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Quantum State Compression with Polar Codes: A Detailed Analysis


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The author proposes an efficient quantum state compression solution using polar codes, achieving the Schumacher compression limit by embedding a classical error-correcting code's syndrome source coding protocol into the quantum domain.
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The content discusses Quantum State Compression with Polar Codes, focusing on a novel approach based on classical syndrome source coding. The paper explores the use of linear error-correcting codes for rate-optimal quantum compression, particularly utilizing polar codes. By implementing an efficient quantum successive cancellation decoding algorithm based on factor graphs of polar codes, the authors aim to achieve low-complexity compression and decompression protocols for transmitting multi-qubit quantum states. The proposed protocol allows for reliable transmission between Alice and Bob while approaching the source entropy rate. The analysis is primarily dependent on the classical performance of polar codes, showcasing that any capacity-achieving classical error-correcting code can be adapted for lossless quantum compression by embedding the corresponding syndrome source coding protocol into the quantum realm.

The content delves into various aspects such as Quantum Formalism, Binary Linear Codes, Polar Codes, Syndrome Source Coding, and Efficient Implementation using Belief Propagation algorithms. It also presents numerical results comparing the proposed protocol with Schumacher compression across different block lengths to demonstrate superior success probabilities and compression rates achieved by the new approach.

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สถิติ
For sufficiently large blocklengths, both imperfections in Schumacher's quantum compression scheme can be made arbitrarily small. Linear error-correcting codes are used to implement rate-optimal classical compression. Polar codes are known to be rate-optimal for many coding and compression problems. The proposed protocol achieves success probability approaching 0 as block length increases. The proposed protocol sends N − K qubits which can be made arbitrarily close to the Schumacher limit of Nh(p) qubits.
คำพูด
"The proposed protocol is successful if and only if Alice measures the outcome associated with projector ΠN K." - Proposition 1 "For any δ > 0 and ν ∈ N...the failure probability Pν = 1 − Tr ΠN Kρ⊗N satisfies limn→∞ Pν = 0." - Proposition 2

ข้อมูลเชิงลึกที่สำคัญจาก

by Jack Weinber... ที่ arxiv.org 03-01-2024

https://arxiv.org/pdf/2402.18684.pdf
Quantum State Compression with Polar Codes

สอบถามเพิ่มเติม

How does embedding a classical error-correcting code's syndrome source coding into the quantum domain impact overall efficiency

Embedding a classical error-correcting code's syndrome source coding into the quantum domain can significantly impact overall efficiency in quantum state compression. By utilizing this approach, we can leverage the structure and properties of classical linear codes to achieve lossless compression of quantum information. This adaptation allows for the conversion of a message to be compressed into an error pattern, which can then be processed using a linear error-correcting code. The key advantage of this method is that it enables efficient encoding and decoding processes based on classical syndrome source coding principles. By treating the message as an error pattern and utilizing syndromes for compression, we can effectively convert quantum information into a format that is amenable to classical error correction techniques. This not only simplifies the compression process but also ensures reliable transmission and recovery of quantum states. Furthermore, by incorporating classical syndrome source coding into the quantum domain, we can benefit from established algorithms and protocols developed for classical systems. This integration enhances the efficiency of quantum state compression by leveraging proven methodologies from classical information theory while adapting them to suit the unique characteristics of quantum data.

What are potential implications of achieving success probabilities approaching zero as block length increases in quantum state compression

Achieving success probabilities approaching zero as block length increases in quantum state compression has significant implications for the reliability and scalability of such protocols. As block length grows larger, success probabilities trending towards zero indicate that the protocol is becoming more robust and accurate in its ability to compress and decompress quantum states effectively. One implication is that with increasing block lengths, the protocol becomes more capable of achieving optimal compression rates while maintaining high levels of accuracy in recovering compressed states. This trend towards higher success probabilities signifies improved performance in transmitting complex multi-qubit states efficiently over long distances or through noisy channels. Moreover, as success probabilities approach zero with larger block lengths, it demonstrates that the protocol is converging towards achieving optimal lossless compression limits set by Shannon's entropy bound for both individual qubits and multi-qubit systems. This convergence indicates that as technology advances allow for handling larger blocks efficiently, our ability to compress and transmit large-scale quantum information will improve significantly. Overall, attaining success probabilities close to zero with increasing block lengths showcases advancements in achieving near-optimal performance in terms of both reliability and efficiency in quantum state compression protocols.

How might advancements in belief propagation algorithms with quantum messages influence future developments in information theory

Advancements in belief propagation algorithms with quantum messages have profound implications for future developments in information theory across various domains: Enhanced Error Correction: Improved belief propagation algorithms leveraging quantum messages enable more effective error correction mechanisms for both classical-quantum channels (CQ) and symmetric CQ channels (BSCQ). These advancements lead to enhanced data transmission reliability across hybrid communication systems involving both classical bits and qubits. Optimized Compression Techniques: Quantum-enhanced belief propagation algorithms pave the way for optimized data compression techniques tailored specifically for polar codes on CQ channels. By harnessing these advanced algorithms, researchers can develop highly efficient methods for compressing large volumes of data while ensuring minimal distortion during decompression. Quantum Information Processing: The evolution of belief propagation algorithms with quantum messages opens up new possibilities in processing complex forms of information encoded within entangled qubit states or superpositioned data sets. These advancements could revolutionize how we handle intricate computational tasks requiring sophisticated manipulation at a subatomic level. 4Cross-Domain Applications: The synergy between belief propagation algorithms with traditional messaging passing schemes offers cross-domain applications spanning cryptography, telecommunications networks optimization,simulation modeling,and beyond.This interdisciplinary approach fosters innovation atthe intersectionofclassicalandquantuminformationprocessing,redefiningtheboundariesofinformationtheoryresearchandapplicationdevelopment
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