# Analysis#

flatspin provides several tools for analysing simulation results.

## Working with the grid#

Spins in flatspin can be mapped onto a regular grid, which allows for some interesting analysis and useful functionality. The grid is what enables spatial vector fields, for example.

A grid is essentially a bidirectional mapping from spin positions to grid cells. The flatspin model includes several methods for working with grids. To create a grid object (the mapping), use grid(). By default, a grid is created such that a cell contains at most one spin:

from flatspin.model import SquareSpinIceClosed

model = SquareSpinIceClosed()
model.plot()

def draw_grid(grid):
edges = grid.edges()
xmin, ymin, xmax, ymax = grid.extent
plt.grid(True, c='#999', alpha=1)

plt.xticks(edges)
plt.yticks(edges)
plt.xlim(xmin, xmax)
plt.ylim(ymin, ymax)

grid = model.grid()
draw_grid(grid) The spacing between each grid can be specified with cell_size; if cell_size > lattice_spacing then a grid call may contain more than one spin:

grid = model.grid(cell_size=(1.5, 1.5))
draw_grid(grid)
model.plot(); Alternatively, fixed_grid() can be used to create a grid of some fixed size:

grid = model.fixed_grid((4,4))
draw_grid(grid)
model.plot(); The grid() and fixed_grid() functions used above return a Grid object.

A Grid can also be created manually, given a collection of points:

from flatspin.grid import Grid

x = np.arange(11)
y = np.abs(x-5)
points = np.column_stack([x, y])

# When called without a cell_size, Grid attempts to auto-detect a
# suitable cell_size such that each cell contains at most one point.
grid = Grid(points)
# For a fixed grid, use Grid.fixed_grid(points, grid_size)

plt.scatter(x, y)
draw_grid(grid) ### Looking up spins on the grid#

The Grid object enables fast lookup of the grid cell containing any spin. To map spin indices to grid cells, use grid_index(). To get a list of spins inside a grid cell, use point_index().

grid = model.grid(cell_size=(1.5, 1.5))

print('Spin 5 in cell:', grid.grid_index(5))
print('Spin 28 in cell:', grid.grid_index(28))
print('Cell (0,0) contains:', grid.point_index((0,0)))
print('Cell (2,1) contains:', grid.point_index((2,1)))

model.plot()
# Label spin indices for reference
for i in model.indices():
plt.text(model.pos[i,0], model.pos[i,1], str(i), ha='center', va='center')
draw_grid(grid)

Spin 5 in cell: (0, 0)
Spin 28 in cell: (2, 1)
Cell (0,0) contains: [0 4 5 9]
Cell (2,1) contains: [28 29 33 37 38] ### Mapping grid values to spins#

A common use case is to create a grid with values, and map each value onto some property of the spins:

# 2D array representing grid with values
# Note that the origin of the grid is in the bottom-left, hence
# the first row of values map to the bottom row of the grid
values = np.array(
[[-1, -1, 1],
[-1, 1, -1],
[-1, 1, 1]])
# Create an appropriate fixed grid
grid = model.fixed_grid((values.shape, values.shape))

# Map all spin indices to grid index
spin_inds = model.all_indices()
grid_inds = grid.grid_index(spin_inds)

# Set spin based on grid values
model.spin[spin_inds] = values[grid_inds]

draw_grid(grid)
model.plot(); The model provides a convenient shorthand for the above code called set_grid(). For example, we could spatially arrange the switching thresholds:

values = np.array([
[0.1, 0.2, 0.3],
[0.2, 0.3, 0.4],
[0.3, 0.4, 0.5]
])

model.set_grid('threshold', values)

draw_grid(grid)
quiv = model.plot(C=model.threshold, cmap='coolwarm')
plt.colorbar(quiv, label='threshold'); ### Mapping spin values to the grid#

Going the other way around, we may wish to aggregate some spin value onto each grid cell.

# Count number of spins in each grid cell

array([[4., 5., 4.],
[5., 4., 5.],
[4., 5., 4.]])

# Sum the spins in each grid cell

array([[-4, -5,  4],
[-5,  4, -5],
[-4,  5,  4]], dtype=int8)

# Mean spin in each cell

array([[-1, -1,  1],
[-1,  1, -1],
[-1,  1,  1]], dtype=int8)

# Plot total magnetization in each cell
from flatspin.plotting import plot_vectors

plt.subplot(121)
x, y = grid.centers()
XY = np.column_stack([x, y])
plot_vectors(XY, UV, normalize=True);

plt.subplot(122)
model.plot()
draw_grid(grid)
plt.tight_layout(); ## Vertices#

Spin ice systems are frequently analyzed in terms of its vertices. A vertex is defined by the points in the geometry where spins point either in or out. In square spin ice, a vertex is surrounded by four spins. In the plot below, the colored dots denote the vertices.

model.randomize(seed=0x9876)
model.plot()
model.plot_vertices(); The spin indices of each vertex can be obtained with vertices():

model.vertices()

[array([ 5,  9, 10, 14]),
array([ 6, 10, 11, 15]),
array([ 7, 11, 12, 16]),
array([14, 18, 19, 23]),
array([15, 19, 20, 24]),
array([16, 20, 21, 25]),
array([23, 27, 28, 32]),
array([24, 28, 29, 33]),
array([25, 29, 30, 34])]


Given a vertex (list of spin indices), we can obtain its position:

v = [5, 9, 10, 14]
model.vertex_pos(v)

array([1., 1.])


… or its magnetization:

model.vertex_mag(v)

array([-2.,  2.])


### Vertex types#

The vertex type is defined by the dipolar energy between the spins in the vertex. In the plot above, the colors of the dots indicate the vertex type: green for type 1 (lowest energy), blue for type 2, red for type 3 and gray for type 4 (highest energy).

