Nonrelativistic limit of normalized solutions to a class of nonlinear Dirac equations

In this paper, we investigate the nonrelativistic limit of normalized solutions to a nonlinear Dirac equation as given below: - i c ∑ k = 1 3 α k ∂ k u + m c 2 β u - Γ ∗ ( K | u | κ ) K | u | κ - 2 u - P | u | s - 2 u = ω u , ∫ R 3 | u | 2 d x = 1 . Here, c > 0 represents the speed of light, m > 0 is the mass of the Dirac particle, ω ∈ R emerges as an indeterminate Lagrange multiplier, Γ , K , P are real-valued function defined on R 3 , also known as potential functions. Our research first confirms the presence of normalized solutions to the Dirac equation under high-speed light conditions. We then illustrate that these solutions converge to normalized ground states of nonlinear Schrödinger equations, and we also show uniform boundedness and exponential decay of these solutions. Our results form the first discussion on nonrelativistic limit of normalized solutions to nonlinear Dirac equations. This not only aids in the study of normalized solutions of the nonlinear Schrödinger equations, but also physically explains that the normalized ground states of high-speed particles and low-speed motion particles are consistent.