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Introduction ∆ in a Spherically Symmetric Geometry Separating Spherical Coordinates Obtaining the Legendre Equation Separating the Equation ∆u = f (ρ)u (Azimuthal Part) P ′′ P sin 2 (φ) P′′ P cos(φ) P + sin(φ) ′ 1 + P sin2 T (φ) ′′ T = −λ T′′ + sin(φ)cos(φ)P′ + P T = −λ sin2 (φ) sin 2 (φ) P′′ + sin(φ)cos(φ)P′ P P + λ sin2 (φ) = − T′′ Both sides must be constant. − T T′′ T = c leads to T′′ + cT = 0. But T must be 2π-periodic. logo1 Bernd Schröder Louisiana Tech University, College of Engineering and Science Separation of Variables – Legendre Equations
Introduction ∆ in a Spherically Symmetric Geometry Separating Spherical Coordinates Obtaining the Legendre Equation Separating the Equation ∆u = f (ρ)u (Azimuthal Part) P ′′ P sin 2 (φ) P′′ P cos(φ) P + sin(φ) ′ 1 + P sin2 T (φ) ′′ T = −λ T′′ + sin(φ)cos(φ)P′ + P T = −λ sin2 (φ) sin 2 (φ) P′′ + sin(φ)cos(φ)P′ P P + λ sin2 (φ) = − T′′ T Both sides must be constant. − T′′ T = c leads to T′′ + cT = 0. But T must be 2π-periodic. Thus c = m2 , where m is a nonnegative integer. logo1 Bernd Schröder Louisiana Tech University, College of Engineering and Science Separation of Variables – Legendre Equations
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