3.1400 3.1400
3.1400 3.1400
[torch.DoubleTensor of dimension 3x2]
-- contents of x have not been changed
= x
2 2 2
2 2 2
[torch.DoubleTensor of dimension 2x3]
If type
is nil
, returns atring containing the type name of
the given tensor.
= torch.Tensor():type()
torch.DoubleTensor
If type
is a string describing a Tensor type, and is equal to
the given tensor typename, returns the exact same tensor (//no memory
copy//).
x = torch.Tensor(3):fill(3.14)
= x
3.1400
3.1400
3.1400
[torch.DoubleTensor of dimension 3]
y = x:type('torch.DoubleTensor')
= y
3.1400
3.1400
3.1400
[torch.DoubleTensor of dimension 3]
-- zero y contents
y:zero()
-- contents of x have been changed
= x
0
0
0
[torch.DoubleTensor of dimension 3]
If type
is a string describing a Tensor type, different from
the type name of the given Tensor, returns a new Tensor of the
specified type, whose contents corresponds to the contents of the
original Tensor, casted to the given type (//memory copy occurs, with
possible loss of precision//).
x = torch.Tensor(3):fill(3.14)
= x
3.1400
3.1400
3.1400
[torch.DoubleTensor of dimension 3]
y = x:type('torch.IntTensor')
= y
3
3
3
[torch.IntTensor of dimension 3]
Convenience method for the type method. Equivalent to
type(tensor:type())
Convenience methods for the type method. For e.g.,
x = torch.Tensor(3):fill(3.14)
= x
3.1400
3.1400
3.1400
[torch.DoubleTensor of dimension 3]
-- calling type('torch.IntTensor')
= x:type('torch.IntTensor')
3
3
3
[torch.IntTensor of dimension 3]
-- is equivalent to calling int()
= x:int()
3
3
3
[torch.IntTensor of dimension 3]
Returns the number of dimensions in a Tensor
.
> x = torch.Tensor(4,5) -- a matrix
> = x:nDimension()
2
Same as nDimension().
### [number] size(dim) ###Returns the size of the specified dimension dim
. Example:
> x = torch.Tensor(4,5):zero()
> print(x)
0 0 0 0 0
0 0 0 0 0
0 0 0 0 0
0 0 0 0 0
[torch.DoubleTensor of dimension 4x5]
> return x:size(2) -- gets the number of columns
5
Returns a LongStorage containing the size of each dimension of the tensor.
> x = torch.Tensor(4,5):zero()
> print(x)
0 0 0 0 0
0 0 0 0 0
0 0 0 0 0
0 0 0 0 0
[torch.DoubleTensor of dimension 4x5]
> return x:size()
4
5
[torch.LongStorage of size 2]
Same as size() method.
### [number] stride(dim) ###Returns the jump necessary to go from one element to the next one in the
specified dimension dim
. Example:
> x = torch.Tensor(4,5):zero()
> print(x)
0 0 0 0 0
0 0 0 0 0
0 0 0 0 0
0 0 0 0 0
[torch.DoubleTensor of dimension 4x5]
--- elements in a row are contiguous in memory
> return x:stride(2)
1
--- to go from one element to the next one in a column
--- we need here to jump the size of the row
> return x:stride(1)
5
Note also that in Torch
elements in the same row [elements along the last dimension]
are contiguous in memory for a matrix [tensor].
Returns the jump necessary to go from one element to the next one in each dimension. Example:
> x = torch.Tensor(4,5):zero()
> print(x)
0 0 0 0 0
0 0 0 0 0
0 0 0 0 0
0 0 0 0 0
[torch.DoubleTensor of dimension 4x5]
> return x:stride()
5
1 -- elements are contiguous in a row [last dimension]
[torch.LongStorage of size 2]
Note also that in Torch
elements in the same row [elements along the last dimension]
are contiguous in memory for a matrix [tensor].
Returns the Storage used to store all the elements of the Tensor
.
Basically, a Tensor
is a particular way of viewing a Storage
.
> x = torch.Tensor(4,5)
> s = x:storage()
> for i=1,s:size() do -- fill up the Storage
>> s[i] = i
>> end
> print(x) -- s is interpreted by x as a 2D matrix
1 2 3 4 5
6 7 8 9 10
11 12 13 14 15
16 17 18 19 20
[torch.DoubleTensor of dimension 4x5]
Returns true
iff the elements of the Tensor
are contiguous in memory.
