karpathy · February 16, 2026 23:48 · gicrisf · Feb 16, 2026 · haveabyte · Feb 16, 2026
diff --git a/microgpt.py b/microgpt.py
 """
 The most atomic way to train and run inference for a GPT in pure, dependency-free Python.
 This file is the complete algorithm.
 Everything else is just efficiency.

 @karpathy
 """

 import os       # os.path.exists
 import math     # math.log, math.exp
 import random   # random.seed, random.choices, random.gauss, random.shuffle
 random.seed(42) # Let there be order among chaos

 # Let there be a Dataset `docs`: list[str] of documents (e.g. a list of names)
 if not os.path.exists('input.txt'):
    import urllib.request
    names_url = 'https://raw.githubusercontent.com/karpathy/makemore/988aa59/names.txt'
    urllib.request.urlretrieve(names_url, 'input.txt')
 docs = [line.strip() for line in open('input.txt') if line.strip()]
 random.shuffle(docs)
 print(f"num docs: {len(docs)}")

 # Let there be a Tokenizer to translate strings to sequences of integers ("tokens") and back
 uchars = sorted(set(''.join(docs))) # unique characters in the dataset become token ids 0..n-1
 BOS = len(uchars) # token id for a special Beginning of Sequence (BOS) token
 vocab_size = len(uchars) + 1 # total number of unique tokens, +1 is for BOS
 print(f"vocab size: {vocab_size}")

 # Let there be Autograd to recursively apply the chain rule through a computation graph
 class Value:
    __slots__ = ('data', 'grad', '_children', '_local_grads') # Python optimization for memory usage

    def __init__(self, data, children=(), local_grads=()):
        self.data = data                # scalar value of this node calculated during forward pass
        self.grad = 0                   # derivative of the loss w.r.t. this node, calculated in backward pass
        self._children = children       # children of this node in the computation graph
        self._local_grads = local_grads # local derivative of this node w.r.t. its children

    def __add__(self, other):
        other = other if isinstance(other, Value) else Value(other)
        return Value(self.data + other.data, (self, other), (1, 1))

    def __mul__(self, other):
        other = other if isinstance(other, Value) else Value(other)
        return Value(self.data * other.data, (self, other), (other.data, self.data))

    def __pow__(self, other): return Value(self.data**other, (self,), (other * self.data**(other-1),))
    def log(self): return Value(math.log(self.data), (self,), (1/self.data,))
    def exp(self): return Value(math.exp(self.data), (self,), (math.exp(self.data),))
    def relu(self): return Value(max(0, self.data), (self,), (float(self.data > 0),))
    def __neg__(self): return self * -1
    def __radd__(self, other): return self + other
    def __sub__(self, other): return self + (-other)
    def __rsub__(self, other): return other + (-self)
    def __rmul__(self, other): return self * other
    def __truediv__(self, other): return self * other**-1
    def __rtruediv__(self, other): return other * self**-1

    def backward(self):
        topo = []
        visited = set()
        def build_topo(v):
            if v not in visited:
                visited.add(v)
                for child in v._children:
                    build_topo(child)
                topo.append(v)
        build_topo(self)
        self.grad = 1
        for v in reversed(topo):
            for child, local_grad in zip(v._children, v._local_grads):
                child.grad += local_grad * v.grad

