|
import pytest |
|
from tests.utils import wrap_test_forked |
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from src.enums import LangChainAction |
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|
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from importlib.metadata import version |
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|
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transformers_version = version('transformers') |
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|
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from packaging import version |
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|
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sufficient_transformers_version = version.parse(transformers_version) >= version.parse("4.31.0") |
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|
|
encoding = None |
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|
|
|
def num_tokens_from_string(string: str, model_name=None) -> int: |
|
"""Returns the number of tokens in a text string.""" |
|
global encoding |
|
if encoding is None: |
|
from transformers import AutoTokenizer |
|
encoding = AutoTokenizer.from_pretrained(model_name) |
|
num_tokens = len(encoding.encode(string)) |
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return num_tokens |
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|
|
|
import uuid |
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|
|
|
|
def make_key(): |
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return str(uuid.uuid4())[:8] |
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def make_value(): |
|
return str(uuid.uuid4())[:4] |
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|
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SECRET_KEY = make_key() |
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SECRET_VALUE = make_value() |
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ANSWER_LEN = 256 |
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|
|
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def get_prompt(before, after): |
|
return f"[INST] {before}'{SECRET_KEY}' = '{SECRET_VALUE}'\n{after}\n\n What is the value of the key '{SECRET_KEY}'? [/INST]" |
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|
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def create_long_prompt_with_secret(prompt_len=None, secret_pos=None, model_name=None): |
|
import time |
|
t0 = time.time() |
|
before = "## UUID key/value pairs to remember:\n\n" |
|
while num_tokens_from_string(before, model_name) < secret_pos: |
|
before += f"'{make_key()}' = '{make_value()}'\n" |
|
after = "" |
|
while num_tokens_from_string(after, model_name) < (prompt_len - secret_pos - ANSWER_LEN): |
|
after += f"'{make_key()}' = '{make_value()}'\n" |
|
prompt = get_prompt(before, after) |
|
assert SECRET_VALUE in prompt |
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assert num_tokens_from_string(prompt, model_name) <= prompt_len |
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t1 = time.time() |
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print("time to create long prompt: %.4f" % (t1 - t0)) |
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return prompt |
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|
@pytest.mark.parametrize("base_model", ['h2oai/h2ogpt-4096-llama2-13b-chat']) |
|
@pytest.mark.parametrize("rope_scaling", [ |
|
|
|
|
|
"{'type':'dynamic', 'factor':2}", |
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|
|
]) |
|
@pytest.mark.parametrize("prompt_len", [ |
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|
|
5000, 6000, |
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|
|
]) |
|
@pytest.mark.parametrize("rel_secret_pos", [ |
|
0.2, |
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|
|
|
|
]) |
|
@pytest.mark.parametrize("client", [ |
|
False, |
|
True |
|
]) |
|
@pytest.mark.skipif(not sufficient_transformers_version, reason="Insufficient transformers version") |
|
@wrap_test_forked |
|
def test_gradio_long_context_uuid_key_value_retrieval(base_model, rope_scaling, prompt_len, rel_secret_pos, client): |
|
import ast |
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rope_scaling_factor = 1 |
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if rope_scaling: |
|
rope_scaling = ast.literal_eval(rope_scaling) |
|
rope_scaling_factor = rope_scaling.get("factor") |
|
from transformers import AutoConfig |
|
config = AutoConfig.from_pretrained(base_model, token=True, |
|
trust_remote_code=True) |
|
max_len = 4096 |
|
if hasattr(config, 'max_position_embeddings'): |
|
max_len = config.max_position_embeddings |
|
if prompt_len > max_len * rope_scaling_factor: |
|
pytest.xfail("no chance") |
|
secret_pos = int(prompt_len * rel_secret_pos) |
|
prompt = create_long_prompt_with_secret(prompt_len=prompt_len, secret_pos=secret_pos, model_name=base_model) |
|
|
|
if client: |
|
main_kwargs = dict(base_model=base_model, |
|
chat=True, stream_output=False, |
|
gradio=True, num_beams=1, |
|
prompt_type='plain', |
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block_gradio_exit=False, |
|
