In this paper, we investigate the Lie point symmetries of Klein-Gordon equation\nand Schr�¶dinger equation by applying the geometric concept of Noether\npoint symmetries for the below defined Lagrangian. Moreover, we organize a\nstrong relationship among the Lie symmetries related to Klein-Gordon as well\nas Schr�¶dinger equations. Finally, we utilize the consequences of Lie point\nsymmetries of Poisson and heat equations within Riemannian space to conclude\nthe Lie point symmetries of Klein-Gordon equation and Schr�¶dinger\nequation within universal Riemannian space.
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