We deal with the solutions to the radial Schr(o)dinger equation for the Coulomb perturbed potential in Ndimensional Hilbert space by using two methods,i.e.the power series technique via a suitable ansatz to the wavefunction and the Virial theorem.Analytic expressions for eigenvalues and normalized eigenfunctions are derived.A recursion relation among series expansion coefficients,a condition for convergence of series and interdimensional degeneracies are also investigated.As special cases,the problem is solved in 3 and 4 dimensions with some specific parameter values.The obtained analytical and numerical results are in good agreement with the results of other studies.
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机译:Balancing Wind Power Development And Open Space Conservation: An Analytical Approach To Evaluating Potential Conflicts and Promoting Appropriate Siting - (PPT)