-- normal tensors are contiguous in memory
> x = torch.Tensor(4,5):zero()
> = x:isContiguous()
true
-- y now "views" the 3rd column of x
-- the storage of y is the same than x
-- so the memory cannot be contiguous
> y = x:select(2, 3)
> = y:isContiguous()
false
-- indeed, to jump to one element to
-- the next one, the stride is 4
> = y:stride()
5
[torch.LongStorage of size 1]
Returns the number of elements of a tensor.
> x = torch.Tensor(4,5)
> = x:nElement() -- 4x5 = 20!
20
Return the first index (starting at 1) used in the tensor's storage.
## Querying elements ##Elements of a tensor can be retrieved with the [index]
operator.
If index
is a number, [index]
operator is equivalent to a
select(1, index)
if the tensor has more
than one dimension. If the tensor is a 1D tensor, it returns the value
at index
in this tensor.
If index
is a table, the table must contain n numbers, where
n is the number of dimensions of the
Tensor. It will return the element at the given position.
In the same spirit, index
might be a LongStorage,
specifying the position (in the Tensor) of the element to be
retrieved.
Example:
> x = torch.Tensor(3,3)
> i = 0; x:apply(function() i = i + 1; return i end)
> = x
1 2 3
4 5 6
7 8 9
[torch.DoubleTensor of dimension 3x3]
> = x[2] -- returns row 2
4
5
6
[torch.DoubleTensor of dimension 3]
> = x[2][3] -- returns row 2, column 3
6
> = x[{2,3}] -- another way to return row 2, column 3
6
> = x[torch.LongStorage{2,3}] -- yet another way to return row 2, column 3
6
A Tensor
being a way of viewing a Storage, it is
possible to "set" a Tensor
such that it views an existing Storage.
Note that if you want to perform a set on an empty Tensor
like
y = torch.Storage(10)
x = torch.Tensor()
x:set(y, 1, 10)
you might want in that case to use one of the equivalent constructor.
y = torch.Storage(10)
x = torch.Tensor(y, 1, 10)
The Tensor
is now going to "view" the same storage
as the given tensor
. As the result, any modification in the elements of
the Tensor
will have an impact on the elements of the given tensor
, and
vice-versa. This is an efficient method, as there is no memory copy!
> x = torch.Tensor(2,5):fill(3.14)
> print(x)
3.1400 3.1400 3.1400 3.1400 3.1400
3.1400 3.1400 3.1400 3.1400 3.1400
[torch.DoubleTensor of dimension 2x5]
> y = torch.Tensor():set(x)
> print(y)
3.1400 3.1400 3.1400 3.1400 3.1400
3.1400 3.1400 3.1400 3.1400 3.1400
[torch.DoubleTensor of dimension 2x5]
> y:zero()
> print(x) -- elements of x are the same than y!
0 0 0 0 0
0 0 0 0 0
[torch.DoubleTensor of dimension 2x5]
The Tensor
is now going to "view" the given
storage
, starting at position storageOffset
(>=1)
with the given dimension sizes
and the optional given
strides
. As the result, any modification in the
elements of the Storage
will have a impact on the elements of the
Tensor
, and vice-versa. This is an efficient method, as there is no
memory copy!
If only storage
is provided, the whole storage will be viewed as a 1D Tensor.
-- creates a storage with 10 elements
> s = torch.Storage(10):fill(1)
-- we want to see it as a 2x5 tensor
> sz = torch.LongStorage({2,5})
> x = torch.Tensor()
> x:set(s, 1, sz)
> print(x)
1 1 1 1 1
1 1 1 1 1
[torch.DoubleTensor of dimension 2x5]
> x:zero()
> print(s) -- the storage contents have been modified
> print(s)
0
0
0
0
0
0
0
0
0
0
[torch.DoubleStorage of size 10]
This is a "shorcut" for previous method.
It works up to 4 dimensions. szi
is the size of the i
-th dimension of the tensor.
sti
is the stride in the i
-th dimension.
Copy the elements of the given tensor
. The
number of elements must match, but the
sizes might be different.
> x = torch.Tensor(4):fill(1)
> y = torch.Tensor(2,2):copy(x)
> print(x)
1
1
1
1
[torch.DoubleTensor of dimension 4]
> print(y)
1 1
1 1
[torch.DoubleTensor of dimension 2x2]
If a different type of tensor
is given, then a type conversion occurs,
which, of course, might result in loss of precision.
