Nu2-Lupi-Qwen-14B
Nu2-Lupi-Qwen-14B is based on the Qwen 2.5 14B modality architecture, designed to enhance mathematical reasoning capabilities. This model is optimized for complex problem-solving, logical deduction, and multi-step mathematical reasoning. It has been fine-tuned using the gsm8k-platinum dataset to improve accuracy, structured responses, and contextual understanding in mathematical domains.
Key Improvements
- Enhanced Mathematical Proficiency: The model excels in solving complex mathematical problems, including algebra, calculus, and number theory.
- Advanced Reasoning Capabilities: Optimized for step-by-step problem-solving, enabling clear and logical explanations for mathematical queries.
- Improved Instruction Following: Capable of understanding and executing multi-step instructions with precision, ensuring structured and coherent outputs.
- Long-Context Support: Supports up to 128K tokens for input context and can generate up to 8K tokens in a single output, making it ideal for detailed problem breakdowns.
- Multilingual Mathematical Reasoning: Supports over 29 languages, including English, Chinese, French, Spanish, Portuguese, German, Italian, Russian, Japanese, Korean, Vietnamese, Thai, Arabic, and more.
Quickstart with transformers
Here is a code snippet with apply_chat_template
to show you how to load the tokenizer and model and generate content:
from transformers import AutoModelForCausalLM, AutoTokenizer
model_name = "prithivMLmods/Nu2-Lupi-Qwen-14B"
model = AutoModelForCausalLM.from_pretrained(
model_name,
torch_dtype="auto",
device_map="auto"
)
tokenizer = AutoTokenizer.from_pretrained(model_name)
prompt = "Solve the equation: 3x + 5 = 14."
messages = [
{"role": "system", "content": "You are a mathematical reasoning 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,
max_new_tokens=512
)
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]
Intended Use
Mathematical Reasoning and Problem-Solving:
Fine-tuned for high-precision mathematical problem-solving, including algebra, geometry, calculus, and logic puzzles.Educational and Academic Assistance:
Ideal for students, educators, and researchers looking for structured explanations and step-by-step solutions.Conversational AI with Mathematical Focus:
Supports intelligent chatbot applications that require mathematical comprehension and dynamic response generation.Data Science and Analytical Processing:
Capable of analyzing mathematical datasets, generating structured numerical insights, and assisting with automation.Long-Form Mathematical Content Generation:
Can generate detailed problem breakdowns, mathematical reports, and research-based content with high coherence.
Limitations
Hardware Requirements:
Requires high-memory GPUs or TPUs due to its large parameter size and long-context support.Potential Bias in Responses:
While fine-tuned for accuracy, outputs may still reflect biases present in training data.Inconsistent Creative Outputs:
May generate varying results when handling abstract or theoretical mathematical concepts.Limited Real-World Awareness:
Does not have access to real-time mathematical discoveries beyond its training cutoff.Error Propagation in Extended Outputs:
Minor calculation errors in early steps may affect overall problem solutions in long-form responses.Prompt Sensitivity:
The effectiveness of responses may depend on how well the mathematical problem is structured within the input prompt.
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