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The existence of a minimal observable length modifies the Heisenberg’s uncertainty principle at Plank scales and leads to some modifications of the Dirac equation. Here, we consider the generalized uncertainty… Click to show full abstract
The existence of a minimal observable length modifies the Heisenberg’s uncertainty principle at Plank scales and leads to some modifications of the Dirac equation. Here, we consider the generalized uncertainty principle (GUP) theory in order to deduce a generalized Dirac equation and solve its eigenvalue problem for a particle within a gravitational field created by a central mass. We use two different approximations to tackle the problem, based on the Schwarzschild and a modified Schwarzschild metrics.
Keywords:
dirac equation;
generalized dirac;
gravitational field;
equation;
particle
Journal Title: General Relativity and Gravitation
Year Published: 2021
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Journal Title: General Relativity and Gravitation
Year Published: 2021
Link to full text (if available)
Share on Social Media: Sign Up to like & get
recommendations!