Fill the tensor with the given value
.
> = torch.DoubleTensor(4):fill(3.14)
3.1400
3.1400
3.1400
3.1400
[torch.DoubleTensor of dimension 4]
Fill the tensor with zeros.
> = torch.Tensor(4):zero()
0
0
0
0
[torch.DoubleTensor of dimension 4]
When resizing to a larger size, the underlying Storage is resized to fit
all the elements of the Tensor
.
When resizing to a smaller size, the underlying Storage is not resized.
Important note: the content of a Tensor
after resizing is undertermined as strides
might have been completely changed. In particular, the elements of the resized tensor are contiguous in memory.
Resize the tensor
as the given tensor
(of the same type).
Resize the tensor
according to the given LongStorage size
.
Convenience method of the previous method, working for a number of dimensions up to 4.
Each of these methods returns a Tensor
which is a sub-tensor of the given
tensor, with the same Storage
. Hence, any modification in the memory of
the sub-tensor will have an impact on the primary tensor, and vice-versa.
These methods are very fast, as they do not involve any memory copy.
### [Tensor] narrow(dim, index, size) ###Returns a new Tensor
which is a narrowed version of the current one: the dimension dim
is narrowed
from index
to index+size-1
.
> x = torch.Tensor(5, 6):zero()
> print(x)
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
[torch.DoubleTensor of dimension 5x6]
> y = x:narrow(1, 2, 3) -- narrow dimension 1 from index 2 to index 2+3-1
> y:fill(1) -- fill with 1
> print(y)
1 1 1 1 1 1
1 1 1 1 1 1
1 1 1 1 1 1
[torch.DoubleTensor of dimension 3x6]
> print(x) -- memory in x has been modified!
0 0 0 0 0 0
1 1 1 1 1 1
1 1 1 1 1 1
1 1 1 1 1 1
0 0 0 0 0 0
[torch.DoubleTensor of dimension 5x6]
This method is equivalent to do a series of
narrow up to the first 4 dimensions. It
returns a new Tensor
which is a sub-tensor going from index
dimis
to dimie
in the i
-th dimension. Negative values are
interpreted index starting from the end: -1
is the last index,
-2
is the index before the last index, ...
> x = torch.Tensor(5, 6):zero()
> print(x)
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
[torch.DoubleTensor of dimension 5x6]
> y = x:sub(2,4):fill(1) -- y is sub-tensor of x:
> print(y) -- dimension 1 starts at index 2, ends at index 4
1 1 1 1 1 1
1 1 1 1 1 1
1 1 1 1 1 1
[torch.DoubleTensor of dimension 3x6]
> print(x) -- x has been modified!
0 0 0 0 0 0
1 1 1 1 1 1
1 1 1 1 1 1
1 1 1 1 1 1
0 0 0 0 0 0
[torch.DoubleTensor of dimension 5x6]
> z = x:sub(2,4,3,4):fill(2) -- we now take a new sub-tensor
> print(z) -- dimension 1 starts at index 2, ends at index 4
-- dimension 2 starts at index 3, ends at index 4
2 2
2 2
2 2
[torch.DoubleTensor of dimension 3x2]
> print(x) -- x has been modified
0 0 0 0 0 0
1 1 2 2 1 1
1 1 2 2 1 1
1 1 2 2 1 1
0 0 0 0 0 0
[torch.DoubleTensor of dimension 5x6]
> print(y:sub(-1, -1, 3, 4)) -- negative values = bounds
2 2
[torch.DoubleTensor of dimension 1x2]
Returns a new Tensor
which is a tensor slice at the given index
in the
dimension dim
. The returned tensor has one less dimension: the dimension
dim
is removed. As a result, it is not possible to select()
on a 1D
tensor.