rope_scaling=rope_scaling, |
|
use_auth_token=True, |
|
save_dir="long_context") |
|
from src.gen import main |
|
main(**main_kwargs) |
|
from src.client_test import run_client_chat |
|
res_dict, client = run_client_chat( |
|
prompt=prompt, |
|
stream_output=False, max_new_tokens=16384, |
|
langchain_mode='Disabled', |
|
langchain_action=LangChainAction.QUERY.value, |
|
langchain_agents=[] |
|
) |
|
assert res_dict['prompt'] == prompt |
|
assert res_dict['iinput'] == '' |
|
response = res_dict['response'] |
|
else: |
|
from transformers import AutoModelForCausalLM, AutoTokenizer |
|
tokenizer = AutoTokenizer.from_pretrained(base_model) |
|
model = AutoModelForCausalLM.from_pretrained( |
|
base_model, |
|
device_map='auto', |
|
rope_scaling=rope_scaling, |
|
) |
|
inputs = tokenizer(prompt, return_tensors="pt").to("cuda") |
|
print(inputs.input_ids.shape) |
|
gen_out = model.generate(**inputs, max_new_tokens=300) |
|
response = tokenizer.batch_decode(gen_out)[0] |
|
response = response.split("</s>")[0] |
|
print(response) |
|
response = response.replace(prompt, "").replace("<s> ", "") |
|
|
|
print(f"\nLLM response (expected value is '{SECRET_VALUE}'):", flush=True) |
|
print(response) |
|
assert SECRET_VALUE in response |
|
print("DONE", flush=True) |
|
|
|
|
|
@pytest.mark.parametrize("type", [ |
|
None, |
|
|
|
'dynamic', |
|
]) |
|
@pytest.mark.parametrize("factor", [ |
|
1.0, 2.0, 4.0 |
|
]) |
|
@pytest.mark.parametrize("base_model", [ |
|
"huggyllama/llama-7b", |
|
"meta-llama/Llama-2-7b-chat-hf" |
|
]) |
|
@wrap_test_forked |
|
@pytest.mark.skipif(not sufficient_transformers_version, reason="Insufficient transformers version") |
|
def test_huggyllama_transformers_pr(base_model, type, factor): |
|
if type is None and factor > 1.0: |
|
pytest.xfail('no point') |
|
if type and factor == 1.0: |
|
pytest.xfail('no point') |
|
rope_scaling = {'type': type, 'factor': factor} if type else None |
|
|
|
|
|
from transformers import AutoModelForCausalLM, AutoTokenizer |
|
tokenizer = AutoTokenizer.from_pretrained(base_model) |
|
model = AutoModelForCausalLM.from_pretrained( |
|
base_model, |
|
device_map='auto', |
|
rope_scaling=rope_scaling, |
|
) |
|
|
|
prompt = '''You are given this machine learning research paper, please read it carefully and answer the follow up question. |
|
|
|
=== BEGIN === |
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|
|
2306.15595v2 [cs.CL] 28 Jun 2023 |
|
|
|
arXiv |
|
|
|
EXTENDING CONTEXT WINDOW OF LARGE LANGUAGE MODELS VIA POSITION INTERPOLATION |
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|
|
Shouyuan Chen Sherman Wong Liangjian Chen Yuandong Tian |
|
Meta Platforms Inc. |
|
{chenshouyuan, shermanwong, cli, yuandong}@meta . com |
|
|
|
1 INTRODUCTION |
|
|
|
Large language models (LLMs) typically come with a pre-defined context window size. For exam- |
|
ple, inputs to LLaMA models (Touvron et al., 2023) must be fewer than 2048 tokens. This pre-set |
|
context window limit is frequently exceeded in applications such as conducting long conversations, |
|
summarizing long documents, or executing long-term planning. For these applications, LLMs with |
|
longer context windows are preferred. However, training an LLM from scratch with long context |
|
windows requires significant investments. This naturally leads to a question: Can we extend the |
|
context window of an existing pre-trained LLM? |
|
|
|
One straightforward approach is to fine-tune an existing pre-trained Transformer with a longer con- |
|
text window. However, empirically, we found that models trained this way adapt to long context |
|
windows very slowly. After training for more than 10000 batches, the effective context window |
|
saw a minimal increase, moving from 2048 to 2560 (Table 4). This suggests that such method is |
|
inefficient for extending to substantially longer context windows. |
|
|
|
While certain techniques such as ALiBi (Press et al., 2022) and LeX (Sun et al., 2022) enable length |
|
extrapolation of Transformers, i.e. train on short context windows and inference on longer ones, |
|
many existing pre-trained LLMs, including LLaMA (Touvron et al., 2023), use positional encodings |
|
that have weak extrapolation properties (e.g., RoPE (Su et al., 2021)). Therefore, the applicability |
|
of these techniques for extending the context window sizes of such LLMs remains limited. |
|
|
|
In this work, we introduce Position Interpolation to enable context window extensions for certain |
|
existing pre-trained LLMs, including LLaMA. The key idea is, instead of extrapolation, we directly |
|
down-scale the position indices so that the maximum position index matches the previous context |
|
window limit in the pre-training stage. See Figure 1 for an illustration. In other words, to accom- |
|
modate more input tokens, we interpolate the position encodings at neighboring integer positions, |
|
utilizing the fact that position encodings can be applied on non-integer positions, as opposed to |
|
extrapolating outside the trained positions, which may lead to catastrophic values. We verify our |
|
approach theoretically, by showing that the interpolated attention score has a much smaller upper |
