TL;DR
This paper demonstrates that the quantization of multiple isotropic harmonic oscillators can be exactly solved within a Snyder geometry framework, revealing new insights into quantum systems with minimal length scales.
Contribution
It provides the first exact solution for the quantization of multiple harmonic oscillators in Snyder geometry, extending previous single-oscillator results.
Findings
Exact solutions for d isotropic harmonic oscillators in Snyder geometry
Insights into quantum behavior with minimal length scale
Potential implications for quantum gravity theories
Abstract
We find that, in presence of the Snyder geometry, the quantization of d isotropic harmonic oscillators can be solved exactly.
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