Note that "selecting" on the first dimension is equivalent to use the [] operator
> x = torch.Tensor(5,6):zero()
> print(x)
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
[torch.DoubleTensor of dimension 5x6]
> y = x:select(1, 2):fill(2) -- select row 2 and fill up
> print(y)
2
2
2
2
2
2
[torch.DoubleTensor of dimension 6]
> print(x)
0 0 0 0 0 0
2 2 2 2 2 2
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
[torch.DoubleTensor of dimension 5x6]
> z = x:select(2,5):fill(5) -- select column 5 and fill up
> print(z)
5
5
5
5
5
[torch.DoubleTensor of dimension 5]
> print(x)
0 0 0 0 5 0
2 2 2 2 5 2
0 0 0 0 5 0
0 0 0 0 5 0
0 0 0 0 5 0
[torch.DoubleTensor of dimension 5x6]
The indexing operator [] can be used to combine narrow/sub and select in a concise an efficient way. It can also be used to copy, and fill (sub) tensors.
> x = torch.Tensor(5, 6):zero()
> print(x)
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
[torch.DoubleTensor of dimension 5x6]
> x[{ 1,3 }] = 1 -- sets element at (i=1,j=3) to 1
> print(x)
0 0 1 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
[torch.DoubleTensor of dimension 5x6]
> x[{ 2,{2,4} }] = 2 -- sets a slice of 3 elements to 2
> print(x)
0 0 1 0 0 0
0 2 2 2 0 0
0 0 0 0 0 0
0 0 0 0 0 0
0 0 0 0 0 0
[torch.DoubleTensor of dimension 5x6]
> x[{ {},4 }] = -1 -- sets the full 4th column to -1
> print(x)
0 0 1 -1 0 0
0 2 2 -1 0 0
0 0 0 -1 0 0
0 0 0 -1 0 0
0 0 0 -1 0 0
[torch.DoubleTensor of dimension 5x6]
> x[{ {},2 }] = torch.range(1,5) -- copy a 1D tensor to a slice of x
> print(x)
0 1 1 -1 0 0
0 2 2 -1 0 0
0 3 0 -1 0 0
0 4 0 -1 0 0
0 5 0 -1 0 0
[torch.DoubleTensor of dimension 5x6]
Returns a new Tensor
which indexes the given tensor along dimension dim
and using the entries in torch.LongTensor
index
. The returned tensor has the same number of dimensions as the original tensor. The returned tensor does not use the same storage as the original tensor -- see below for storing the result in an existing tensor.
t7> x = torch.rand(5,5)
t7> =x
0.8020 0.7246 0.1204 0.3419 0.4385
0.0369 0.4158 0.0985 0.3024 0.8186
0.2746 0.9362 0.2546 0.8586 0.6674
0.7473 0.9028 0.1046 0.9085 0.6622
0.1412 0.6784 0.1624 0.8113 0.3949
[torch.DoubleTensor of dimension 5x5]
t7> y = x:index(1,torch.LongTensor{3,1})
t7> =y
0.2746 0.9362 0.2546 0.8586 0.6674
0.8020 0.7246 0.1204 0.3419 0.4385
[torch.DoubleTensor of dimension 2x5]
t7> y:fill(1)
t7> =y
1 1 1 1 1
1 1 1 1 1
[torch.DoubleTensor of dimension 2x5]
t7> =x
0.8020 0.7246 0.1204 0.3419 0.4385
0.0369 0.4158 0.0985 0.3024 0.8186
0.2746 0.9362 0.2546 0.8586 0.6674
0.7473 0.9028 0.1046 0.9085 0.6622
0.1412 0.6784 0.1624 0.8113 0.3949
[torch.DoubleTensor of dimension 5x5]
Note the explicit index
function is different than the indexing operator []
. The indexing operator []
is a syntactic shortcut for a series of select and narrow operations, therefore it always returns a new view on the original tensor that shares the same storage. However, the explicit index
function can not use the same storage.
It is possible to store the result into an existing Tensor with result:index(source, ...)
:
t7> x = torch.rand(5,5)
t7> =x
0.8020 0.7246 0.1204 0.3419 0.4385
0.0369 0.4158 0.0985 0.3024 0.8186
0.2746 0.9362 0.2546 0.8586 0.6674
0.7473 0.9028 0.1046 0.9085 0.6622
0.1412 0.6784 0.1624 0.8113 0.3949
[torch.DoubleTensor of dimension 5x5]
t7> y = torch.Tensor()
ty> y:index(x,1,torch.LongTensor{3,1})
t7> =y
0.2746 0.9362 0.2546 0.8586 0.6674
0.8020 0.7246 0.1204 0.3419 0.4385
[torch.DoubleTensor of dimension 2x5]
Copies the elements of tensor
into itself by selecting the indices in the order defined by the order given in index
.