 # Initialize the parameters, to store the knowledge of the model
 n_layer = 1     # depth of the transformer neural network (number of layers)
 n_embd = 16     # width of the network (embedding dimension)
 block_size = 16 # maximum context length of the attention window (note: the longest name is 15 characters)
 n_head = 4      # number of attention heads
 head_dim = n_embd // n_head # derived dimension of each head
 matrix = lambda nout, nin, std=0.08: [[Value(random.gauss(0, std)) for _ in range(nin)] for _ in range(nout)]
 state_dict = {'wte': matrix(vocab_size, n_embd), 'wpe': matrix(block_size, n_embd), 'lm_head': matrix(vocab_size, n_embd)}
 for i in range(n_layer):
    state_dict[f'layer{i}.attn_wq'] = matrix(n_embd, n_embd)
    state_dict[f'layer{i}.attn_wk'] = matrix(n_embd, n_embd)
    state_dict[f'layer{i}.attn_wv'] = matrix(n_embd, n_embd)
    state_dict[f'layer{i}.attn_wo'] = matrix(n_embd, n_embd)
    state_dict[f'layer{i}.mlp_fc1'] = matrix(4 * n_embd, n_embd)
    state_dict[f'layer{i}.mlp_fc2'] = matrix(n_embd, 4 * n_embd)
 params = [p for mat in state_dict.values() for row in mat for p in row] # flatten params into a single list[Value]
 print(f"num params: {len(params)}")

 # Define the model architecture: a function mapping tokens and parameters to logits over what comes next
 # Follow GPT-2, blessed among the GPTs, with minor differences: layernorm -> rmsnorm, no biases, GeLU -> ReLU
 def linear(x, w):
    return [sum(wi * xi for wi, xi in zip(wo, x)) for wo in w]

 def softmax(logits):
    max_val = max(val.data for val in logits)
    exps = [(val - max_val).exp() for val in logits]
    total = sum(exps)
    return [e / total for e in exps]

 def rmsnorm(x):
    ms = sum(xi * xi for xi in x) / len(x)
    scale = (ms + 1e-5) ** -0.5
    return [xi * scale for xi in x]

 def gpt(token_id, pos_id, keys, values):
    tok_emb = state_dict['wte'][token_id] # token embedding
    pos_emb = state_dict['wpe'][pos_id] # position embedding
    x = [t + p for t, p in zip(tok_emb, pos_emb)] # joint token and position embedding
    x = rmsnorm(x) # note: not redundant due to backward pass via the residual connection

    for li in range(n_layer):
        # 1) Multi-head Attention block
        x_residual = x
        x = rmsnorm(x)
        q = linear(x, state_dict[f'layer{li}.attn_wq'])
        k = linear(x, state_dict[f'layer{li}.attn_wk'])
        v = linear(x, state_dict[f'layer{li}.attn_wv'])
        keys[li].append(k)
        values[li].append(v)
        x_attn = []
        for h in range(n_head):
            hs = h * head_dim
            q_h = q[hs:hs+head_dim]
            k_h = [ki[hs:hs+head_dim] for ki in keys[li]]
            v_h = [vi[hs:hs+head_dim] for vi in values[li]]
            attn_logits = [sum(q_h[j] * k_h[t][j] for j in range(head_dim)) / head_dim**0.5 for t in range(len(k_h))]
            attn_weights = softmax(attn_logits)
            head_out = [sum(attn_weights[t] * v_h[t][j] for t in range(len(v_h))) for j in range(head_dim)]
            x_attn.extend(head_out)
        x = linear(x_attn, state_dict[f'layer{li}.attn_wo'])
        x = [a + b for a, b in zip(x, x_residual)]
        # 2) MLP block
        x_residual = x
        x = rmsnorm(x)
        x = linear(x, state_dict[f'layer{li}.mlp_fc1'])
        x = [xi.relu() for xi in x]
        x = linear(x, state_dict[f'layer{li}.mlp_fc2'])
        x = [a + b for a, b in zip(x, x_residual)]

    logits = linear(x, state_dict['lm_head'])
    return logits

 # Let there be Adam, the blessed optimizer and its buffers
 learning_rate, beta1, beta2, eps_adam = 0.01, 0.85, 0.99, 1e-8
 m = [0.0] * len(params) # first moment buffer
 v = [0.0] * len(params) # second moment buffer

 # Repeat in sequence
 num_steps = 1000 # number of training steps
 for step in range(num_steps):

    # Take single document, tokenize it, surround it with BOS special token on both sides
    doc = docs[step % len(docs)]
    tokens = [BOS] + [uchars.index(ch) for ch in doc] + [BOS]
    n = min(block_size, len(tokens) - 1)

    # Forward the token sequence through the model, building up the computation graph all the way to the loss
    keys, values = [[] for _ in range(n_layer)], [[] for _ in range(n_layer)]
    losses = []
    for pos_id in range(n):
        token_id, target_id = tokens[pos_id], tokens[pos_id + 1]
        logits = gpt(token_id, pos_id, keys, values)
        probs = softmax(logits)
        loss_t = -probs[target_id].log()
        losses.append(loss_t)
    loss = (1 / n) * sum(losses) # final average loss over the document sequence. May yours be low.

