This\ncommutative algebra has also appeared in the study of configuration spaces and\nwe called it the $\\Delta$-algebra. As a natural application, we generalize the\nwell-known square move. This allows us to generate infinite families of new\nmoves between non-planar on-shell diagrams. We...
自我调节We renormalize the model of multiple Dirac delta potentials in two and three dimensions by regularizing it through the minimal extension of Heisenberg algebra. We show that the results are consistent with the other regularization schemes given in the literature.Fatih Erman理论物理通讯(英文版)...
Gomez, Curriculum design for the algebra-based course: Just change the d's to deltas?. In Proceedings of the Phys. Ed. Res. Conference, C. Henderson, M. Sabella, and L. Hsu (Eds.) AIP Conf. Proc. 1064, 34-37, Melville, NY (2008)....
Renormalization of Dirac Delta Potentials Through Minimal Extension of Heisenberg Algebra Heisenberg 狄拉克 极小 重正化 δ势 海森堡代数 扩展模型 自我调节摘要:doi:10.1088/0253-6102/68/3/313Fatih ErmanDepartment of MathematicsvipCommunications in Theoretical Physics...
We first show that Delta(2) = 0 implies that D <= 5 or c(2) is an element of {1, 2}. For x is an element of X let T = T(x) denote the subalgebra of Mat(X)(C) generated by A, E-0*, E-0*,..., E-D*, where for 0 <= i <= D, E-i* represents the ...
Hussain, Yau, and Zuo introduced the Lie algebra Lk(V) from the derivation of the local algebra Mk(V):=On/(g+J1(g)+⋯+Jk(g)). To find the dimension of a newly defined algebra is an important task in order to study its properties. In this regard, we com