Integral Points in Arithmetic Progression on y2=x(x2−n2)

This paper continues the investigation of the arithmetic of the curves C A : y 2 =x a +A and their Jacobians J A , where a is an odd prime and A is an integer not divisible by a, which was begun in an earlier paper. In the first part, we sketch how to extend the formula for the dimension of a certai

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Recently, Mickens [1] studied a class of non-linear, one-dimensional oscillators in an x ð2nþ2Þ=ð2nþ1Þ potential. He obtained approximate solutions by using harmonic balance method. Motivated by Mickens' paper, we will extend his results in this study. Consider a one-dimensional oscillation whose p

The double vibrational collision-induced absorptions CO(2) (nu(3) = 1) + X(2) (nu(1) = 1) <-- CO(2) (nu(3) = 0) + X(2) (nu(1) = 0), for X(2) = H(2), N(2), and O(2) are studied on the basis of quantum lineshapes computed using isotropic potentials and dipole-induced dipole functions. The linestrength