Koller Andrew, Olshanii Maxim
Department of Physics, University of Massachusetts Boston, Boston, Massachusetts 02125, USA.
Phys Rev E Stat Nonlin Soft Matter Phys. 2011 Dec;84(6 Pt 2):066601. doi: 10.1103/PhysRevE.84.066601. Epub 2011 Dec 9.
We present a case demonstrating the connection between supersymmetric quantum mechanics (SUSYQM), reflectionless scattering, and soliton solutions of integrable partial differential equations. We show that the members of a class of reflectionless Hamiltonians, namely, Akulin's Hamiltonians, are connected via supersymmetric chains to a potential-free Hamiltonian, explaining their reflectionless nature. While the reflectionless property in question has been mentioned in the literature for over two decades, the enabling algebraic mechanism was previously unknown. Our results indicate that the multisoliton solutions of the sine-Gordon and nonlinear Schrödinger equations can be systematically generated via the supersymmetric chains connecting Akulin's Hamiltonians. Our findings also explain a well-known but little-understood effect in laser physics: when a two-level atom, initially in the ground state, is subjected to a laser pulse of the form V(t) = (nh/τ)/cosh(t/τ), with n being an integer and τ being the pulse duration, it remains in the ground state after the pulse has been applied, for any choice of the laser detuning.
我们展示了一个案例,该案例说明了超对称量子力学(SUSYQM)、无反射散射以及可积偏微分方程的孤子解之间的联系。我们表明,一类无反射哈密顿量(即阿库林哈密顿量)的成员通过超对称链与一个无势哈密顿量相连,从而解释了它们的无反射性质。虽然文献中提及相关的无反射特性已有二十多年,但此前尚不清楚其背后起作用的代数机制。我们的结果表明,正弦 - 戈登方程和非线性薛定谔方程的多孤子解可以通过连接阿库林哈密顿量的超对称链系统地生成。我们的发现还解释了激光物理学中一个广为人知但却鲜为人理解的效应:当初始处于基态的二能级原子受到形式为(V(t) = (nh/τ)/cosh(t/τ))的激光脉冲作用时(其中(n)为整数,(τ)为脉冲持续时间),对于任何激光失谐的选择,在施加脉冲后它仍保持在基态。