t7> =x
0.8020 0.7246 0.1204 0.3419 0.4385
0.0369 0.4158 0.0985 0.3024 0.8186
0.2746 0.9362 0.2546 0.8586 0.6674
0.7473 0.9028 0.1046 0.9085 0.6622
0.1412 0.6784 0.1624 0.8113 0.3949
[torch.DoubleTensor of dimension 5x5]
t7> z=torch.Tensor(5,2)
t7> z:select(2,1):fill(-1)
t7> z:select(2,2):fill(-2)
t7> =z
-1 -2
-1 -2
-1 -2
-1 -2
-1 -2
[torch.DoubleTensor of dimension 5x2]
t7> x:indexCopy(2,torch.LongTensor{5,1},z)
t7> =x
-2.0000 0.7246 0.1204 0.3419 -1.0000
-2.0000 0.4158 0.0985 0.3024 -1.0000
-2.0000 0.9362 0.2546 0.8586 -1.0000
-2.0000 0.9028 0.1046 0.9085 -1.0000
-2.0000 0.6784 0.1624 0.8113 -1.0000
[torch.DoubleTensor of dimension 5x5]
Fills the elements of itself with value val
by selecting the indices in the order defined by the order given in index
.
t7> x=torch.rand(5,5)
t7> =x
0.8414 0.4121 0.3934 0.5600 0.5403
0.3029 0.2040 0.7893 0.6079 0.6334
0.3743 0.1389 0.1573 0.1357 0.8460
0.2838 0.9925 0.0076 0.7220 0.5185
0.8739 0.6887 0.4271 0.0385 0.9116
[torch.DoubleTensor of dimension 5x5]
t7> x:indexFill(2,torch.LongTensor{4,2},-10)
t7> =x
0.8414 -10.0000 0.3934 -10.0000 0.5403
0.3029 -10.0000 0.7893 -10.0000 0.6334
0.3743 -10.0000 0.1573 -10.0000 0.8460
0.2838 -10.0000 0.0076 -10.0000 0.5185
0.8739 -10.0000 0.4271 -10.0000 0.9116
[torch.DoubleTensor of dimension 5x5]
These methods returns a Tensor
which is created by replications of the
original tensor.
sizes
can either be a torch.LongStorage
or numbers. Expanding a tensor
does not allocate new memory, but only creates a new view on the existing tensor where
singleton dimensions can be expanded to multiple ones by setting the stride
to 0.
Any dimension that is 1 can be expanded to arbitrary value without any new memory allocation.
t7> x=torch.rand(10,1)
t7> =x
0.3837
0.5966
0.0763
0.1896
0.4958
0.6841
0.4038
0.4068
0.1502
0.2239
[torch.DoubleTensor of dimension 10x1]
t7> y=torch.expand(x,10,2)
t7> =y
0.3837 0.3837
0.5966 0.5966
0.0763 0.0763
0.1896 0.1896
0.4958 0.4958
0.6841 0.6841
0.4038 0.4038
0.4068 0.4068
0.1502 0.1502
0.2239 0.2239
[torch.DoubleTensor of dimension 10x2]
t7> y:fill(1)
t7> =y
1 1
1 1
1 1
1 1
1 1
1 1
1 1
1 1
1 1
1 1
[torch.DoubleTensor of dimension 10x2]
t7> =x
1
1
1
1
1
1
1
1
1
1
[torch.DoubleTensor of dimension 10x1]
t7> i=0; y:apply(function() i=i+1;return i end)
t7> =y
2 2
4 4
6 6
8 8
10 10
12 12
14 14
16 16
18 18
20 20
[torch.DoubleTensor of dimension 10x2]
t7> =x
2
4
6
8
10
12
14
16
18
20
[torch.DoubleTensor of dimension 10x1]
This is equivalent to self:expand(tensor:size())
#### [Tensor] repeatTensor(sizes) ####sizes
can either be a torch.LongStorage
or numbers. Repeating a tensor allocates
new memory. sizes
specify the number of times the tensor is repeated in each dimension.