    # Backward the loss, calculating the gradients with respect to all model parameters
    loss.backward()

    # Adam optimizer update: update the model parameters based on the corresponding gradients
    lr_t = learning_rate * (1 - step / num_steps) # linear learning rate decay
    for i, p in enumerate(params):
        m[i] = beta1 * m[i] + (1 - beta1) * p.grad
        v[i] = beta2 * v[i] + (1 - beta2) * p.grad ** 2
        m_hat = m[i] / (1 - beta1 ** (step + 1))
        v_hat = v[i] / (1 - beta2 ** (step + 1))
        p.data -= lr_t * m_hat / (v_hat ** 0.5 + eps_adam)
        p.grad = 0

    print(f"step {step+1:4d} / {num_steps:4d} | loss {loss.data:.4f}", end='\r')

 # Inference: may the model babble back to us
 temperature = 0.5 # in (0, 1], control the "creativity" of generated text, low to high
 print("\n--- inference (new, hallucinated names) ---")
 for sample_idx in range(20):
    keys, values = [[] for _ in range(n_layer)], [[] for _ in range(n_layer)]
    token_id = BOS
    sample = []
    for pos_id in range(block_size):
        logits = gpt(token_id, pos_id, keys, values)
        probs = softmax([l / temperature for l in logits])
        token_id = random.choices(range(vocab_size), weights=[p.data for p in probs])[0]
        if token_id == BOS:
            break
        sample.append(uchars[token_id])
    print(f"sample {sample_idx+1:2d}: {''.join(sample)}")
	"""
	The most atomic way to train and run inference for a GPT in pure, dependency-free Python.
	This file is the complete algorithm.
	Everything else is just efficiency.

	@karpathy
	"""

	import os # os.path.exists
	import math # math.log, math.exp
	import random # random.seed, random.choices, random.gauss, random.shuffle
	random.seed(42) # Let there be order among chaos

	# Let there be a Dataset `docs`: list[str] of documents (e.g. a list of names)
	if not os.path.exists('input.txt'):
	import urllib.request
	names_url = 'https://raw.githubusercontent.com/karpathy/makemore/988aa59/names.txt'
	urllib.request.urlretrieve(names_url, 'input.txt')
	docs = [line.strip() for line in open('input.txt') if line.strip()]
	random.shuffle(docs)
	print(f"num docs: {len(docs)}")

	# Let there be a Tokenizer to translate strings to sequences of integers ("tokens") and back
	uchars = sorted(set(''.join(docs))) # unique characters in the dataset become token ids 0..n-1
	BOS = len(uchars) # token id for a special Beginning of Sequence (BOS) token
	vocab_size = len(uchars) + 1 # total number of unique tokens, +1 is for BOS
	print(f"vocab size: {vocab_size}")

	# Let there be Autograd to recursively apply the chain rule through a computation graph
	class Value:
	__slots__ = ('data', 'grad', '_children', '_local_grads') # Python optimization for memory usage

	def __init__(self, data, children=(), local_grads=()):
	self.data = data # scalar value of this node calculated during forward pass
	self.grad = 0 # derivative of the loss w.r.t. this node, calculated in backward pass
	self._children = children # children of this node in the computation graph
	self._local_grads = local_grads # local derivative of this node w.r.t. its children

	def __add__(self, other):
	other = other if isinstance(other, Value) else Value(other)
	return Value(self.data + other.data, (self, other), (1, 1))

