Sibeyn, ‘Matrix Transpose on Meshes: Theory and Practice,’ Proc. 11th International Parallel Processing Symposium , IEEE, 1997, to appear.Michael Kaufmann,,U.M.Matrix Transpose on Meshes:Theory and Practice.. 1997Kaufmann M., Meyer U. and Sibeyn J., "Matrix transpose on meshes: Theory ...
ROWS($5:5)-1 —->Returns Output:0 (ROWS($5:5)-1)*2 —->Returns (We multiply this formula by2because the return array will be a3×2 Matrix,and we want2cells in eachrow) Output:0 COLUMNS($B:B)-1 —->Becomes Output:0 COLUMNS($B:B)-1+(ROWS($5:5)-1)*2 —->Turns into ...
A unitary matrix is a matrix whose inverse equals it conjugate transpose. Unitary matrices are the complex analog of real orthogonal matrices. If U is a square, complex matrix, then the following conditions are equivalent : ■ U is unitary. ■ The conjugate transpose U* of U is unitary. ■...
It can be shown also that the region of attraction of the controller (12) increases as the integral gain KI = ε K I decreases, being the main limitation to enlarge this region, the singularities of the Jacobian matrix J. Remark 2. In practice, the Jacobian matrix J can be uncertain ...
This paper describes a new analytical model of fully adaptive routing in k-ary n-cubes in the presence of non-uniform traffic generated by matrix-transpose permutations, which is an important communication operation found in many matrix computation problems. Results obtained through simulation ...
This paper describes a new analytical model of fully adaptive routing in k-ary n-cubes in the presence of non-uniform traffic generated by matrix-transpose permutations, which is an important communication operation found in many matrix computation problems. Results obtained through simulation ...
This paper describes a new analytical model of fully adaptive routing in k-ary n-cubes in the presence of non-uniform traffic generated by matrix-transpose permutations, which is an important communication operation found in many matrix computation problems. Results obtained through simulation ...