在sub-Riemannian geometry中,horizontal mean curvature在曲面上的可積性扮演著重要的角色,並且在許多研究中常被假設是對的。但是,在Heisenberg group中,存在著一個C2 曲面,使得這個曲面上的horizontal mean curvature不是局部可積的。 本篇論文探討的問題是:在Heisenberg group 的曲面上,horizontal mean curvature在isolated characteristic point 附近的局部可積性。我們主要探討在Heisenberg group裡面其中一類的曲面,並建立一些在這些曲面上,horizontal mean curvature 可積性的充份條件。;The integrability of the horizontal mean curvature H plays a crucial role in sub-Riemannian geometry and is often assumed in many works. However, in the first Heisenberg group, which serves as a fundamental example of sub-Riemannian manifolds, there exists a C2 surface where H for which fails to be locally integrable near the characteristic set. In this paper, we investigate the local integrability of H for surfaces near isolated characteristic points in the first Heisenberg group, as conjectured in [DGN12]. We study a specific class of surfaces and establish sufficient conditions that support the validity of the conjecture.
