论文信息 - The Strengthened Cauchy-Bunyakowski-Schwarz Inequality for n-Simplicial Linear Finite Elements

The Strengthened Cauchy-Bunyakowski-Schwarz Inequality for n-Simplicial Linear Finite Elements

It is known that in one, two, and three spatial dimensions, the optimal constant in the strengthened Cauchy-Bunyakowski-Schwarz (CBS) inequality for the Laplacian for red-refined linear finite element spaces, takes values zero, and , respectively. In this paper we will conjecture an explicit relation between these numbers and the spatial dimension, which will also be valid for dimensions four and up. For each individual value of n, it is easy to verify the conjecture. Apart from giving additional insight into the matter, the result may find applications in four dimensional finite element codes in the context of computational relativity and financial mathematics.

Sergey Korotov | Michal Krízek | Jan Brandts

[1] H. Coxeter,et al. Trisecting an orthoscheme , 1989 .

[2] O. Axelsson. On multigrid methods of the two-level type , 1982 .

[3] H. Schwarz. Gesammelte mathematische Abhandlungen , 1970 .

[4] Harold W. Kuhn,et al. Some Combinatorial Lemmas in Topology , 1960, IBM J. Res. Dev..

[5] Michal Krizek,et al. Gradient superconvergence on uniform simplicial partitions of polytopes , 2003 .

[6] Sergey Korotov,et al. Local nonobtuse tetrahedral refinements of a cube , 2003, Appl. Math. Lett..

[7] H. Freudenthal. Simplizialzerlegungen von Beschrankter Flachheit , 1942 .

[8] David Eppstein,et al. Dihedral bounds for mesh generation in high dimensions , 1995, SODA '95.

[9] Radim Blaheta,et al. Nested tetrahedral grids and strengthened C.B.S. inequality , 2003, Numer. Linear Algebra Appl..

[10] Victor Eijkhout,et al. The Role of the Strengthened Cauchy-Buniakowskii-Schwarz Inequality in Multilevel Methods , 1991, SIAM Rev..