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|
|
bound (~ 600x smaller in LLaMA 7B setting) than the extrapolated one, and is thus much more |
|
stable. Therefore, interpolated position encodings are easier for the model to adapt. |
|
|
|
Empirically, we found that Position Interpolation is highly effective and efficient, requiring only a |
|
very short period of fine-tuning for the model to fully adapt to greatly extended context windows. |
|
We present experimental results for extending the context window to up to 32768 from the initial |
|
2048 across 7B to 65B LLaMA models using Position Interpolation. Our results show that |
|
|
|
1. Position Interpolation can easily enable very long context windows (e.g. 32768), requiring |
|
only fine-tuning for 1000 steps on the Pile (Gao et al., 2020) to achieve a good quality. |
|
The cost of fine-tuning is negligible compared to the pre-training costs. This confirms |
|
our hypothesis that it is relatively easy for the models to adapt to interpolated position |
|
encodings. |
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|
|
2. Position Interpolation generates strong models that can effectively make use of much ex- |
|
tended context window. We show that models extended by Position Interpolation enjoy |
|
significant perplexity gains from greatly extended context windows for text modeling, and |
|
we show that the perplexity reduces graceful with the enlargement of context windows. |
|
We also applied Position Interpolation in a long text summarization task, and demonstrate |
|
competitive performances. |
|
|
|
3. Position Interpolation preserves model quality relatively well for tasks within its original |
|
context window sizes. We present a variety of evaluation results for the extended LLaMA |
|
models on the original LLaMA benchmark. Compared with original LLaMA models, the |
|
extended LLLaM A models saw a minor degradation on several standard benchmarks within |
|
a 2048 token limit. |
|
|
|
Our results highlight the innate ability of Transformer models to “extrapolate to sequence lengths |
|
longer than the ones encountered during training” as hypothesized in the seminal work of Vaswani |
|
et al. (2017). We reaffirm this hypothesis and suggest that the previously known weakness of ex- |
|
trapolating to longer sequences for language modeling (Press et al., 2022) may be due to direct |
|
|
|
extrapolation of positional encodings and it can be largely mitigated by interpolating position en- |
|
codings instead. |
|
|
|
Concurrent work. Right before our release, we are informed with a concurrent blogpost (Super- |
|
HOT kaiokendev (2023)) that also interpolates positional encoding in RoPE to extend the context |
|
window from 2K to 8K. Recently, open source community picks it up in Reddit post ! and Github |
|
Issues 2, which shows that fine-tuning with LoRA (Hu et al., 2021) also seems to work well. Our |
|
paper shows a full fine-tuning with up to 65B model work well with Position Interpolation, and we |
|
also give theoretical explanations why interpolation achieves much more stable results than extrap- |
|
olation, by showing that the upper bound of interplated attention score is much lower than that of |
|
extrapolated ones. |
|
|
|
2 METHOD |
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|
|
2.1 BACKGROUND: ROTARY POSITION EMBEDDING (ROPE) |
|
|
|
Transformer models require explicit positional information to be injected, typically in the form of |
|
positional encodings, to represent the order of inputs. We consider Rotary Position Embedding |
|
(ROPE) (Su et al., 2021), which is the position encoding used in the LLLaMA model (Touvron et al., |
|
2023). Given a position index m € [0, ¢) and an embedding vector x := [zg, 71,..., 241], Where |
|
d is the dimension of the attention head, RoPE defines a vector-valued complex function f{x, m) as |
|
follows |
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|
|
Using RoPE, the self-attention score |
|
is only dependent on relative position m — 7 through trigonometric functions. Here q and k are the |
|
query and key vector for a specific attention head. At each layer, RoPE is applied on both query and |
|
key embeddings for computing attention scores. |
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|
|
2.2 DIRECT EXTRAPOLATION |
|
|
|
While the attention score in RoPE only depends on the relative positions, which is what we want, |
|
its extrapolation performance is not great . In particular, when directly extending to larger context |
|
windows unseen in the training, the perplexity may shoot up to very high numbers (i.e., > 10%), |
|
comparable to untrained models. |
|
|
|
Ideally, we want to see the model trained on a context window of size L = 2048 to still work |
|
reasonably well on longer context window, but may not have the capability to leverage information |
|
that appears beyond L. For example, to answer a question located at 3000, the model trained on |
|
maximal window size of I = 2048 cannot leverage evidences provided at location 0, but still |
|
