Routine svd from Matlab 220.127.116.114 (R2008a) used to calculate the singular values.
|Matrix properties (click for a legend)|
|number of rows||2,392|
|number of columns||5,598|
|structural full rank?||no|
|dimension of the numerical null space||3,209|
|numerical rank / min(size(A))||0.99875|
|Euclidean norm of A||106.23|
|calculated singular value # 2389||0.024208|
| numerical rank defined using a tolerance |
|calculated singular value # 2390||2.0565e-016|
| gap in the singular values at the numerical rank: |
singular value # 2389 / singular value # 2390
|calculated condition number||4.1701e+065|
|# of blocks from dmperm||75|
|# strongly connected comp.||9|
|explicit zero entries||0|
|nonzero pattern symmetry||0%|
|numeric value symmetry||0%|
|kind||linear programming problem|
|Additional fields||size and type|
A Netlib LP problem, in lp/data. For more information send email to email@example.com with the message: send index from lp send readme from lp/data The following are relevant excerpts from lp/data/readme (by David M. Gay): The column and nonzero counts in the PROBLEM SUMMARY TABLE below exclude slack and surplus columns and the right-hand side vector, but include the cost row. We have omitted other free rows and all but the first right-hand side vector, as noted below. The byte count is for the MPS compressed file; it includes a newline character at the end of each line. These files start with a blank initial line intended to prevent mail programs from discarding any of the data. The BR column indicates whether a problem has bounds or ranges: B stands for "has bounds", R for "has ranges". The BOUND-TYPE TABLE below shows the bound types present in those problems that have bounds. The optimal value is from MINOS version 5.3 (of Sept. 1988) running on a VAX with default options. PROBLEM SUMMARY TABLE Name Rows Cols Nonzeros Bytes BR Optimal Value GREENBEA 2393 5405 31499 235711 B -7.2462405908E+07 BOUND-TYPE TABLE GREENBEA UP LO FX Supplied by Bob Fourer. When included in Netlib: Extra bound sets omitted; Extra free rows omitted. Empty RHS section. Problems GREENBEA and GREENBEB differ only in their BOUNDS sections. Bob Bixby reports that the CPLEX solver (running on a Sparc station) finds slightly different optimal values for some of the problems. On a MIPS processor, MINOS version 5.3 (with crash and scaling of December 1989) also finds different optimal values for some of the problems. The following table shows the values that differ from those shown above. (Whether CPLEX finds different values on the recently added problems remains to be seen.) Problem CPLEX(Sparc) MINOS(MIPS) GREENBEA -7.2555248130E+07 Source: GREENBEA, GREENBEB: a large refinery model; see the book "A Model-Management Framework for Mathematical Programming" by Kenneth H. Palmer et al. (John Wiley & Sons, New York, 1984). Added to Netlib on 6 May 1988
|nnz(V) for QR, upper bound nnz(L) for LU||700,189||514,181|
|nnz(R) for QR, upper bound nnz(U) for LU||79,425||84,777|
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.