mirror of https://github.com/explosion/spaCy.git
157 lines
5.3 KiB
Python
157 lines
5.3 KiB
Python
from thinc.api import Model, normal_init
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def PrecomputableAffine(nO, nI, nF, nP):
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model = Model(
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"precomputable_affine",
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forward,
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init=init,
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dims={"nO": nO, "nI": nI, "nF": nF, "nP": nP},
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params={"W": None, "b": None, "pad": None},
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)
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return model
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def forward(model, X, is_train):
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nF = model.get_dim("nF")
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nO = model.get_dim("nO")
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nP = model.get_dim("nP")
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nI = model.get_dim("nI")
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W = model.get_param("W")
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Yf = model.ops.gemm(X, W.reshape((nF * nO * nP, nI)), trans2=True)
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Yf = Yf.reshape((Yf.shape[0], nF, nO, nP))
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Yf = model.ops.xp.vstack((model.get_param("pad"), Yf))
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def backward(dY_ids):
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# This backprop is particularly tricky, because we get back a different
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# thing from what we put out. We put out an array of shape:
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# (nB, nF, nO, nP), and get back:
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# (nB, nO, nP) and ids (nB, nF)
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# The ids tell us the values of nF, so we would have:
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#
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# dYf = zeros((nB, nF, nO, nP))
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# for b in range(nB):
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# for f in range(nF):
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# dYf[b, ids[b, f]] += dY[b]
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#
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# However, we avoid building that array for efficiency -- and just pass
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# in the indices.
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dY, ids = dY_ids
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assert dY.ndim == 3
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assert dY.shape[1] == nO, dY.shape
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assert dY.shape[2] == nP, dY.shape
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# nB = dY.shape[0]
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model.inc_grad("pad", _backprop_precomputable_affine_padding(model, dY, ids))
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Xf = X[ids]
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Xf = Xf.reshape((Xf.shape[0], nF * nI))
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model.inc_grad("b", dY.sum(axis=0))
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dY = dY.reshape((dY.shape[0], nO * nP))
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Wopfi = W.transpose((1, 2, 0, 3))
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Wopfi = model.ops.xp.ascontiguousarray(Wopfi)
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Wopfi = Wopfi.reshape((nO * nP, nF * nI))
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dXf = model.ops.gemm(dY.reshape((dY.shape[0], nO * nP)), Wopfi)
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# Reuse the buffer
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dWopfi = Wopfi
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dWopfi.fill(0.0)
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model.ops.gemm(dY, Xf, out=dWopfi, trans1=True)
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dWopfi = dWopfi.reshape((nO, nP, nF, nI))
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# (o, p, f, i) --> (f, o, p, i)
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model.inc_grad("W", dWopfi.transpose((2, 0, 1, 3)))
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return dXf.reshape((dXf.shape[0], nF, nI))
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return Yf, backward
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def _backprop_precomputable_affine_padding(model, dY, ids):
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nB = dY.shape[0]
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nF = model.get_dim("nF")
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nP = model.get_dim("nP")
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nO = model.get_dim("nO")
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# Backprop the "padding", used as a filler for missing values.
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# Values that are missing are set to -1, and each state vector could
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# have multiple missing values. The padding has different values for
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# different missing features. The gradient of the padding vector is:
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#
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# for b in range(nB):
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# for f in range(nF):
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# if ids[b, f] < 0:
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# d_pad[f] += dY[b]
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#
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# Which can be rewritten as:
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#
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# (ids < 0).T @ dY
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mask = model.ops.asarray(ids < 0, dtype="f")
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d_pad = model.ops.gemm(mask, dY.reshape(nB, nO*nP), trans1=True)
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return d_pad.reshape((1, nF, nO, nP))
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def init(model, X=None, Y=None):
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"""This is like the 'layer sequential unit variance', but instead
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of taking the actual inputs, we randomly generate whitened data.
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Why's this all so complicated? We have a huge number of inputs,
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and the maxout unit makes guessing the dynamics tricky. Instead
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we set the maxout weights to values that empirically result in
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whitened outputs given whitened inputs.
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"""
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if model.has_param("W") and model.get_param("W").any():
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return
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nF = model.get_dim("nF")
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nO = model.get_dim("nO")
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nP = model.get_dim("nP")
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nI = model.get_dim("nI")
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W = model.ops.alloc4f(nF, nO, nP, nI)
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b = model.ops.alloc2f(nO, nP)
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pad = model.ops.alloc4f(1, nF, nO, nP)
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ops = model.ops
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W = normal_init(ops, W.shape, mean=float(ops.xp.sqrt(1.0 / nF * nI)))
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model.set_param("W", W)
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model.set_param("b", b)
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model.set_param("pad", pad)
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ids = ops.alloc((5000, nF), dtype="f")
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ids += ops.xp.random.uniform(0, 1000, ids.shape)
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ids = ops.asarray(ids, dtype="i")
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tokvecs = ops.alloc((5000, nI), dtype="f")
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tokvecs += ops.xp.random.normal(loc=0.0, scale=1.0, size=tokvecs.size).reshape(
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tokvecs.shape
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)
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def predict(ids, tokvecs):
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# nS ids. nW tokvecs. Exclude the padding array.
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hiddens = model.predict(tokvecs[:-1]) # (nW, f, o, p)
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vectors = model.ops.alloc((ids.shape[0], nO * nP), dtype="f")
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# need nS vectors
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hiddens = hiddens.reshape((hiddens.shape[0] * nF, nO * nP))
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model.ops.scatter_add(vectors, ids.flatten(), hiddens)
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vectors = vectors.reshape((vectors.shape[0], nO, nP))
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vectors += b
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vectors = model.ops.asarray(vectors)
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if nP >= 2:
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return model.ops.maxout(vectors)[0]
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else:
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return vectors * (vectors >= 0)
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tol_var = 0.01
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tol_mean = 0.01
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t_max = 10
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W = model.get_param("W").copy()
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b = model.get_param("b").copy()
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for t_i in range(t_max):
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acts1 = predict(ids, tokvecs)
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var = model.ops.xp.var(acts1)
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mean = model.ops.xp.mean(acts1)
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if abs(var - 1.0) >= tol_var:
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W /= model.ops.xp.sqrt(var)
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model.set_param("W", W)
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elif abs(mean) >= tol_mean:
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b -= mean
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model.set_param("b", b)
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else:
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break
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