http://chineseinput.net/에서 pinyin(병음)방식으로 중국어를 변환할 수 있습니다.
변환된 중국어를 복사하여 사용하시면 됩니다.
崔性春 嶺南大學校 基礎科學硏究所 1995 基礎科學硏究 Vol.15 No.-
The initial value problem of the one-dimensional second order differential equation of motion is solved exactly by considering the successive approximation method and its limit and compared with the elementary method.
崔性春 嶺南大學校 基礎科學硏究所 1990 基礎科學硏究 Vol.10 No.-
The group algebra KS₃corresponding to the symmetric group S₃which permutes 3 objects was analyzed by using generating primitive idempotents made from Young's tableaus. Their primitivity and orthogonality relations between them was shown and derived. Introduction to group representation was also reviewed.
崔性春 嶺南大學校 基礎科學硏究所 1992 基礎科學硏究 Vol.12 No.-
Cauchy problem in various fields such as relativistic wave or field equations were discussed and the solutions of classical mechanics equations of motion were shown in Bernoulli's way as well as Laplace transform and inversion way. Laplace inversion method was discussed in order to genealize.
최옥식,최성춘 嶺南大學校 基礎科學硏究所 1994 基礎科學硏究 Vol.14 No.-
The proof of the inversion of Fourier transform is done by the contour integral technique, and the possibility of the change of the improper double integration is discussed as well as the calcuation of accompaning contour integral.
최성춘 嶺南大學校 基礎科學硏究所 1993 基礎科學硏究 Vol.13 No.-
Cauchy problem of the quantum wave equantion was solved by integration of the time varible and iteration. Also the global time behvior was discussed. Later Laplace transform and its inversion were shown in oder to get the idea of Green's function.
崔性春 嶺南大學校 基礎科學硏究所 1991 基礎科學硏究 Vol.11 No.-
Analytic continuation of Legendre functions for the complex angular momentum was discussed. Starting from the real angular momentum for the large value, the complex large angular momentum continuation was made by using complex integrals and the asymptotic behavior of the integrals was discussed.
崔性春 嶺南大學校 基礎科學硏究所 1994 基礎科學硏究 Vol.14 No.-
Cauchy Problem of the canonical equations of motion is discussed, and the modified Hamilton's principle is derived by considering the coordinate and momentum tsransformations. Also the action changes under the spatial and time changes are calculated to show the satisfaction of Hamilton-jacobi equation in the different sense.