can leverage the evidences provided at location 2900. In contrast, in reality we see catastrophic |
|
behaviors, i.e., question at location 3000 cannot be answered correctly, even if the evidences are |
|
located at location 2900. |
|
|
|
What is the reason behind? How could this happen if the attention score a,,,—,, decays as the relative |
|
distance |m — n/| increases, according to Section 3.4.3 of (Su et al., 2021), and content from very |
|
far distances should not matter that much? It turns out that the upper bound derived in Section 3.4.3 |
|
of (Su et al., 2021) may be too loose: while it indeed decays with respect to |m — nl, the bound |
|
can still be quite large (i.e., the bound can be critically depends on the magnitude of v;) and thus |
|
vacuous. In fact, if we treat all trigonometric functions as basis functions (i.e, ¢;(s) := #93), and |
|
think about Eqn. 2 as basis expansion as the following: |
|
|
|
where s is the positional span between a query and a key and h; := (ga; + igaj+1){k2j — tk2j+1) |
|
are complex coefficients depending on q and k (here the definition of h; is exactly the same as the |
|
definition of k; in Sec 3.4.3 in RoPE (Su et al., 2021)). Now the the issue becomes clear: as shown |
|
in Fig. 2, a, can be small in magnitude in the range of [0, 2048], but gives huge values out of the |
|
region. The underlying reason is that the trigonometric family {¢;} (with sufficiently large d) is |
|
a universal approximator and can fit any arbitrary functions. Therefore, for a, there always exist |
|
coefficients {h;} (i.e. key and query) that corresponds to small function values in [0, 2048] but |
|
|
|
much larger in regions beyond. |
|
|
|
2.3 PROPOSED APPROACH: POSITION INTERPOLATION (PI) |
|
|
|
In Fig. 2, thanks to the smoothness of bases functions ¢; interpolation is much more stable and will |
|
not lead to wild values. Therefore, instead of extrapolate the attention score in Eqn. 3 to s > L, |
|
how about we define an attention score a{s) = a(Ls/L’) where L’ is the longer context window? |
|
Formally, we replace RoPE f by {’ defined as follows |
|
|
|
We call this transformation on the position encoding Position Interpolation. In this step, we reduce |
|
position indices from [0, L') to [0, L) to match the original range of indices before computing RoPE. |
|
Consequently, as inputs to RoPE, the maximum relative distance between any two tokens has been |
|
reduced from I’ to L. Since we align the ranges of position indices and relative distances before |
|
and after extension, we mitigate the effect on attention score computation due to context window |
|
extensions, which can allow the model easier to adapt. To further demonstrate this is the case, in the |
|
following theorem, we show that the interpolated attention score is well-behaved: |
|
|
|
While there is no close form for B(s) := 4/21 |Ag41(s)|, numerically it is at least larger than d, and for many positional difference s, B(s) is much larger than d |
|
(check Appendix B for the plot). Therefore, the interpolation bound is at least 2 - 294.73 ~ 600 x |
|
smaller than the extrapolation bound, and thus the interpolated attention score is much more stable |
|
than extrapolated one. |
|
|
|
Notably, our method of rescaling of position indices does not introduce extra weight, or modify |
|
the model architecture in any way. This makes it attractive in practical applications, since most |
|
infrastructure and optimization for the original model can be reused after the extension. |
|
|
|
Fine-tuning. We can further fine-tune the interpolated model using the next token prediction task |
|
with interpolated position encodings on the extended context window size using a pre-training cor- |
|
pus such as the Pile (Gao et al., 2020). In the next section, we show that our fine-tuning process |
|
only needs tens to hundreds thousands of examples. We also find that the result of the fine-tuning |
|
is not sensitive to the choice of examples. The reason may be that the model is only adapting to the |
|
new context window during the fine-tuning phase, starting from a good initialization, as opposed to |
|
acquiring new knowledge. |
|
|
|
Other ways to reduce interpolation/extrapolation bound. From the expression of the interpola- |
|
tion (Eqn. 5) and extrapolation bound (Eqn. 8), a common term is max; ||, which is the maximal |
|
magnitude of query/key products. If we enforce a regularization on || during LLM training, it is |
|
possible that the catastrophic extrapolation error can be mitigated or even resolved. In fact, if we |
|
apply ridge regression with proper regularization to fit a curve in Fig. 2, the magnitude of extrapo- |
|
lated a(s) when s > L can be comparable to that within [0, L]. To our knowledge, we are not aware |
|
of existing LLM pre-training techniques that leverage this regularization and will leave it for future |
|
work. |
|
|
|
3 EXPERIMENTS |
|
|
|
We show Position Interpolation can effectively extend context window up to 32 times of the original |
|
size, and such extension can be done with only several hundreds of training steps. We show the |
|
