Quantum graphs—networks composed of vertices connected by edges on which quantum wave dynamics are defined—have emerged as a versatile model for exploring the interplay between geometry, topology, and ...

Recent advances at the confluence of quantum mechanics and Dunkl oscillator studies have offered fresh perspectives on well‐established models by integrating deformed algebraic structures with ...

Quantum mechanics describes the unconventional properties of subatomic particles, like their ability to exist in a superposition of multiple states, as popularized by the Schrödinger's cat analogy, ...