• 대한수학회지
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• 제37권6호
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• pp.1071-1084
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• 2000

We show that a weak solution of the Cauchy problem for he nonlinear Schrodinger equation, {i∂(sub)t u + ∂$^2$(sub)x u = f(u,u), t∈(-T,T), x∈R, u(0,x) = ø(x).} in the negative solbolev space H(sup)s has a smoothing effect up to real analyticity if the initial data only have a single point singularity such as the Dirac delta measure. It is shown that for H(sup)s (R)(s>-3/4) data satisfying the condition (※Equations, See Full-text) the solution is analytic in both space and time variable. The argument is based on the recent progress on the well-posedness result by Bourgain [2] and Kenig-Ponce-Vega [18] and previous work by Kato-Ogawa [12]. We give an improved new argument in the regularity argument.

• Journal of applied mathematics & informatics
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• 제5권3호
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• pp.615-632
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• 1998

Soliton solutions of a class of generalized nonlinear evo-lution equations are discussed analytically and numerically which is achieved using a travelling wave method to formulate one-soliton solution and the finite difference method to the numerical dolutions and the interactions between the solitons for the generalized nonlinear Schrodinger equations. The characteristic behavior of the nonlinear-ity admitted in the system has been investigated and the soliton state of the system in the limit of $\alpha\;\longrightarrow\;0$ and $\alpha\;\longrightarrow\;\infty$ has been studied. The results presented show that soliton phenomena are character-istics associated with the nonlinearities of the dynamical systems.

• 한국광학회지
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• 제7권4호
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• pp.403-413
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• 1996

We study the propagation of two pulses with orthogonal linear polarizations in a nonlinear periodic dielectric structure with $X^{(3)}$ nonlinearity. Using an envelope- function approach, we derive the coupled nonlinear Schrodinger equations governing the spatio-temporal evolutions of the two orthogonally polarized modes in a nonlinear periodic structure. We then find their solitary-wave solutions referred to as coupled gap solitons. We show that two orthogonally polarized pulses can co-propagate as a coupled gap soliton through a nonlinear periodic structure while each pulse alone will be strongly reflected due to the Bragg reflection. Based on the results, we present an all-optical switching scheme which has a novel architecture and principle. We also study the stability of coupled gap solitons to find the dragging phenomena in a nonlinear birefringent periodic medium.

• 대한전자공학회논문지SD
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• 제39권2호
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• pp.14-26
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• 2002

Pauli 배타 원리를 적용한 축퇴 상태의 양자 우물 소자 모델링을 제안하였다. 양자 우물에서의 다중 에너지 부준위 각각에 대한 Boltzmann 방정식의 collision 항들을 Pauli 배타 원리를 적용하여 전개하고 이들을 Schrodinger 방정식과 Poisson 방정식과 결합하여 비선형적인 시스템의 모델을 설정하였다. 시스템의 해를 직접적으로 구하기 위하여 유한 차분법과 Newton-Raphson method를 적용하여 양자 우물의 다중 에너지 부준위 각각에 대한 캐리어 분포 함수를 구하였다. Si MOSFET의 inversion 영역에 본 모델을 적용하여 전자 밀도의 증가에 따라 양자 우물의 에너지 분포 함수가 Boltzmann 분포 함수의 형태로부터 Fermi-Dirac 분포 함수의 형태로 변화함을 제시하고, 소자 크기가 감소할수록 소자 모델링에 있어서의 Pauli 배타 원리의 중요성과 함께 본 모델의 정당함과 그 해석 방법의 효율성을 보여주었다.