# The Algebra Of Space (G3)¶

In this notebook, we give a more detailed look at how to use
`clifford`

, using the algebra of three dimensional space as a context.

## Setup¶

First, we import clifford as `cf`

, and instantiate a three dimensional
geometric algebra using `Cl()`

```
In [1]:
```

```
from numpy import e,pi
import clifford as cf
layout, blades = cf.Cl(3) # creates a 3-dimensional clifford algebra
```

Given a three dimensional GA with the orthonormal basis,

The basis consists of scalars, three vectors, three bivectors, and a trivector.

`Cl()`

creates the algebra and returns a `layout`

and `blades`

.
The `layout`

holds information and functions related this instance of
`G3`

, and the `blades`

is a dictionary which contains the basis
blades, indexed by their string representations,

```
In [2]:
```

```
blades
```

```
Out[2]:
```

```
{'e1': (1^e1),
'e2': (1^e2),
'e3': (1^e3),
'e12': (1^e12),
'e13': (1^e13),
'e23': (1^e23),
'e123': (1^e123)}
```

You may wish to explicitly assign the blades to variables like so,

```
In [3]:
```

```
e1 = blades['e1']
e2 = blades['e2']
# etc ...
```

Or, if you’re lazy and just working in an interactive session you can
use `locals()`

to update your namespace with all of the blades at
once.

```
In [4]:
```

```
locals().update(blades)
```

Now, all the blades have been defined in the local namespace

```
In [5]:
```

```
e3, e123
```

```
Out[5]:
```

```
((1^e3), (1^e123))
```

## Basics¶

### Products¶

The basic products are available

```
In [6]:
```

```
e1*e2 # geometric product
```

```
Out[6]:
```

```
(1.0^e12)
```

```
In [7]:
```

```
e1|e2 # inner product
```

```
Out[7]:
```

```
0
```

```
In [8]:
```

```
e1^e2 # outer product
```

```
Out[8]:
```

```
(1.0^e12)
```

```
In [9]:
```

```
e1^e2^e3 # even more outer products
```

```
Out[9]:
```

```
(1.0^e123)
```

### Defects in Precidence¶

Python’s operator precidence makes the outer product evaluate after addition. This requires the use of parenthesis when using outer products. For example

```
In [10]:
```

```
e1^e2+e2^e3 # fail
```

```
Out[10]:
```

```
(2.0^e123)
```

```
In [11]:
```

```
(e1^e2) + (e2^e3) # correct
```

```
Out[11]:
```

```
(1.0^e12) + (1.0^e23)
```

Also the inner product of a scalar and a Multivector is 0,

```
In [12]:
```

```
4|e1
```

```
Out[12]:
```

```
0
```

So for scalars, use the outer product or geometric product instead

```
In [13]:
```

```
4*e1
```

```
Out[13]:
```

```
(4^e1)
```

### Multivectors¶

Multivectors can be defined in terms of the basis blades. For example you can construct a rotor as a sum of a scalar and bivector, like so

```
In [14]:
```

```
from scipy import cos, sin
theta = pi/4
R = cos(theta) - sin(theta)*e23
R
```

```
Out[14]:
```

```
0.70711 - (0.70711^e23)
```

You can also mix grades without any reason

```
In [15]:
```

```
A = 1 + 2*e1 + 3*e12 + 4*e123
A
```

```
Out[15]:
```

```
1.0 + (2.0^e1) + (3.0^e12) + (4.0^e123)
```

### Reversion¶

The reversion operator is accomplished with the tilde `~`

in front of
the Multivector on which it acts

```
In [16]:
```

```
~A
```

```
Out[16]:
```

```
1.0 + (2.0^e1) - (3.0^e12) - (4.0^e123)
```

### Grade Projection¶

Taking a projection onto a specific grade \(n\) of a Multivector is usually written

can be done by using soft brackets, like so

```
In [17]:
```

```
A(0) # get grade-0 elements of R
```

```
Out[17]:
```

```
1.0
```

```
In [18]:
```

```
A(1) # get grade-1 elements of R
```

```
Out[18]:
```

```
(2.0^e1)
```

```
In [19]:
```

```
A(2) # you get it
```

```
Out[19]:
```

```
(3.0^e12)
```

### Magnitude¶

Using the reversion and grade projection operators, we can define the magnitude of \(A\)

```
In [20]:
```

```
(A*~A)(0)
```

```
Out[20]:
```

```
30.0
```

This is done in the `abs()`

operator

```
In [21]:
```

```
abs(A)**2
```

```
Out[21]:
```

```
30.0
```

### Inverse¶

The inverse of a Multivector is defined as \(A^{-1}A=1\)

```
In [22]:
```

```
A.inv()*A
```

```
Out[22]:
```

```
1.0
```

```
In [23]:
```

```
A.inv()
```

```
Out[23]:
```

```
0.13415 + (0.12195^e1) - (0.14634^e3) + (0.18293^e12) + (0.09756^e23) - (0.29268^e123)
```

### Dual¶

The dual of a multivector \(A\) can be defined as

Where, \(I\) is the psuedoscalar for the GA. In \(G_3\), the dual of a vector is a bivector,

```
In [24]:
```

```
a = 1*e1 + 2*e2 + 3*e3
a.dual()
```

```
Out[24]:
```

```
-(3.0^e12) + (2.0^e13) - (1.0^e23)
```

### Pretty, Ugly, and Display Precision¶

You can toggle pretty printing with with `pretty()`

or `ugly()`

.
`ugly`

returns an eval-able string.

```
In [25]:
```

```
cf.ugly()
A.inv()
```

```
Out[25]:
```

```
MultiVector(Layout([1, 1, 1], [(), (1,), (2,), (3,), (1, 2), (1, 3), (2, 3), (1, 2, 3)], firstIdx=1, names=['', 'e1', 'e2', 'e3', 'e12', 'e13', 'e23', 'e123']), value=[0.13414634146341464, 0.12195121951219513, -0.0, -0.14634146341463417, 0.1829268292682927, 7.80625564189563e-18, 0.09756097560975611, -0.29268292682926833])
```

You can also change the displayed precision

```
In [26]:
```

```
cf.pretty(precision=2)
A.inv()
```

```
Out[26]:
```

```
0.13 + (0.12^e1) - (0.15^e3) + (0.18^e12) + (0.1^e23) - (0.29^e123)
```

This does not effect the internal precision used for computations.

