Prospect of Chandrasekhar’s limit against modified dispersion relation

“…As we have already noted, dynamical stability analysis consists of the investigation of the time evolution of homologous infinitesimal perturbations about the equilibrium configuration [48][49][50][51]. The corresponding metric interior to the star is expressed as ds 2 ¼ e nþdn c 2 dt 2 À e mþdm dr 2 À r 2 (du 2 þ sin 2 u df 2 ), (4:1)…”

“…As we have already noted, dynamical stability analysis consists of the investigation of the time evolution of homologous infinitesimal perturbations about the equilibrium configuration [48–51]. The corresponding metric interior to the star is expressed asds2=normaleν+δνc2 dt2−normaleμ+δμ dr2−r2false(dθ2+sin2⁡θ dϕ2false),where ν ( r ) and μ ( r ) are the equilibrium metric potentials and the perturbations δν ( r , t ) and δμ ( r , t ) are due to small radial Lagrangian displacements ζ ( r , t ).…”

Existence of Chandrasekhar’s limit in generalized uncertainty white dwarfs

“…As we have already noted, dynamical stability analysis consists of the investigation of the time evolution of homologous infinitesimal perturbations about the equilibrium configuration [48][49][50][51]. The corresponding metric interior to the star is expressed as ds 2 ¼ e nþdn c 2 dt 2 À e mþdm dr 2 À r 2 (du 2 þ sin 2 u df 2 ), (4:1)…”

“…As we have already noted, dynamical stability analysis consists of the investigation of the time evolution of homologous infinitesimal perturbations about the equilibrium configuration [48–51]. The corresponding metric interior to the star is expressed asds2=normaleν+δνc2 dt2−normaleμ+δμ dr2−r2false(dθ2+sin2⁡θ dϕ2false),where ν ( r ) and μ ( r ) are the equilibrium metric potentials and the perturbations δν ( r , t ) and δμ ( r , t ) are due to small radial Lagrangian displacements ζ ( r , t ).…”

Existence of Chandrasekhar’s limit in generalized uncertainty white dwarfs

Radial oscillations and dynamical instability analysis for linear-quadratic GUP-modified white dwarfs