Khái niệm cốt lõi
The maximum growth factor under complete pivoting is larger than 1.0045n for all n > 10, and the lim sup of the ratio with n is greater than or equal to 3.317. This disproves the long-standing conjecture that the growth factor is at most n.
Tóm tắt
The paper combines modern numerical computation with theoretical results to improve the understanding of the growth factor problem for Gaussian elimination with complete pivoting.
Key highlights:
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Numerical search and stability/extrapolation results provide improved lower bounds for the maximum growth factor:
- The growth factor is at least 1.0045n for all n > 10.
- The lim sup of the ratio of the growth factor to n is at least 3.317.
- This disproves the long-standing conjecture that the growth factor is at most n.
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Theoretical results:
- The maximum growth factor over matrices with entries restricted to a subset of the reals is nearly equal to the maximum growth factor over all real matrices.
- The growth factors under floating point arithmetic and exact arithmetic are nearly identical.
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Extensive numerical computations:
- Improvements over previously known maximum growth factors for small matrix sizes.
- Observations about Hadamard matrices and their relationship to the growth factor problem.
- Tabulated numerical results for matrix sizes up to n = 75 and n = 100.
The paper provides strong evidence that the maximum growth factor exhibits super-linear growth, contradicting the old conjecture that it might never be bigger than n.
Thống kê
The paper does not contain any key metrics or important figures to support the author's key logics. The focus is on theoretical results and numerical computations of the maximum growth factor.
Trích dẫn
The paper does not contain any striking quotes supporting the author's key logics.