resulting models are strong LLMs with fully effective long context windows. We demonstrate its |
|
performance in a number of tasks including language modeling, passkey retrieval, and long doc- |
|
ument summarization. We also present benchmark results of the extended models on the original |
|
LLaMA evaluation benchmarks. |
|
3.1 SETUP |
|
|
|
Model Variants. We extended the pre-trained 7B, 13B, 33B and 65B LLaMA models (Touvron |
|
et al., 2023) to various context window of sizes up to 32768, using either direct fine-tuning or |
|
Position Interpoloation method. Except for rescaling the position indices for models extended with |
|
Position Interpolation, we did not modify LLaMA model architectures (Touvron et al., 2023) in any |
|
ways. |
|
|
|
Training Procedure. We fine-tune all model variants using the next token prediction objective. We |
|
use AdamW (Loshchilov & Hutter, 2019) with 5; = 0.9 and 2 = 0.95. We use a linear learning |
|
rate warmup of 20 steps starting from 10% of the maximum learning rate. For 7B and 13B models, |
|
we set the learning rate to 2 x 1075 and for 33B and 65B models we set the learning rate to 1072. We |
|
set the weight decay to zero. For extending 7B, 13B and 33B models to the 8192 context window |
|
size, we use 32 A100 GPUs and 64 global batch size. For all other cases we use 128 A100 GPUs and |
|
128 global batch size. We note that the main need of using more GPUs is memory limitation during |
|
fine-tuning, and it is possible to use fewer GPUs in certain cases. We train all models using PyTorch |
|
(Paszke et al., 2019) with Fully Sharded Data Parallel (Zhao et al., 2023) and Flash Attention (Dao |
|
et al., 2022). |
|
|
|
If not specified otherwise, for the Position Interpolation method, we fine-tune the models for 1000 |
|
steps. For the direct fine-tuning method, we use 10000 steps. We primarily fine-tune using the Pile |
|
training dataset (Gao et al., 2020). In Section 3.4 we also compared fine-tuning performance on the |
|
RedPajama dataset (Computer, 2023). |
|
|
|
3.2 LONG SEQUENCE LANGUAGE MODELING |
|
|
|
We evaluate the long sequence language modeling performance of our extended models and base- |
|
lines on two datasets: book corpus (PG-19) (Rae et al., 2020) and cleaned Arxiv Math proof-pile |
|
dataset (Azerbayev et al., 2022). |
|
|
|
We use the test splits of PG19 (Rae et al., 2020) and proof-pile (Azerbayev et al., 2022). For PG19, |
|
we use the whole test split consisting of 100 documents. For the proof-pile dataset, we use a random |
|
subsample of 128 documents with at least 32768 SentencePiece (Kudo & Richardson, 2018) tokens |
|
and truncate to the first 32768 tokens for each test document. We evaluate perplexity at various |
|
context window size by using a sliding window approach following Press et al. (2022) with stride |
|
S = 256. |
|
|
|
In Table 1 and Table 2, we report the perplexity results for our models and baselines on the datasets. |
|
From the results, we found that models extended with our method enjoy a significantly improved |
|
perplexity from longer context window sizes. By increasing the context window size from 2048 to |
|
16384, we observed -0.28 and -0.5 reductions of perplexity for extending LLaMA 7B models on |
|
both datasets, -0.27 and -0.48 reductions for extending LL.aMA 13B models, and -0.14 and -0.42 |
|
reductions for extending LLaMA 33B models. For LLaMA 65B models, we observed -0.12 and |
|
-0.3 reductions of perplexity by extending to the 8192 context window size. |
|
|
|
In general, we observed a consistent trend of our models achieving better perplexity with longer |
|
context windows. This indicates our models can effectively make use of the longer context windows |
|
to better predict next tokens in language modeling tasks. Moreover, we found this trend extends to |
|
32768 window size without diminishing on the PG19 dataset for LLaMA 7B and 13B models. This |
|
indicates that our method may enable extension to even longer context windows. |
|
|
|
In contrast, we observed that models extended via the direct fine-tuning method has shown regres- |
|
sion (up to +0.48) or minor improvement (up to -0.12) on the perplexity at longer context windows. |
|
This indicates that models extended this way have limited capability of making use of context win- |
|
dows longer than their pre-trained settings. |
|
|
|
We saw a minor degradation of the perplexity on the original context window of 2048 for our ex- |
|
tended models in some cases. For example, on the Proof-pile dataset, we saw a degradation ranging |
|
from 0.01 to 0.05 across all models with extended with Position Interpolation. A small degradation |
|
of performance within original evaluation context window is expected since Position Interpolation |
|
forces position encodings in original context window to reside in a much narrower region, which |
|
may negatively affect the language model’s performance. We present more benchmark results on |
|
the original context window size in Section 3.4. |
|
|
|
In Table 3 we report the relationship between perplexity and the number of fine-tuning steps for |
|
LLaMA 7B model extending to 8192 and 16384 context window sizes using Position Interpolation |
