Title of article :
Numerical solution of 3-feather rose coefficient in bivariate Schrodinger equation by rectangular FEM
Author/Authors :
Ghorbani ، M. Department of mathematics - Qom University of Technology , Moeini ، M. Department of Mathematics - Islamic Azad University of Tehran, Roudehen Branch , Jamie ، M. Department of Mathematics - Qom University of Technology (QUT)
Abstract :
In this work, we approximate a typical model form of bivariate static Schrödinger Equation by an appropriate approach based on bilinear finite element method (FEM), then we obtain the results of the PDE on a new type 3 feather rose coefficient V(x, y) function in a rectangular domain i.e., eigenfunctions or solutions. In fact, we search for influence of 3-feather rose and pass by a weak singularity barrier in the origin. We also obtain approximate eigenvalues and final stiffness matrix elements. This paper is accompanied by examples of the novel Schrodinger’s model.
Keywords :
Rectangular and bilinear finite elements , Schrodinger equation , 3 feather rose form potential , Variable Schrodinger coefficient , Galerkin method
Journal title :
Mathematics and Computational Sciences
Journal title :
Mathematics and Computational Sciences