t7> x=torch.rand(5)
t7> =x
0.7160
0.6514
0.0704
0.7856
0.7452
[torch.DoubleTensor of dimension 5]
t7> =torch.repeatTensor(x,3,2)
0.7160 0.6514 0.0704 0.7856 0.7452 0.7160 0.6514 0.0704 0.7856 0.7452
0.7160 0.6514 0.0704 0.7856 0.7452 0.7160 0.6514 0.0704 0.7856 0.7452
0.7160 0.6514 0.0704 0.7856 0.7452 0.7160 0.6514 0.0704 0.7856 0.7452
[torch.DoubleTensor of dimension 3x10]
t7> return torch.repeatTensor(x,3,2,1)
(1,.,.) =
0.7160 0.6514 0.0704 0.7856 0.7452
0.7160 0.6514 0.0704 0.7856 0.7452
(2,.,.) =
0.7160 0.6514 0.0704 0.7856 0.7452
0.7160 0.6514 0.0704 0.7856 0.7452
(3,.,.) =
0.7160 0.6514 0.0704 0.7856 0.7452
0.7160 0.6514 0.0704 0.7856 0.7452
[torch.DoubleTensor of dimension 3x2x5]
Removes all singleton dimensions of the tensor.
If dim
is given, squeezes only that particular dimension of the tensor.
t7> x=torch.rand(2,1,2,1,2)
t7> =x
(1,1,1,.,.) =
0.6020 0.8897
(2,1,1,.,.) =
0.4713 0.2645
(1,1,2,.,.) =
0.4441 0.9792
(2,1,2,.,.) =
0.5467 0.8648
[torch.DoubleTensor of dimension 2x1x2x1x2]
t7> =torch.squeeze(x)
(1,.,.) =
0.6020 0.8897
0.4441 0.9792
(2,.,.) =
0.4713 0.2645
0.5467 0.8648
[torch.DoubleTensor of dimension 2x2x2]
t7> =torch.squeeze(x, 2)
(1,1,.,.) =
0.6020 0.8897
(2,1,.,.) =
0.4713 0.2645
(1,2,.,.) =
0.4441 0.9792
(2,2,.,.) =
0.5467 0.8648
[torch.DoubleTensor of dimension 2x2x1x2]
Each of these methods returns a Tensor
which is another way of viewing
the Storage
of the given tensor. Hence, any modification in the memory of
the sub-tensor will have an impact on the primary tensor, and vice-versa.
These methods are very fast, are they do not involve any memory copy.
### [result] view(result, tensor, sizes) ###Creates a view with different dimensions of the storage associated with tensor
.
If result
is not passed, then a new tensor is returned, otherwise its storage is
made to point to storage of tensor
.
sizes
can either be a torch.LongStorage
or numbers. If one of the dimensions
is -1, the size of that dimension is inferred from the rest of the elements.
> x = torch.zeros(4)
> print(x:view(2,2))
0 0
0 0
[torch.DoubleTensor of dimension 2x2]
> print(x:view(2,-1))
0 0
0 0
[torch.DoubleTensor of dimension 2x2]
> print(x:view(torch.LongStorage{2,2}))
0 0
0 0
[torch.DoubleTensor of dimension 2x2]
> print(x)
0
0
0
0
[torch.DoubleTensor of dimension 4]
Creates a view with with the same dimensions as template
of the storage associated
with tensor
. If result
is not passed, then a new tensor is returned, otherwise its storage is
made to point to storage of tensor
.
> x = torch.zeros(4)
> y = torch.Tensor(2,2)
> print(x:viewAs(y))
0 0
0 0
[torch.DoubleTensor of dimension 2x2]
Returns a tensor where dimensions dim1
and dim2
have been swapped. For 2D tensors,
the convenience method of t() is available.
> x = torch.Tensor(3,4):zero()
> x:select(2,3):fill(7) -- fill column 3 with 7
> print(x)
0 0 7 0
0 0 7 0
0 0 7 0
[torch.DoubleTensor of dimension 3x4]
> y = x:transpose(1,2) -- swap dimension 1 and 2
> print(y)
0 0 0
0 0 0
7 7 7
0 0 0
[torch.DoubleTensor of dimension 4x3]
> y:select(2, 3):fill(8) -- fill column 3 with 8
> print(y)
0 0 8
0 0 8
7 7 8
0 0 8
[torch.DoubleTensor of dimension 4x3]
> print(x) -- contents of x have changed as well
0 0 7 0
0 0 7 0
8 8 8 8
[torch.DoubleTensor of dimension 3x4]
Convenience method of transpose() for 2D tensors. The given tensor must be 2 dimensional. Swap dimensions 1 and 2.
