Yucong Duan

International Standardization Committee of Networked DIKWP for Artificial Intelligence Evaluation(DIKWP-SC)

World Artificial Consciousness CIC(WAC)

World Conference on Artificial Consciousness(WCAC)

(Email: duanyucong@hotmail.com)

Prof. Yucong Duan has proposed the Data-Information-Knowledge-Wisdom-Purpose (DIKWP) Semantic Mathematics framework as a revolutionary approach to mathematics, particularly in the context of artificial intelligence (AI) and artificial consciousness systems. His viewpoints challenge traditional mathematical paradigms and emphasize the integration of semantics and human cognitive processes into mathematical constructs. Below is a comprehensive summary of his key opinions and perspectives:

• Opinion: Traditional mathematics abstracts away from real-world semantics, focusing on pure forms and structures detached from meanings.

• Argument: This abstraction hinders AI development because it removes the very semantics essential for genuine understanding and consciousness.

• Conclusion: Mathematics should not be far away from semantics; instead, it needs to adhere to semantics to represent the reality of the world.

• Opinion: Traditional mathematics is defined or created from the viewpoint of a third party to achieve "expected" objectiveness or to avoid subjectiveness.

• Argument: This approach does not conform to the reality of the world, as it neglects the subjective experiences inherent in human cognition.

• Conclusion: Mathematics should be constructed from a first-person perspective, integrating subjectivity to align with real-world semantics.

• Opinion: Mathematics is a result of human thought and cognitive processes, and therefore, human interaction should not be excluded from its development.

• Argument: Excluding human cognition overlooks essential aspects of understanding and fails to represent the complexities of human reasoning.

• Conclusion: Abstraction depends on the human side and should be explicitly considered in mathematical frameworks.

• Opinion: Prof. Duan proposes the "BUG" theory, suggesting that inconsistencies or "bugs" in reasoning contribute to the development of consciousness.

• Argument: These "bugs" prompt reflection and adaptation, playing a crucial role in cognitive growth.

• Conclusion: Embracing and addressing these inconsistencies is essential for developing consciousness in AI systems.

• Opinion: Semantics should take precedence over pure mathematical forms, which are merely representations intended to convey meanings.

• Argument: Focusing on form over meaning distances mathematics from the realities it aims to model.

• Conclusion: Mathematics should be grounded in fundamental semantics, ensuring constructs are meaningful and relevant to real-world understanding.

• Opinion: Mathematics should conform to basic semantics instead of abstracting from them.

• Argument: Abstraction without semantic grounding leads to models that cannot capture the nuances of real-world phenomena.

• Conclusion: Grounding mathematics in semantics allows for more accurate representations and enhances AI's ability to comprehend and interact meaningfully with the world.

• Opinion: The DIKWP Semantic Mathematics framework should be constructed in an evolutionary manner, mirroring how an infant starts to understand the world.

• Argument: This approach ensures that concepts develop organically, reflecting the natural progression of human cognitive growth.

• Conclusion: Mathematics built upon evolutionary semantics can more effectively model human cognition and support the development of AI consciousness.

• Opinion: Every concept should be formally bundled with semantics evolved from the three basic semantics: Sameness, Difference, and Completeness.

• Argument: This bundling ensures clear communication and understanding, as concepts are intrinsically linked to their meanings.

• Conclusion: When systems share the same cognitive development process, misunderstandings are minimized, leading to more effective communication.

• Opinion: There is a paradox in traditional mathematics where the methods (abstract mathematics) undermine the goals (achieving real semantics in AI).

• Argument: Using abstraction to achieve semantic-rich AI creates a conflict that limits AI's ability to understand and interact with the world.

• Conclusion: By aligning mathematics with fundamental semantics and human cognition, this paradox can be resolved.

• Opinion: The DIKWP Semantic Mathematics framework can serve as the mathematical foundation for constructing artificial consciousness systems.

• Argument: By integrating semantics and modeling cognitive development, AI systems can simulate aspects of human consciousness, including subjective experiences.

• Conclusion: Embracing subjectivity and semantics allows for the development of AI systems capable of consciousness-like properties.

• Opinion: AI systems developed using the DIKWP framework will better understand and interact with the world in human-like ways.

• Argument: The integration of semantics and cognitive processes enables AI to comprehend context and nuance, leading to more natural interactions.

• Conclusion: This approach can advance AI capabilities, making systems more adaptable and effective in various applications.

• Opinion: Ethical considerations must be integrated into the AI development process, ensuring systems align with human values and societal norms.

• Argument: As AI systems become more advanced and potentially conscious, addressing ethical implications becomes crucial.

• Conclusion: Responsible innovation requires that ethics be an integral part of AI research and implementation.

• Opinion: Despite challenges, the potential benefits of the DIKWP framework warrant continued exploration and refinement.

• Argument: Ongoing research and interdisciplinary collaboration are essential to address limitations and advance the field.

• Conclusion: Prof. Duan advocates for sustained efforts to develop and validate the DIKWP Semantic Mathematics framework.

Summary:

Prof. Yucong Duan's viewpoints emphasize a fundamental shift in how mathematics is approached, particularly in AI development. He argues for:

• Grounding mathematics in real-world semantics rather than abstracting away from them.

• Incorporating human cognitive processes and subjectivity into mathematical constructs.

• Constructing mathematics evolutionarily, mirroring human cognitive development.

• Addressing inherent paradoxes in traditional mathematics that limit AI's ability to achieve genuine understanding and consciousness.

• Emphasizing ethical considerations in the development of advanced AI systems.

By integrating these perspectives, the DIKWP Semantic Mathematics framework offers a novel and potentially transformative foundation for AI and artificial consciousness research.