We construct and study numerical solutions corresponding to generalized electrically charged half-monopole in Weinberg-Salam theory,denoted as Type I and Type II solutions.These solutions possess magnetic charge q_(m)...We construct and study numerical solutions corresponding to generalized electrically charged half-monopole in Weinberg-Salam theory,denoted as Type I and Type II solutions.These solutions possess magnetic charge q_(m)=+2nπ/e(-2nπ/e)that is situated along the negative z-axis(positive z-axis)and electric charge q_(e)that depends on the electric charge parameterη,as well as net zero neutral charge.Other properties of this half-dyon configurations such as magnetic dipole moment and angular moment are studied.These solutions are closely related to the Cho-Maison monopole-antimonopole pair reported earlier but possess some distinctive features.Our results also show important implication that a full Cho-Maison monopole can undergo distortion and possesses an axially symmetric tear-drop shape.展开更多
文摘We construct and study numerical solutions corresponding to generalized electrically charged half-monopole in Weinberg-Salam theory,denoted as Type I and Type II solutions.These solutions possess magnetic charge q_(m)=+2nπ/e(-2nπ/e)that is situated along the negative z-axis(positive z-axis)and electric charge q_(e)that depends on the electric charge parameterη,as well as net zero neutral charge.Other properties of this half-dyon configurations such as magnetic dipole moment and angular moment are studied.These solutions are closely related to the Cho-Maison monopole-antimonopole pair reported earlier but possess some distinctive features.Our results also show important implication that a full Cho-Maison monopole can undergo distortion and possesses an axially symmetric tear-drop shape.
