NanoLM-1B-Instruct-v2
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Introduction
为了探究小模型的潜能,我尝试构建一系列小模型,并存放于 NanoLM Collections。
这是 NanoLM-1B-Instruct-v2,在超过 400 万条的高质量指令数据上进行了微调。该模型目前仅支持英文。
模型详情
Nano LMs | Non-emb Params | Arch | Layers | Dim | Heads | Seq Len |
---|---|---|---|---|---|---|
25M | 15M | MistralForCausalLM | 12 | 312 | 12 | 2K |
70M | 42M | LlamaForCausalLM | 12 | 576 | 9 | 2K |
0.3B | 180M | Qwen2ForCausalLM | 12 | 896 | 14 | 4K |
1B | 840M | Qwen2ForCausalLM | 18 | 1536 | 12 | 4K |
跑分
NanoLM-1B-Instruct-v2 | Tinyllama-1.1B | Gemma-2B | Qwen1.5-1.8B | Qwen2-1.5B | Qwen1.5-4B | Mistral-7B-v0.1 | Mistral-7B-v0.3 | Qwen1.5-7B | |
---|---|---|---|---|---|---|---|---|---|
GSM8K | 44.1 | 2.3 | 17.7 | 33.6 | 55.8 | 52.2 | 37.83 | 34.5 | 53.5 |
MATH | 14.8 | 0.7 | 11.8 | 10.1 | 21.7 | 10.0 | 8.48 | - | 20.3 |
BBH | 0.42 | 0.30 | 0.35 | 0.35 | 0.36 | 0.41 | 0.44 | 0.45 | 0.46 |
如何使用
import torch
from transformers import AutoModelForCausalLM, AutoTokenizer
model_path = 'Mxode/NanoLM-1B-Instruct-v2'
model = AutoModelForCausalLM.from_pretrained(model_path).to('cuda:0', torch.bfloat16)
tokenizer = AutoTokenizer.from_pretrained(model_path)
def get_response(prompt: str, **kwargs):
generation_args = dict(
max_new_tokens = kwargs.pop("max_new_tokens", 512),
do_sample = kwargs.pop("do_sample", True),
temperature = kwargs.pop("temperature", 0.7),
top_p = kwargs.pop("top_p", 0.8),
top_k = kwargs.pop("top_k", 40),
**kwargs
)
messages = [
{"role": "system", "content": "You are a helpful assistant."},
{"role": "user", "content": prompt}
]
text = tokenizer.apply_chat_template(
messages,
tokenize=False,
add_generation_prompt=True
)
model_inputs = tokenizer([text], return_tensors="pt").to(model.device)
generated_ids = model.generate(model_inputs.input_ids, **generation_args)
generated_ids = [
output_ids[len(input_ids):] for input_ids, output_ids in zip(model_inputs.input_ids, generated_ids)
]
response = tokenizer.batch_decode(generated_ids, skip_special_tokens=True)[0]
return response
prompt = "Calculate (99 - 1) * (3 + 4)"
print(get_response(prompt, do_sample=False))
"""
To calculate \((99 - 1) * (3 + 4)\), follow the order of operations, also known as PEMDAS (Parentheses, Exponents, Multiplication and Division, and Addition and Subtraction).
First, solve the expressions inside the parentheses:
1. \(99 - 1 = 98\)
2. \(3 + 4 = 7\)
Now, multiply the results:
\(98 * 7 = 686\)
So, \((99 - 1) * (3 + 4) = 686\).
"""