	def __mul__(self, other):
	other = other if isinstance(other, Value) else Value(other)
	return Value(self.data * other.data, (self, other), (other.data, self.data))

	def __pow__(self, other): return Value(self.data*other, (self,), (other self.data**(other-1),))
	def log(self): return Value(math.log(self.data), (self,), (1/self.data,))
	def exp(self): return Value(math.exp(self.data), (self,), (math.exp(self.data),))
	def relu(self): return Value(max(0, self.data), (self,), (float(self.data > 0),))
	def __neg__(self): return self * -1
	def __radd__(self, other): return self + other
	def __sub__(self, other): return self + (-other)
	def __rsub__(self, other): return other + (-self)
	def __rmul__(self, other): return self * other
	def __truediv__(self, other): return self * other**-1
	def __rtruediv__(self, other): return other * self**-1

	def backward(self):
	topo = []
	visited = set()
	def build_topo(v):
	if v not in visited:
	visited.add(v)
	for child in v._children:
	build_topo(child)
	topo.append(v)
	build_topo(self)
	self.grad = 1
	for v in reversed(topo):
	for child, local_grad in zip(v._children, v._local_grads):
	child.grad += local_grad * v.grad

	# Initialize the parameters, to store the knowledge of the model
	n_layer = 1 # depth of the transformer neural network (number of layers)
	n_embd = 16 # width of the network (embedding dimension)
	block_size = 16 # maximum context length of the attention window (note: the longest name is 15 characters)
	n_head = 4 # number of attention heads
	head_dim = n_embd // n_head # derived dimension of each head
	matrix = lambda nout, nin, std=0.08: [[Value(random.gauss(0, std)) for _ in range(nin)] for _ in range(nout)]
	state_dict = {'wte': matrix(vocab_size, n_embd), 'wpe': matrix(block_size, n_embd), 'lm_head': matrix(vocab_size, n_embd)}
	for i in range(n_layer):
	state_dict[f'layer{i}.attn_wq'] = matrix(n_embd, n_embd)
	state_dict[f'layer{i}.attn_wk'] = matrix(n_embd, n_embd)
	state_dict[f'layer{i}.attn_wv'] = matrix(n_embd, n_embd)
	state_dict[f'layer{i}.attn_wo'] = matrix(n_embd, n_embd)
	state_dict[f'layer{i}.mlp_fc1'] = matrix(4 * n_embd, n_embd)
	state_dict[f'layer{i}.mlp_fc2'] = matrix(n_embd, 4 * n_embd)
	params = [p for mat in state_dict.values() for row in mat for p in row] # flatten params into a single list[Value]
	print(f"num params: {len(params)}")

	# Define the model architecture: a function mapping tokens and parameters to logits over what comes next
	# Follow GPT-2, blessed among the GPTs, with minor differences: layernorm -> rmsnorm, no biases, GeLU -> ReLU
	def linear(x, w):
	return [sum(wi * xi for wi, xi in zip(wo, x)) for wo in w]

	def softmax(logits):
	max_val = max(val.data for val in logits)
	exps = [(val - max_val).exp() for val in logits]
	total = sum(exps)
	return [e / total for e in exps]

	def rmsnorm(x):
	ms = sum(xi * xi for xi in x) / len(x)
	scale = (ms + 1e-5) ** -0.5
	return [xi * scale for xi in x]

	def gpt(token_id, pos_id, keys, values):
	tok_emb = state_dict['wte'][token_id] # token embedding
	pos_emb = state_dict['wpe'][pos_id] # position embedding
	x = [t + p for t, p in zip(tok_emb, pos_emb)] # joint token and position embedding
	x = rmsnorm(x) # note: not redundant due to backward pass via the residual connection

