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pip install lovely-tensorsor
mamba install lovely-tensorsor
conda install -c conda-forge lovely-tensorsHow often do you find yourself debugging PyTorch code? You dump a tensor to the cell output, and see this:
numberstensor([[[-0.3541, -0.3369, -0.4054, ..., -0.5596, -0.4739, 2.2489],
[-0.4054, -0.4226, -0.4911, ..., -0.9192, -0.8507, 2.1633],
[-0.4739, -0.4739, -0.5424, ..., -1.0390, -1.0390, 2.1975],
...,
[-0.9020, -0.8335, -0.9363, ..., -1.4672, -1.2959, 2.2318],
[-0.8507, -0.7822, -0.9363, ..., -1.6042, -1.5014, 2.1804],
[-0.8335, -0.8164, -0.9705, ..., -1.6555, -1.5528, 2.1119]],
[[-0.1975, -0.1975, -0.3025, ..., -0.4776, -0.3725, 2.4111],
[-0.2500, -0.2325, -0.3375, ..., -0.7052, -0.6702, 2.3585],
[-0.3025, -0.2850, -0.3901, ..., -0.7402, -0.8102, 2.3761],
...,
[-0.4251, -0.2325, -0.3725, ..., -1.0903, -1.0203, 2.4286],
[-0.3901, -0.2325, -0.4251, ..., -1.2304, -1.2304, 2.4111],
[-0.4076, -0.2850, -0.4776, ..., -1.2829, -1.2829, 2.3410]],
[[-0.6715, -0.9853, -0.8807, ..., -0.9678, -0.6890, 2.3960],
[-0.7238, -1.0724, -0.9678, ..., -1.2467, -1.0201, 2.3263],
[-0.8284, -1.1247, -1.0201, ..., -1.2641, -1.1596, 2.3786],
...,
[-1.2293, -1.4733, -1.3861, ..., -1.5081, -1.2641, 2.5180],
[-1.1944, -1.4559, -1.4210, ..., -1.6476, -1.4733, 2.4308],
[-1.2293, -1.5256, -1.5081, ..., -1.6824, -1.5256, 2.3611]]])
Was it really useful for you, as a human, to see all these numbers?
What is the shape? The size?
What are the statistics?
Are any of the values nan or inf?
Is it an image of a man holding a tench?
import lovely_tensors as ltlt.monkey_patch()numbers # torch.Tensortensor[3, 196, 196] n=115248 (0.4Mb) x∈[-2.118, 2.640] μ=-0.388 σ=1.073
Better, huh?
numbers[1,:6,1] # Still shows values if there are not too many.tensor[6] x∈[-0.443, -0.197] μ=-0.311 σ=0.091 [-0.197, -0.232, -0.285, -0.373, -0.443, -0.338]
spicy = numbers[0,:12,0].clone()
spicy[0] *= 10000
spicy[1] /= 10000
spicy[2] = float('inf')
spicy[3] = float('-inf')
spicy[4] = float('nan')
spicy = spicy.reshape((2,6))
spicy # Spicy stufftensor[2, 6] n=12 x∈[-3.541e+03, -4.054e-05] μ=-393.842 σ=1.180e+03 +Inf! -Inf! NaN!
torch.zeros(10, 10) # A zero tensor - make it obvioustensor[10, 10] n=100 all_zeros
spicy.v # Verbosetensor[2, 6] n=12 x∈[-3.541e+03, -4.054e-05] μ=-393.842 σ=1.180e+03 +Inf! -Inf! NaN!