## Applications¶

### Reflections¶

```
In [27]:
```

```
from IPython.display import Image
Image(url='_static/reflection_on_vector.svg')
```

```
Out[27]:
```

Reflecting a vector \(c\) about a normalized vector \(n\) is pretty simple,

```
In [28]:
```

```
c = e1+e2+e3 # a vector
n = e1 # the reflector
n*c*n # reflect `a` in hyperplane normal to `n`
```

```
Out[28]:
```

```
(1.0^e1) - (1.0^e2) - (1.0^e3)
```

Because we have the `inv()`

available, we can equally well reflect in
un-normalized vectors using,

```
In [29]:
```

```
a = e1+e2+e3 # the vector
n = 3*e1 # the reflector
n*a*n.inv()
```

```
Out[29]:
```

```
(1.0^e1) - (1.0^e2) - (1.0^e3)
```

Refelections can also be made with repsect to the a ‘hyperplane normal to the vector \(n\)’, in this case the formula is negated

### Rotations¶

A vector can be rotated using the formula

Where \(R\) is a rotor. A rotor can be defined by multiple reflections,

or by a plane and an angle,

For example

```
In [30]:
```

```
from numpy import pi
R = e**(-pi/4*e12) # enacts rotation by pi/2
R
```

```
Out[30]:
```

```
0.71 - (0.71^e12)
```

```
In [31]:
```

```
R*e1*~R # rotate e1 by pi/2 in the e12-plane
```

```
Out[31]:
```

```
(1.0^e2)
```

### Some Ways to use Functions¶

Maybe we want to define a function which can return rotor of some angle \(\theta\) in the \(e_{12}\)-plane,

```
In [32]:
```

```
R12 = lambda theta: e**(-theta/2*e12)
R12(pi/2)
```

```
Out[32]:
```

```
0.71 - (0.71^e12)
```

And use it like this

```
In [33]:
```

```
a = e1+e2+e3
R = R12(pi/2)
R*a*~R
```

```
Out[33]:
```

```
-(1.0^e1) + (1.0^e2) + (1.0^e3)
```

You might as well make the angle arugment a bivector, so that you can control the plane of rotation as well as the angle

```
In [34]:
```

```
R_B = lambda B: e**(-B/2.)
```

Then you could do

```
In [35]:
```

```
R12 = R_B(pi/4*e12)
R23 = R_B(pi/5*e23)
```

or

```
In [36]:
```

```
R_B(pi/6*(e23+e12)) # rotor enacting a pi/6-rotation in the e23+e12-plane
```

```
Out[36]:
```

```
0.93 - (0.26^e12) - (0.26^e23)
```

Maybe you want to define a function which returns a *function* that
enacts a specified rotation,

This just saves you having to write out the sandwhich product, which is nice if you are cascading a bunch of rotors, like so

```
In [37]:
```

```
def R_factory( B):
def dummy_f(a):
R = e**(-B/2)
return R*a*~R
return dummy_f
R = R_factory(pi/6*(e23+e12)) # this returns a function
R(a) # which acts on a vector
```

```
Out[37]:
```

```
(0.52^e1) + (0.74^e2) + (1.48^e3)
```

Then you can do things like

```
In [38]:
```

```
R12 = R_factory(pi/3*e12)
R23 = R_factory(pi/3*e23)
R13 = R_factory(pi/3*e13)
R12(R23(R13(a)))
```

```
Out[38]:
```

```
(0.41^e1) - (0.66^e2) + (1.55^e3)
```

To make cascading a sequence of rotations as concise as possible, we could define a function which takes a list of bivectors \(A,B,C,..\) , and enacts the sequence of rotations which they represent on a some vector \(x\).

```
In [39]:
```

```
from functools import reduce
# a sequence of rotations
def R_seq(*args):
Bs,a = args[:-1],args[-1]
R_lst = [e**(-B/2) for B in Bs] # create list of Rotors from list of Bivectors
R = reduce(cf.gp, R_lst) # apply the geometric product to list of Rotors
return lambda a: R*a*~R
# rotation sequence by pi/2-in-e12 THEN pi/2-in-e23
R = R_seq(pi/2*e23, pi/2*e12, e1)
R(e1)
```

```
Out[39]:
```

```
(1.0^e3)
```

## Changing Basis Names¶

If you want to use different names for your basis as opposed to e’s with
numbers, supply the `Cl()`

with a list of `names`

. For example for a
two dimensional GA,

```
In [40]:
```

```
layout,blades = cf.Cl(2, names = ['','x','y','i'])
blades
```

```
Out[40]:
```

```
{'x': (1^x), 'y': (1^y), 'i': (1^i)}
```

```
In [41]:
```

```
locals().update(blades)
```

```
In [42]:
```

```
1*x+2*y
```

```
Out[42]:
```

```
(1^x) + (2^y)
```

```
In [43]:
```

```
(1+4*i)
```

```
Out[43]:
```

```
1.0 + (4.0^i)
```