|
evaluated on the PG19 dataset. We can see without fine-tuning (at step 0) the model can exhibit |
|
certain language modeling capability, as indicated by < 20 perplexity for extending to 8192 context |
|
window (in contrast, the direct extrapolation method leads to > 10% perplexity). With fine-tuning, |
|
we observed that the perplexity improves quickly. At 200 steps the models surpassed the original |
|
model’s perplexity on 2048 context window size, indicating the models gaining ability of effectively |
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using sequences longer than the pre-training settings for language modeling. At 1000 steps, we can |
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see the models have improved steadily and achieve a significantly better perplexity. |
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|
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3.3 MEASURING EFFECTIVE CONTEXT WINDOW SIZE THROUGH PASSKEY RETRIEVAL |
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|
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We study the effective context window size, i.e. the maximum distance of a token can effectively |
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attend to during inference, of our models after extension. To measure this, we follow a synthetic |
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evaluation task of passkey retrieval proposed by Mohtashami & Jaggi (2023). In this task, the models |
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are asked to recover a random passkey hidden in a long document. See Figure 3 for the format of |
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the document. |
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|
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Given a language model, we estimate the upper and lower bounds of effective context windows as |
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follows. Suppose the random passkey is k tokens away from the end of the input. When a model |
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persistently fails to retrieve the correct passkey value across several independent attempts, it suggests |
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that the effective context window size of the model is less than k. Conversely, if a model consistently |
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succeeds in retrieving the correct passkey value, we deduce that the effective context window size |
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of the model is at least k. |
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|
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We evaluate the 7B and 33B LLaMA model variants that are extended via Position Interpolation or |
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direct fine-tuning. For each model, we use 32 different &£ uniformly spaced in the targeted context |
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window L’ and run the above tests for 10 times for each k, where each time a random passkey of 5 |
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random digits is used. In Table 4, we report kyax as a function of the number of fine-tuning steps, |
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|
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We can see that models extended via Position Interpolation all successfully attain their desired ex- |
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tension objectives in terms of effective context window sizes, indicating by the effective context |
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window size reaching maximum kp, = L/, after merely fine-tuning for 200 steps, consistently |
|
across both 7B and 33B model sizes and up to 32768 context windows. In contrast, LLLaMA models |
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that are extended via direct fine-tuning only saw a minimal increase of the effective context win- |
|
dow size kay from 2048 to 2560, even after fine-tuning for more than 10000 steps, with no clear |
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indication of an acceleration in the increase of window size. |
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|
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3.4 BENCHMARKS ON ORIGINAL CONTEXT WINDOW SIZE |
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|
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We evaluate the models extended by Position Interpolation on several standard benchmark tasks |
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within the original context window size of 2048. The evaluation results are listed in Table 5. From |
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the results, we saw that models extended to 8192 produce comparable results on the original bench- |
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mark which is designed for a much smaller context window, with a degradation of up to 2% on |