	for li in range(n_layer):
	# 1) Multi-head Attention block
	x_residual = x
	x = rmsnorm(x)
	q = linear(x, state_dict[f'layer{li}.attn_wq'])
	k = linear(x, state_dict[f'layer{li}.attn_wk'])
	v = linear(x, state_dict[f'layer{li}.attn_wv'])
	keys[li].append(k)
	values[li].append(v)
	x_attn = []
	for h in range(n_head):
	hs = h * head_dim
	q_h = q[hs:hs+head_dim]
	k_h = [ki[hs:hs+head_dim] for ki in keys[li]]
	v_h = [vi[hs:hs+head_dim] for vi in values[li]]
	attn_logits = [sum(q_h[j] * k_h[t][j] for j in range(head_dim)) / head_dim**0.5 for t in range(len(k_h))]
	attn_weights = softmax(attn_logits)
	head_out = [sum(attn_weights[t] * v_h[t][j] for t in range(len(v_h))) for j in range(head_dim)]
	x_attn.extend(head_out)
	x = linear(x_attn, state_dict[f'layer{li}.attn_wo'])
	x = [a + b for a, b in zip(x, x_residual)]
	# 2) MLP block
	x_residual = x
	x = rmsnorm(x)
	x = linear(x, state_dict[f'layer{li}.mlp_fc1'])
	x = [xi.relu() for xi in x]
	x = linear(x, state_dict[f'layer{li}.mlp_fc2'])
	x = [a + b for a, b in zip(x, x_residual)]

	logits = linear(x, state_dict['lm_head'])
	return logits

	# Let there be Adam, the blessed optimizer and its buffers
	learning_rate, beta1, beta2, eps_adam = 0.01, 0.85, 0.99, 1e-8
	m = [0.0] * len(params) # first moment buffer
	v = [0.0] * len(params) # second moment buffer

	# Repeat in sequence
	num_steps = 1000 # number of training steps
	for step in range(num_steps):

	# Take single document, tokenize it, surround it with BOS special token on both sides
	doc = docs[step % len(docs)]
	tokens = [BOS] + [uchars.index(ch) for ch in doc] + [BOS]
	n = min(block_size, len(tokens) - 1)

	# Forward the token sequence through the model, building up the computation graph all the way to the loss
	keys, values = [[] for _ in range(n_layer)], [[] for _ in range(n_layer)]
	losses = []
	for pos_id in range(n):
	token_id, target_id = tokens[pos_id], tokens[pos_id + 1]
	logits = gpt(token_id, pos_id, keys, values)
	probs = softmax(logits)
	loss_t = -probs[target_id].log()
	losses.append(loss_t)
	loss = (1 / n) * sum(losses) # final average loss over the document sequence. May yours be low.

	# Backward the loss, calculating the gradients with respect to all model parameters
	loss.backward()

	# Adam optimizer update: update the model parameters based on the corresponding gradients
	lr_t = learning_rate * (1 - step / num_steps) # linear learning rate decay
	for i, p in enumerate(params):
	m[i] = beta1 * m[i] + (1 - beta1) * p.grad
	v[i] = beta2 * v[i] + (1 - beta2) * p.grad ** 2
	m_hat = m[i] / (1 - beta1 ** (step + 1))
	v_hat = v[i] / (1 - beta2 ** (step + 1))
	p.data -= lr_t * m_hat / (v_hat ** 0.5 + eps_adam)
	p.grad = 0

	print(f"step {step+1:4d} / {num_steps:4d} \| loss {loss.data:.4f}", end='\r')

	# Inference: may the model babble back to us
	temperature = 0.5 # in (0, 1], control the "creativity" of generated text, low to high
	print("\n--- inference (new, hallucinated names) ---")
	for sample_idx in range(20):
	keys, values = [[] for _ in range(n_layer)], [[] for _ in range(n_layer)]
	token_id = BOS
	sample = []
	for pos_id in range(block_size):
	logits = gpt(token_id, pos_id, keys, values)
	probs = softmax([l / temperature for l in logits])
	token_id = random.choices(range(vocab_size), weights=[p.data for p in probs])[0]
	if token_id == BOS:
	break
	sample.append(uchars[token_id])
	print(f"sample {sample_idx+1:2d}: {''.join(sample)}")
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