Application of the WKB Theory to Investigate Electron Tunneling in Kek-Y Graphene

Abstract: In this paper, we have constructed a WKB approximation for graphene having a Y-shaped Kekulé lattice distortion and a special folding of the K and K′ valleys, which leads to very specific linear energy dispersions with two non-equivalent pairs of subbands. These obtained semi-classical results, which include the action, electron momentum and wave functions, are utilized to analyze the dynamics of electron tunneling through non-square potential barriers. In particular, we explore resonant scattering of an elect… Show more

“…The study of matrix differential operators is a fast developing part of mathematics due to its various applications in mathematical physics in different fields like plasma physics, hydrodynamics, astrophysics, control theory, mechanics, quantum mechanics and mathematical physics among others [1,3]. Most advances in matrix differential operators have led to new insights into the behavior of complex systems and the development of efficient algorithms for solving them.…”

Liouville-Green formulas for the fourth order matrix differential operators

“…The study of matrix differential operators is a fast developing part of mathematics due to its various applications in mathematical physics in different fields like plasma physics, hydrodynamics, astrophysics, control theory, mechanics, quantum mechanics and mathematical physics among others [1,3]. Most advances in matrix differential operators have led to new insights into the behavior of complex systems and the development of efficient algorithms for solving them.…”

Liouville-Green formulas for the fourth order matrix differential operators

Tunneling valley Hall effect induced by coherent geometric phase