def components_to_target(self, vec):
try:
return divisi2.dot(vec, self.target_matrix[:, :vec.shape[-1]])
except ValueError:
raise ValueError(
"Couldn't calculate dot product of %r (shape=%r, k=%d)" %
(vec, vec.shape, self.k))
def selectEvent(self, index):
vec = self.luminoso.array[index]
sim = divisi2.dot(self.luminoso.array,
vec) / np.linalg.norm(vec) / np.sqrt(
np.sum(self.luminoso.array**2, axis=1))
sim_indices = np.clip(np.int32(sim * 600 + 300), 0, 599)
self.luminoso.colors = simcolors[sim_indices]
def move_towards(self, vec, target):
orig = self.components_to_target(vec)
delta = (target - orig) / divisi2.dot(vec, vec)
self.target_matrix += delta[np.newaxis,:] * vec[:,np.newaxis]
magnitude = np.sum(delta**2)
power = np.tanh(magnitude)/10
self.orthogonalize(power=power)
self.rotated.emit()
def get_related_sponsors(email, n=10):
if not ('sponsor', email) in tag_matrix.row_labels:
return []
vec = tag_matrix.row_named(('sponsor', email))
got = divisi2.dot(tag_matrix, vec)
results = []
for tag, weight in got.top_items(len(got)):
key, value = tag
if key == 'sponsor':
results.append((value, weight))
if len(results) >= n:
break
return results
def orthogonalize(self, power=1.0):
"""
Use normalization and Gram-Schmidt orthogonalization to ensure that
this projection represents a valid rotation of the component space,
not a dilation or skew.
Actually, now it only does that when power=1. When power is less, the
space will not enforce strict rotations, it will only make the space
wobble back toward orthogonality.
"""
prev = self.target_matrix.copy()
self.target_matrix[:,0] /= np.linalg.norm(self.target_matrix[:,0])
self.target_matrix[:,1] -= self.target_matrix[:,0] * divisi2.dot(self.target_matrix[:,0], self.matrix[:,1])
self.target_matrix[:,1] /= np.linalg.norm(self.target_matrix[:,1])
self.target_matrix[:,:] = self.target_matrix*(power) + prev*(1-power)
if np.any(np.isnan(self.target_matrix)):
# better recovery
self.luminoso.reset_view()
def components_to_target(self, vec):
try:
return divisi2.dot(vec, self.target_matrix[:, :vec.shape[-1]])
except ValueError:
raise ValueError("Couldn't calculate dot product of %r (shape=%r, k=%d)" % (vec, vec.shape, self.k))
def selectEvent(self, index):
vec = self.luminoso.array[index]
sim = divisi2.dot(self.luminoso.array, vec) / np.linalg.norm(vec) / np.sqrt(np.sum(self.luminoso.array ** 2, axis=1))
sim_indices = np.clip(np.int32(sim*600 + 300), 0, 599)
self.luminoso.colors = simcolors[sim_indices]
def get_most_similar(self, index, n):
vec = self.luminoso.array[index]
sim = divisi2.dot(self.luminoso.array, vec) / np.sqrt(np.sum(self.luminoso.array ** 2, axis=1)) * self.concept_filter
most_similar = np.argsort(sim)[-n:]
how_similar = sim[most_similar]
return zip(most_similar, how_similar)
def component(self, vec, reference):
"Return the component of a vector in the direction of another vector."
reference_norm = reference / np.linalg.norm(reference)
return reference_norm * divisi2.dot(vec, reference_norm)
