The abstract presents an ambitious and intellectually engaging project that seeks to conceptually and mathematically model the relationship between memory and consciousness. By deliberately moving away from strictly biological explanations, the study positions itself within an interdisciplinary framework that bridges philosophy, cognitive theory, and formal modeling. This orientation is particularly interesting because it attempts to formalize phenomena traditionally treated in qualitative or phenomenological terms. The abstract clearly identifies the central problem: understanding how memory and consciousness interact to produce self-recognition, temporal projection, and personal presence. These themes connect directly to longstanding philosophical discussions about identity and continuity of the self. The reference to both classical and contemporary philosophers suggests a solid theoretical grounding, although the abstract could benefit from briefly indicating which traditions or thinkers are most influential in the proposed framework. A notable strength of the proposal lies in its intention to make complex philosophical ideas accessible while maintaining conceptual rigor. The mention of a mathematical modeling approach is promising, but the abstract does not yet specify the type of mathematical tools or structures that will be used, which might leave readers curious about the methodological framework. It should also be noted that the study already exists in its original French version. The present text is therefore a translation intended to make the complete work accessible to a broader audience. This effort contributes to widening the dissemination of the research while preserving the substance of the original work. Overall, the abstract outlines a thoughtful and potentially original contribution to discussions on consciousness and memory. By combining philosophical reflection with formal modeling, the study has the potential to stimulate interdisciplinary dialogue on the nature of identity and personal continuity.
Adel Ben Mabrouk (Mon,) studied this question.