Use vertex_type() to get the type of a vertex:

[model.vertex_type(v) for v in model.vertices()]

[2, 3, 3, 3, 4, 3, 2, 1, 3]


A measure of the degree of frustration in a spin ice system is the vertex count:

print("Vertex counts:", model.vertex_count())

Vertex counts: ((1, 2, 3, 4), (1, 2, 5, 1))


… or as fractions of the number of vertices, the vertex population:

print("Vertex population:", model.vertex_population())

Vertex population: ((1, 2, 3, 4), (0.1111111111111111, 0.2222222222222222, 0.5555555555555556, 0.1111111111111111))


### Vertex magnetization#

We may also be interested in the vertex magnetization:

model.plot_vertex_mag(); ### Vertex detection#

Vertices are detected automatically using the flatspin.vertices module. You can use the module to find vertices of a geometry given a list of spin positions and angles, i.e., without having to create a model object. Vertex detection relies on the Grid to find vertex locations, using a sliding window of some size.

from flatspin.model import KagomeSpinIce

# Pretend we have no model object
model2 = KagomeSpinIce(size=(3,3), init='random')
pos = model2.pos
angle = model2.angle
spin = model2.spin
mag = model2.vectors
grid = Grid(pos)

plot_vectors(pos, mag)
# Label spin indices for reference
for i in range(len(pos)):
plt.text(pos[i,0], pos[i,1], str(i), ha='center', va='center')
draw_grid(grid) For kagome spin ice, vertices fall inside a 3x2 grid window:

from flatspin.vertices import find_vertices, vertex_pos, vertex_type

win_size = (2, 3)
vi, vj, vertices = find_vertices(grid, pos, angle, win_size)
display(vertices)

[array([1, 2, 7]),
array([3, 4, 8]),
array([ 7, 11, 12]),
array([ 8, 13, 14]),
array([ 9, 15, 16]),
array([10, 11, 17]),
array([12, 13, 18]),
array([14, 15, 19]),
array([17, 21, 22]),
array([18, 23, 24]),
array([19, 25, 26]),
array([22, 23, 29]),
array([24, 25, 30]),
array([26, 27, 31]),
array([29, 33, 34]),
array([30, 35, 36])]

vpos = vertex_pos(pos, vertices)
vtype = [vertex_type(spin[v], pos[v], angle[v]) for v in vertices]
print(vtype)

plot_vectors(pos, mag)
plt.scatter(*vpos.T, c=vtype, cmap='vertex-type');

[1, 2, 1, 1, 1, 1, 2, 2, 1, 1, 2, 1, 1, 1, 1, 1] ## Energy#

The energy of each spin is derived from the total fields acting on each spin, i.e., the dipolar fields, external fields and thermal fields:

$$E_i = \vec{h}_i \cdot m_i$$

In other words, the energy of spin $$i$$ is the total field acting on the spin, projected onto its magnetization vector. Hence only the parallel component of the field contributes to the energy.

Below we obtain the energy of each spin by calling energy(). Next we use the energy to color the arrows of each spin in a relaxed pinwheel system. Notice how the spins that are part of the domain walls (the boundaries of the ferromagnetic domains) have higher energy than the spins that are well inside the domains.

Note

The unit of the energy is solely the Zeeman energy, derived from the field at each spin multiplied by its magnetization. Because flatspin uses reduced magnetization units, i.e., for each spin $$m_i = 1$$, the energy provided by energy() also follows this reduced unit scheme (only implicitly multiplied by $$m_i = 1$$). To retrieve a physical energy unit, simply multiply the value by the field unit and whatever magnetization you want to ascribe to a single spin.

from flatspin.model import PinwheelSpinIceLuckyKnot
model = PinwheelSpinIceLuckyKnot(size=(25,25), alpha=0.1, init='random', use_opencl=True)

print("Total energy (randomized):", model.total_energy())

model.relax()
#model.plot_vertex_mag();
#plt.figure()

E = model.energy()
print("Total energy (relaxed):", np.sum(E))

quiv = model.plot(C=E, cmap='plasma')
plt.colorbar(quiv);

Total energy (randomized): -0.922608072868131
Total energy (relaxed): -66.50909194850031 Since energy() considers all fields in the energy calculations, an external field will change the energy landscape:

# Saturating field
model.set_h_ext([0.2, 0.2])

E = model.energy()
print("Total energy (with h_ext):", np.sum(E))

quiv = model.plot(C=E, cmap='plasma')
plt.colorbar(quiv);

Total energy (with h_ext): -100.30909194850031 In the above plot, notice how the domain with the highest energy is pointing antiparallel to the external field.

### Dipolar energy#

If we consider dipolar fields only, we obtain the dipolar energy:

$$E_\text{dip} = \vec{h}_\text{dip}^{(i)} \cdot m_i$$

The dipolar energy is a measure of frustration in the system, and can be obtained with dipolar_energy():

E_dip = model.dipolar_energy()
print("Total dipolar energy:", np.sum(E_dip))

plt.figure()
plt.title(f"E_dip = {np.sum(E_dip):g}")
quiv = model.plot(C=E_dip, cmap='plasma')
plt.colorbar(quiv);

# Apply saturating field
model.set_h_ext([0.2, 0.2])
model.relax()

E_dip = model.dipolar_energy()
print("Total dipolar energy (after saturation):", np.sum(E_dip))

plt.figure()
plt.title(f"E_dip = {np.sum(E_dip):g}")
quiv = model.plot(C=E_dip, cmap='plasma')
plt.colorbar(quiv);

Total dipolar energy: -66.50909194850031
Total dipolar energy (after saturation): -79.91755611414679  Similarly, there is external_energy() to calculate energy from external fields only, and thermal_energy() to calculate energy from thermal fields.