> x = torch.Tensor(3,4):zero()
> x:select(2,3):fill(7)
> y = x:t()
> print(y)
0 0 0
0 0 0
7 7 7
0 0 0
[torch.DoubleTensor of dimension 4x3]
> print(x)
0 0 7 0
0 0 7 0
0 0 7 0
[torch.DoubleTensor of dimension 3x4]
Returns a tensor which contains all slices of size size
in the dimension dim
. Step between
two slices is given by step
.
If sizedim
is the original size of dimension dim
, the size of dimension
dim
in the returned tensor will be (sizedim - size) / step + 1
An additional dimension of size size
is appended in the returned tensor.
> x = torch.Tensor(7)
> for i=1,7 do x[i] = i end
> print(x)
1
2
3
4
5
6
7
[torch.DoubleTensor of dimension 7]
> return x:unfold(1, 2, 1)
1 2
2 3
3 4
4 5
5 6
6 7
[torch.DoubleTensor of dimension 6x2]
> return x:unfold(1, 2, 2)
1 2
3 4
5 6
[torch.DoubleTensor of dimension 3x2]
These functions apply a function to each element of the tensor on which the
method is called (self). These methods are much faster than using a for
loop in Lua
. The results is stored in self
(if the function returns
something).
Apply the given function to all elements of self.
The function takes a number (the current element of the tensor) and might return a number, in which case it will be stored in self.
Examples:
> i = 0
> z = torch.Tensor(3,3)
> z:apply(function(x)
>> i = i + 1
>> return i
>> end) -- fill up the tensor
> = z
1 2 3
4 5 6
7 8 9
[torch.DoubleTensor of dimension 3x3]
> z:apply(math.sin) -- apply the sin function
> = z
0.8415 0.9093 0.1411
-0.7568 -0.9589 -0.2794
0.6570 0.9894 0.4121
[torch.DoubleTensor of dimension 3x3]
> sum = 0
> z:apply(function(x)
>> sum = sum + x
>> end) -- compute the sum of the elements
> = sum
1.9552094821074
> = z:sum() -- it is indeed correct!
1.9552094821074
Apply the given function to all elements of self and tensor
. The number of elements of both tensors
must match, but sizes do not matter.
The function takes two numbers (the current element of self and tensor
) and might return
a number, in which case it will be stored in self.
Example:
> x = torch.Tensor(3,3)
> y = torch.Tensor(9)
> i = 0
> x:apply(function() i = i + 1; return i end) -- fill-up x
> i = 0
> y:apply(function() i = i + 1; return i end) -- fill-up y
> = x
1 2 3
4 5 6
7 8 9
[torch.DoubleTensor of dimension 3x3]
> = y
1
2
3
4
5
6
7
8
9
[torch.DoubleTensor of dimension 9]
> x:map(y, function(xx, yy) return xx*yy end) -- element-wise multiplication
> = x
1 4 9
16 25 36
49 64 81
[torch.DoubleTensor of dimension 3x3]
Apply the given function to all elements of self, tensor1
and tensor2
. The number of elements of all tensors
must match, but sizes do not matter.
The function takes three numbers (the current element of self, tensor1
and tensor2
) and might return
a number, in which case it will be stored in self.
Example:
> x = torch.Tensor(3,3)
> y = torch.Tensor(9)
> z = torch.Tensor(3,3)
>
> i = 0; x:apply(function() i = i + 1; return math.cos(i)*math.cos(i) end)
> i = 0; y:apply(function() i = i + 1; return i end)
> i = 0; z:apply(function() i = i + 1; return i end)
>
> print(x)
0.2919 0.1732 0.9801
0.4272 0.0805 0.9219
0.5684 0.0212 0.8302
[torch.DoubleTensor of dimension 3x3]
> print(y)
1
2
3
4
5
6
7
8
9
[torch.DoubleTensor of dimension 9]
> print(z)
1 2 3
4 5 6
7 8 9
[torch.DoubleTensor of dimension 3x3]
>
> x:map2(y, z, function(xx, yy, zz) return xx+yy*zz end)
>
> print(x)
1.2919 4.1732 9.9801
16.4272 25.0805 36.9219
49.5684 64.0212 81.8302
[torch.DoubleTensor of dimension 3x3]