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Pöschl–Teller potential

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In mathematical physics, a Pöschl–Teller potential, named after the physicists Herta Pöschl^[1] (credited as G. Pöschl) and Edward Teller, is a special class of potentials for which the one-dimensional Schrödinger equation can be solved in terms of special functions.

Definition[edit]

In its symmetric form is explicitly given by^[2]

Symmetric Pöschl–Teller potential: $-{\frac {\lambda (\lambda +1)}{2}}\operatorname {sech} ^{2}(x)$ . It shows the eigenvalues for μ=1, 2, 3, 4, 5, 6.

V(x)=-{\frac {\lambda (\lambda +1)}{2}}\mathrm {sech} ^{2}(x)

and the solutions of the time-independent Schrödinger equation

-{\frac {1}{2}}\psi ''(x)+V(x)\psi (x)=E\psi (x)

with this potential can be found by virtue of the substitution $u=\mathrm {tanh(x)}$ , which yields

\left[(1-u^{2})\psi '(u)\right]'+\lambda (\lambda +1)\psi (u)+{\frac {2E}{1-u^{2}}}\psi (u)=0

.

Thus the solutions $\psi (u)$ are just the Legendre functions $P_{\lambda }^{\mu }(\tanh(x))$ with $E=-{\frac {\mu ^{2}}{2}}$ , and $\lambda =1,2,3\cdots$ , $\mu =1,2,\cdots ,\lambda -1,\lambda$ . Moreover, eigenvalues and scattering data can be explicitly computed.^[3] In the special case of integer $\lambda$ , the potential is reflectionless and such potentials also arise as the N-soliton solutions of the Korteweg–De Vries equation.^[4]

The more general form of the potential is given by^[2]

V(x)=-{\frac {\lambda (\lambda +1)}{2}}\mathrm {sech} ^{2}(x)-{\frac {\nu (\nu +1)}{2}}\mathrm {csch} ^{2}(x).

Rosen–Morse potential[edit]

A related potential is given by introducing an additional term:^[5]

V(x)=-{\frac {\lambda (\lambda +1)}{2}}\mathrm {sech} ^{2}(x)-g\tanh x.

See also[edit]

References list[edit]

^ ""Edward Teller Biographical Memoir." by Stephen B. Libby and Andrew M. Sessler, 2009 (published in Edward Teller Centennial Symposium: modern physics and the scientific legacy of Edward Teller, World Scientific, 2010" (PDF). Archived from the original (PDF) on 2017-01-18. Retrieved 2011-11-29.
^ ^a ^b Pöschl, G.; Teller, E. (1933). "Bemerkungen zur Quantenmechanik des anharmonischen Oszillators". Zeitschrift für Physik. 83 (3–4): 143–151. Bibcode:1933ZPhy...83..143P. doi:10.1007/BF01331132. S2CID 124830271.
^ Siegfried Flügge Practical Quantum Mechanics (Springer, 1998)
^ Lekner, John (2007). "Reflectionless eigenstates of the sech2 potential". American Journal of Physics. 875 (12): 1151–1157. Bibcode:2007AmJPh..75.1151L. doi:10.1119/1.2787015.
^ Barut, A. O.; Inomata, A.; Wilson, R. (1987). "Algebraic treatment of second Poschl-Teller, Morse-Rosen and Eckart equations". Journal of Physics A: Mathematical and General. 20 (13): 4083. Bibcode:1987JPhA...20.4083B. doi:10.1088/0305-4470/20/13/017. ISSN 0305-4470.

External links[edit]

Eigenstates for Pöschl-Teller Potentials

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