Routine svd from Matlab 7.6.0.324 (R2008a) used to calculate the singular values.

Matrix properties (click for a legend) | |

number of rows | 100 |

number of columns | 100 |

structural full rank? | yes |

structural rank | 100 |

numerical rank | 8 |

dimension of the numerical null space | 92 |

numerical rank / min(size(A)) | 0.08 |

Euclidean norm of A | 0.44698 |

calculated singular value # 8 | 4.3172e-013 |

numerical rank defined using a tolerance max(size(A))*eps(norm(A)) = | 5.5511e-015 |

calculated singular value # 9 | 3.3535e-015 |

gap in the singular values at the numerical rank: singular value # 8 / singular value # 9 | 128.74 |

calculated condition number | 1.9377e+020 |

condest | 9.8551e+019 |

nonzeros | 10,000 |

# of blocks from dmperm | 1 |

# strongly connected comp. | 1 |

entries not in dmperm blocks | 0 |

explicit zero entries | 0 |

nonzero pattern symmetry | symmetric |

numeric value symmetry | 0% |

type | real |

structure | unsymmetric |

Cholesky candidate? | no |

positive definite? | no |

author | Wing and Zahrt |

editor | Per Christian Hansen |

date | 1991 |

kind | ill-posed problem |

2D/3D problem? | no |

SJid | 261 |

UFid | - |

Additional fields | size and type |

b | full 100-by-1 |

x | full 100-by-1 |

Notes:

Constructed by the call [A,b,x]= wing(100) where wing is from Regularization Tools. The description of wing from http://www2.imm.dtu.dk/~pch/Regutools/ is: [A,b,x] = wing(n,t1,t2) Discretization of a first kind Fredholm integral eqaution with kernel K and right-hand side g given by K(s,t) = t*exp(-s*t^2) 0 < s,t < 1 g(s) = (exp(-s*t1^2) - exp(-s*t2^2)/(2*s) 0 < s < 1 and with the solution f given by f(t) = | 1 for t1 < t < t2 | 0 elsewhere. Here, t1 and t2 are constants satisfying t1 < t2. If they are not speficied, the values t1 = 1/3 and t2 = 2/3 are used.

Ordering statistics: | AMD |
METIS |

nnz(chol(P*(A+A'+s*I)*P')) | 5,050 | 5,050 |

Cholesky flop count | 3.4e+005 | 3.4e+005 |

nnz(L+U), no partial pivoting | 10,000 | 10,000 |

nnz(V) for QR, upper bound nnz(L) for LU | 5,050 | 5,050 |

nnz(R) for QR, upper bound nnz(U) for LU | 5,050 | 5,050 |

*Maintained by Leslie Foster, last updated 24-Apr-2009.*

Entries 5 through 14 in the table of matrix properties and the singular

value plot were created using SJsingular code. The other plots

and statistics are produced using utilities from
the SuiteSparse package.

Matrix color plot pictures by cspy, a MATLAB function in the CSparse package.