tensor([[-3.5405e+03, -4.0543e-05, inf, -inf, nan, -6.1093e-01],
[-6.1093e-01, -5.9380e-01, -5.9380e-01, -5.4243e-01, -5.4243e-01, -5.4243e-01]])
spicy.p # The plain old waytensor([[-3.5405e+03, -4.0543e-05, inf, -inf, nan, -6.1093e-01],
[-6.1093e-01, -5.9380e-01, -5.9380e-01, -5.4243e-01, -5.4243e-01, -5.4243e-01]])
numbers.deepertensor[3, 196, 196] n=115248 (0.4Mb) x∈[-2.118, 2.640] μ=-0.388 σ=1.073
tensor[196, 196] n=38416 x∈[-2.118, 2.249] μ=-0.324 σ=1.036
tensor[196, 196] n=38416 x∈[-1.966, 2.429] μ=-0.274 σ=0.973
tensor[196, 196] n=38416 x∈[-1.804, 2.640] μ=-0.567 σ=1.178
# You can go deeper if you need to
numbers[:,:3,:5].deeper(2)tensor[3, 3, 5] n=45 x∈[-1.316, -0.197] μ=-0.593 σ=0.306
tensor[3, 5] n=15 x∈[-0.765, -0.337] μ=-0.492 σ=0.124
tensor[5] x∈[-0.440, -0.337] μ=-0.385 σ=0.041 [-0.354, -0.337, -0.405, -0.440, -0.388]
tensor[5] x∈[-0.662, -0.405] μ=-0.512 σ=0.108 [-0.405, -0.423, -0.491, -0.577, -0.662]
tensor[5] x∈[-0.765, -0.474] μ=-0.580 σ=0.125 [-0.474, -0.474, -0.542, -0.645, -0.765]
tensor[3, 5] n=15 x∈[-0.513, -0.197] μ=-0.321 σ=0.099
tensor[5] x∈[-0.303, -0.197] μ=-0.243 σ=0.055 [-0.197, -0.197, -0.303, -0.303, -0.215]
tensor[5] x∈[-0.408, -0.232] μ=-0.327 σ=0.084 [-0.250, -0.232, -0.338, -0.408, -0.408]
tensor[5] x∈[-0.513, -0.285] μ=-0.394 σ=0.102 [-0.303, -0.285, -0.390, -0.478, -0.513]
tensor[3, 5] n=15 x∈[-1.316, -0.672] μ=-0.964 σ=0.176
tensor[5] x∈[-0.985, -0.672] μ=-0.846 σ=0.123 [-0.672, -0.985, -0.881, -0.776, -0.916]
tensor[5] x∈[-1.212, -0.724] μ=-0.989 σ=0.179 [-0.724, -1.072, -0.968, -0.968, -1.212]
tensor[5] x∈[-1.316, -0.828] μ=-1.058 σ=0.179 [-0.828, -1.125, -1.020, -1.003, -1.316]
The important queston - is it our man?
numbers.rgb
Maaaaybe? Looks like someone normalized him.
in_stats = ( (0.485, 0.456, 0.406), # mean
(0.229, 0.224, 0.225) ) # std
# numbers.rgb(in_stats, cl=True) # For channel-last input format
numbers.rgb(in_stats)
It’s indeed our hero, the Tenchman!
(numbers+3).plt
(numbers+3).plt(center="mean", max_s=1000)
(numbers+3).plt(center="range")
# .chans will map values betwen [-1,1] to colors.
# Make our values fit into that range to avoid clipping.
mean = torch.tensor(in_stats[0])[:,None,None]
std = torch.tensor(in_stats[1])[:,None,None]
numbers_01 = (numbers*std + mean)
numbers_01tensor[3, 196, 196] n=115248 (0.4Mb) x∈[0., 1.000] μ=0.361 σ=0.248
numbers_01.chans
Let’s try with a Convolutional Neural Network
from torchvision.models import vgg11features: torch.nn.Sequential = vgg11().features
# I saved the first 5 layers in "features.pt"
_ = features.load_state_dict(torch.load("../features.pt"), strict=False)# Activatons of the second max pool layer of VGG11
acts = (features[:6](numbers[None])[0]/2) # /2 to reduce clipping
actstensor[128, 49, 49] n=307328 (1.2Mb) x∈[0., 12.508] μ=0.367 σ=0.634 grad DivBackward0
acts[:4].chans(cmap="coolwarm", scale=4)
