Abstract
A well-known soliton (bubble) solution of five-dimensional Kaluza–Klein General Relativity is modified by imposing mass on the scalar field. By forcing the scalar field to be short-range, the failure of the original bubble solution to satisfy the equivalence principle is remedied, and the bubble acquires gravitational mass. Most importantly, the mass is quantized, even in this classical setting, and has a value mP/(4α), where mP is the Planck mass, and α is the fine-structure constant. This result applies for any choice of scalar-field mass, as it is an attractor for the field equations.
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