Title: Unconditionally stable space-time isogeometric method for the linear Schrödinger equation Show Chinese title

Title: 无条件稳定的时空等几何方法用于线性薛定谔方程

Abstract: We propose and analyze a space-time isogeometric finite element method based on splines with maximal regularity in time for the linear time-dependent Schr\"odinger equation with a spatially varying potential. We investigate the stability and conservation properties of the method, demonstrating that it preserves both mass and energy at the final time, and it is unconditionally stable. Numerical experiments confirm our theoretical findings and illustrate the convergence behavior of the scheme. Incidentally, our analysis also provides an alternative proof of unconditional stability of the first-order-in-time isogeometric method for the wave equation proposed in (M. Ferrari, S. Fraschini, G. Loli and I. Perugia (2025)), eliminating the need for the numerical verifications required in the previous analysis. Show Chinese abstract

Abstract: 我们提出并分析了一种基于样条函数的时空等几何有限元方法，该方法在时间上具有最大正则性，用于求解具有空间变化势的线性时变薛定谔方程。 我们研究了该方法的稳定性和守恒性质，证明它在最终时间保持质量和能量，并且是无条件稳定的。 数值实验验证了我们的理论结果，并展示了该方案的收敛行为。 顺便提及，我们的分析还提供了对(M. Ferrari, S. Fraschini, G. Loli 和 I. Perugia (2025))中提出的波方程的一阶时间等几何方法无条件稳定性的另一种证明，消除了之前分析中所需的数值验证。