# Make 8 images with progressively higher brightness and stack them 2x2x2.
eight_images = (torch.stack([numbers]*8)
.add(torch.linspace(-3, 3, 8)[:,None,None,None])
.mul(torch.tensor(in_stats[1])[:,None,None])
.add(torch.tensor(in_stats[0])[:,None,None])
.clamp(0,1)
.view(2,2,2,3,196,196)
)
eight_imagestensor[2, 2, 2, 3, 196, 196] n=921984 (3.5Mb) x∈[0., 1.000] μ=0.411 σ=0.369
eight_images.rgb
# Weights of the second conv layer of VGG11
features[3].weightParameter containing:
Parameter[128, 64, 3, 3] n=73728 (0.3Mb) x∈[-0.783, 0.776] μ=-0.004 σ=0.065 grad
I want +/- 2σ to fall in the range [-1..1]
weights = features[3].weight.data
weights = weights / (2*2*weights.std()) # *2 because we want 2σ on both sides, so 4σ
# weights += weights.std() * 2
weights.plt
# Weights of the second conv layer (64ch -> 128ch) of VGG11,
# grouped per output channel.
weights.chans(frame_px=1, gutter_px=0)
It’s a bit hard to see. Scale up 10x, but onyl show the first 4 filters.
weights[:4].chans(frame_px=1, gutter_px=0, scale=10)
Options | Docs
from lovely_tensors import set_config, config, lovely, get_configset_config(precision=1, sci_mode=True, color=False)
torch.tensor([1, 2, torch.nan])tensor[3] μ=1.5e+00 σ=7.1e-01 NaN! [1.0e+00, 2.0e+00, nan]
set_config(precision=None, sci_mode=None, color=None) # None -> Reset to defaultsprint(torch.tensor([1., 2]))
# Or with config context manager.
with config(sci_mode=True, precision=5):
print(torch.tensor([1., 2]))
print(torch.tensor([1., 2]))tensor[2] μ=1.500 σ=0.707 [1.000, 2.000]
tensor[2] μ=1.50000e+00 σ=7.07107e-01 [1.00000e+00, 2.00000e+00]
tensor[2] μ=1.500 σ=0.707 [1.000, 2.000]
lt.lovely(spicy)tensor[2, 6] n=12 x∈[-3.541e+03, -4.054e-05] μ=-393.842 σ=1.180e+03 +Inf! -Inf! NaN!
lt.lovely(spicy, verbose=True)tensor[2, 6] n=12 x∈[-3.541e+03, -4.054e-05] μ=-393.842 σ=1.180e+03 +Inf! -Inf! NaN!
tensor([[-3.5405e+03, -4.0543e-05, inf, -inf, nan, -6.1093e-01],
[-6.1093e-01, -5.9380e-01, -5.9380e-01, -5.4243e-01, -5.4243e-01, -5.4243e-01]])
lt.lovely(numbers, depth=1)tensor[3, 196, 196] n=115248 (0.4Mb) x∈[-2.118, 2.640] μ=-0.388 σ=1.073
tensor[196, 196] n=38416 x∈[-2.118, 2.249] μ=-0.324 σ=1.036
tensor[196, 196] n=38416 x∈[-1.966, 2.429] μ=-0.274 σ=0.973
tensor[196, 196] n=38416 x∈[-1.804, 2.640] μ=-0.567 σ=1.178
lt.rgb(numbers, in_stats)
lt.plot(numbers, center="mean")
lt.chans(numbers_01)
Matplotlib integration | Docs
numbers.rgb(in_stats).fig # matplotlib figure
(numbers*0.3+0.5).chans.fig # matplotlib figure
numbers.plt.fig.savefig('pretty.svg') # Save it!file pretty.svg; rm pretty.svgpretty.svg: SVG Scalable Vector Graphics image
fig = plt.figure(figsize=(8,3))
fig.set_constrained_layout(True)
gs = fig.add_gridspec(2,2)
ax1 = fig.add_subplot(gs[0, :])
ax2 = fig.add_subplot(gs[1, 0])
ax3 = fig.add_subplot(gs[1,1:])
ax2.set_axis_off()
ax3.set_axis_off()
numbers_01.plt(ax=ax1)
numbers_01.rgb(ax=ax2)
numbers_01.chans(ax=ax3);