Outline1lù¥¼ê(n)ÔnÆ�2007cSC.S.Wu1lù¥¼ê(n)OutlineùÇ:1ëLegendre¼êëLegendre§���¯KëLegendre¼ê���52¥¡NÚ¼ê�µ¥¡NÚ¼ê8z�¥¡NÚ¼êC.S.Wu1lù¥¼ê(n)OutlineùÇ:1ëLegendre¼êëLegendre§���¯KëLegendre¼ê���52¥¡NÚ¼ê�µ¥¡NÚ¼ê8z�¥¡NÚ¼êC.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsReferencesÇÂÁ§5êÆÔn{6§§16.8,16.9ù&§5êÆÔn{6§§10.2,12.3�nÎ!X1Á§5êÆÔn{6§§12.4C.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtnsùÇ:1ëLegendre¼êëLegendre§���¯KëLegendre¼ê���52¥¡NÚ¼ê�µ¥¡NÚ¼ê8z�¥¡NÚ¼êC.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥S«Laplace§�¯K∇2u=0u��Σ=f(Σ)À½¥IX§I�: u¥%�ѽ)¯K3¥IXe�äN/ªC.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥S«Laplace§�¯K∇2u=0u��Σ=f(Σ)À½¥IX§I�: u¥%�ѽ)¯K3¥IXe�äN/ªC.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥S«Laplace§�¯K∇2u=0u��Σ=f(Σ)À½¥IX§I�: u¥%�ѽ)¯K3¥IXe�äN/ªC.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥S«Laplace§�¯K∇2u=0u��Σ=f(Σ)�3�ѽ)¯K3¥IXe�äN/ª§I5¿Laplace§3I�:r=0ؤá§3T:¿Ùþ3u(r,θ,φ)ér�üý�êrLaplace§U��¥IX§�±½)¯K��d5§7LÖ¿þu(r,θ,φ)3I�:r=0?�k.^C.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥S«Laplace§�¯K∇2u=0u��Σ=f(Σ)�3�ѽ)¯K3¥IXe�äN/ª§I5¿Laplace§3I�:r=0ؤá§3T:¿Ùþ3u(r,θ,φ)ér�üý�êrLaplace§U��¥IX§�±½)¯K��d5§7LÖ¿þu(r,θ,φ)3I�:r=0?�k.^C.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥S«Laplace§�¯K∇2u=0u��Σ=f(Σ)�3�ѽ)¯K3¥IXe�äN/ª§I5¿Laplace§3I�:r=0ؤá§3T:¿Ùþ3u(r,θ,φ)ér�üý�êrLaplace§U��¥IX§�±½)¯K��d5§7LÖ¿þu(r,θ,φ)3I�:r=0?�k.^C.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥S«Laplace§�¯K∇2u=0u��Σ=f(Σ)�3�ѽ)¯K3¥IXe�äN/ª§I5¿Laplace§3θ=0Úθ=πþؤá§3ùü:þ¿Ùþ3u(r,θ,φ)éθ�üý�êrLaplace§U��¥IX§�±½)¯K��d5§7LÖ¿þu(r,θ,φ)3θ=0Úθ=πþ�k.^C.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥S«Laplace§�¯K∇2u=0u��Σ=f(Σ)�3�ѽ)¯K3¥IXe�äN/ª§I5¿Laplace§3θ=0Úθ=πþؤá§3ùü:þ¿Ùþ3u(r,θ,φ)éθ�üý�êrLaplace§U��¥IX§�±½)¯K��d5§7LÖ¿þu(r,θ,φ)3θ=0Úθ=πþ�k.^C.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥S«Laplace§�¯K∇2u=0u��Σ=f(Σ)�3�ѽ)¯K3¥IXe�äN/ª§I5¿Laplace§3θ=0Úθ=πþؤá§3ùü:þ¿Ùþ3u(r,θ,φ)éθ�üý�êrLaplace§U��¥IX§�±½)¯K��d5§7LÖ¿þu(r,θ,φ)3θ=0Úθ=πþ�k.^C.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥S«Laplace§�¯K∇2u=0u��Σ=f(Σ)�3�ѽ)¯K3¥IXe�äN/ª§I5¿Laplace§3I�:φ=0Úφ=2πþؤá§3ùü:þ¿Ùþ3u(r,θ,φ)éφ�üý�êrLaplace§U��¥IX§�±½)¯K��d5§7LÖ¿þ±Ï^u��φ=0=u��φ=2π∂u∂φ���φ=0=∂u∂φ���φ=2πC.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥S«Laplace§�¯K∇2u=0u��Σ=f(Σ)�3�ѽ)¯K3¥IXe�äN/ª§I5¿Laplace§3I�:φ=0Úφ=2πþؤá§3ùü:þ¿Ùþ3u(r,θ,φ)éφ�üý�êrLaplace§U��¥IX§�±½)¯K��d5§7LÖ¿þ±Ï^u��φ=0=u��φ=2π∂u∂φ���φ=0=∂u∂φ���φ=2πC.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥IXe�½)¯K1r2∂∂r�r2∂u∂r�+1r2sinθ∂∂θ�sinθ∂u∂θ�+1r2sin2θ∂2u∂φ2=0u��φ=0=u��φ=2π∂u∂φ���φ=0=∂u∂φ���φ=2πu��θ=0k.u��θ=πk.u��r=0k.u��r=a=f(θ,φ)-u(r,θ,φ)=R(r)S(θ,φ)§òþ¡�§Úàg.^©lCþC.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ¥IXe�½)¯K1r2∂∂r�r2∂u∂r�+1r2sinθ∂∂θ�sinθ∂u∂θ�+1r2sin2θ∂2u∂φ2=0u��φ=0=u��φ=2π∂u∂φ���φ=0=∂u∂φ���φ=2πu��θ=0k.u��θ=πk.u��r=0k.u��r=a=f(θ,φ)-u(r,θ,φ)=R(r)S(θ,φ)§òþ¡�§Úàg.^©lCþC.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µddr�r2dR(r)dr�−λR(r)=01sinθ∂∂θ�sinθ∂S(θ,φ)∂θ�+1sin2θ∂2S(θ,φ)∂φ2+λS(θ,φ)=0S��θ=0k.S��θ=πk.S��φ=0=S��φ=2π∂S∂φ���φ=0=∂S∂φ���φ=2πC.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ2ò1sinθ∂∂θ�sinθ∂S(θ,φ)∂θ�+1sin2θ∂2S(θ,φ)∂φ2+λS(θ,φ)=0S��θ=0k.S��θ=πk.S��φ=0=S��φ=2π∂S∂φ���φ=0=∂S∂φ���φ=2π©lCþ§S(θ,φ)=Θ(θ)Φ(φ)C.S.Wu1lù¥¼ê(n)AssociatedLegendreFunctionsSpheroidalHarmonicsEigenproblemofAssociatedLegendreEqnsOrthogonalityofAssociatedLegendreFtns�µ1sinθddθ�sinθdΘ(θ)dθ�+�λ−μsin2θ�Θ(θ)=0Θ(0)k.Θ(π)k.ÚΦ00+μΦ=0Φ(0)=Φ(2π)Φ0(0)=Φ0(2π)C.S.Wu1lù¥¼ê(n)Asso
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本文标题:北大数学物理方法(A)-数学物理方程教案08球函数3
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