Inventors: Nirman Ganguly

The study investigates the relationship between completely positive maps and quantum conditional entropy within the framework of quantum information theory. Key aspects include: Completely Positive Maps: These are mathematical operations on quantum states that preserve positivity, essential for quantum state transformations and measurements. Quantum Conditional Entropy: A measure of the amount of uncertainty or information contained in a quantum system given the state of another system. The research explores how completely positive maps influence or relate to the properties and behavior of quantum conditional entropy, with implications for understanding quantum correlations, information processing, and entropy in quantum systems. The goal is to provide deeper insights into the mathematical and physical connections between these fundamental concepts in quantum information theory. (Mathematics)