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the benchmark tasks, for both 7B and 33B model sizes. Models extended to longer context win- |
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dows regressed more on the benchmarks, but still in reasonable ranges for most tasks. We also note |
|
that the choice of fine-tuning datasets does not seem to lead significant difference in the benchmark |
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performances, which may be due to the limited number of fine-tuning steps used in our method. |
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The regression on benchmark tasks is consistent with our observation on perplexity regression in |
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Section 3.2. |
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|
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3.5 LONG DOCUMENT SUMMARIZATION |
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|
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In this task, we evaluate our models’ performance on the long document summarization task. In |
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particular, we consider the GovReport (Huang et al., 2021) dataset, which contains 17457 documents |
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for training and 972 documents for evaluation. Each document comes with a human generated |
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summary. We truncate all input documents to their first 15000 tokens. |
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|
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We fine-tune the LL.aMA models extended with Position Interpolation with a context window of |
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16384. Note the rescaling of position indices are still required during this fine-tuning step. We first |
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Model Size Context Window Fine-tune on BoolQ PIQA Race-M Race-H WinoGrande |
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|
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format the raw document using the prompt template in Figure 4, and then concatenate the prompt |
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with the ground-truth summary (truncate to 1000 tokens) associated with each document. We fine- |
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tune the model using the next token prediction task with the above setup for 10 epochs. The losses |
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from the input prompt proportion of training examples are excluded during our fine-tuning. |
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|
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We use a generation temperature of 0.5 and top, = 0.95 as our inference parameter to generate a |
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summarization of each document in the test set. The final output is truncated at 1000 tokens. We |
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used the ROUGE-1/ROUGE-2/ROUGE-L scores (Lin, 2004) as the evaluation metrics to evaluate |
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the models’ outputs vs the ground-truth summaries. |
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|
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In Table 6 we report our evaluation results. We have also included results from two baselines in |
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existing SCROLLS Leaderboard (Shaham et al., 2022; Ainslie et al., 2023). In general, we have |
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obtained competitive R1 score among other models with minimal tuning of hyper-parameters. This |
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result suggests our models with 16384 context window can effectively handle the long document |
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summarization task. |
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|
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=== END OF FILE === |
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|
|
''' |
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question = "Question: What's the title of this paper?" |
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|
|
inputs = tokenizer(prompt + question, return_tensors="pt").to("cuda") |
|
|
|
print(inputs.input_ids.shape) |
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assert inputs.input_ids.shape[1] > 6200, "input not long enough" |
|
|
|
gen_out = model.generate(**inputs, max_new_tokens=100) |
|
response = tokenizer.batch_decode(gen_out)[0] |
|
response = response.replace(prompt + question, "") |
|
assert len(response) < 500, "response must be less than 100 tokens" |
|
print(response) |
|
if rope_scaling is None: |
|
assert 'Extending Context Window of Large' not in response |
|
assert 'Extending Context Window of Large'.upper() not in response |
|
else: |
|
assert ('Extending Context Window of Large' in response or |
|
'Extending Context Window of Large'.upper() in response) |
|
|
