-
1
-
-
0034415996
-
The condition number of real Vandermonde, Krylov and positive definite Hankel matrices
-
B. Beckermann The condition number of real Vandermonde, Krylov and positive definite Hankel matrices Numer. Math. 85 2000 553-577
-
(2000)
Numer. Math.
, vol.85
, pp. 553-577
-
-
Beckermann, B.1
-
2
-
-
0036400774
-
Small eigenvalues of large Hankel matrices: The indeterminate case
-
C. Berg Y. Chen M.E.H. Ismail Small eigenvalues of large Hankel matrices: The indeterminate case Math. Scand. 91 2002 67-81
-
(2002)
Math. Scand.
, vol.91
, pp. 67-81
-
-
Berg, C.1
Chen, Y.2
Ismail, M.E.H.3
-
3
-
-
0033595638
-
Small eigenvalues of large Hankel matrices
-
Y. Chen N. Lawrence Small eigenvalues of large Hankel matrices J. Phys. A 32 1999 7305-7315
-
(1999)
J. Phys. A
, vol.32
, pp. 7305-7315
-
-
Chen, Y.1
Lawrence, N.2
-
4
-
-
2442520419
-
Smallest eigenvalues of Hankel matrices for exponential weights
-
Y. Chen D.S. Lubinsky Smallest eigenvalues of Hankel matrices for exponential weights J. Math. Anal. Appl. 293 2004 476-495
-
(2004)
J. Math. Anal. Appl.
, vol.293
, pp. 476-495
-
-
Chen, Y.1
Lubinsky, D.S.2
-
6
-
-
0002534477
-
Where does the sup norm of a weighted polynomial live?
-
H.N. Mhaskar E.B. Saff Where does the sup norm of a weighted polynomial live? Constr. Approx. 1 1985 71-91
-
(1985)
Constr. Approx.
, vol.1
, pp. 71-91
-
-
Mhaskar, H.N.1
Saff, E.B.2
-
8
-
-
0011038060
-
On some Hermitian forms associated with two given curves of the complex plane
-
G. Szegö (Ed.) Birkhäuser Basel
-
G. Szego On some Hermitian forms associated with two given curves of the complex plane in: G. Szegö (Ed.) in: Collected Papers vol. 2 1982 Birkhäuser Basel 666
-
(1982)
Collected Papers
, vol.2
, pp. 666
-
-
Szego, G.1
-
9
-
-
0007299196
-
The condition of Gram matrices and related problems
-
J.M. Taylor The condition of Gram matrices and related problems Proc. Roy. Soc. Edinburgh Sect. A 80 1978 45-56
-
(1978)
Proc. Roy. Soc. Edinburgh Sect. A
, vol.80
, pp. 45-56
-
-
Taylor, J.M.1
-
10
-
-
0012064889
-
The condition number of the finite segment of the Hilbert matrix
-
J. Todd The condition number of the finite segment of the Hilbert matrix Nat. Bur. of Standards Appl. Math. Series 39 1954 109-116
-
(1954)
Nat. Bur. of Standards Appl. Math. Series
, vol.39
, pp. 109-116
-
-
Todd, J.1
-
11
-
-
21344486577
-
How bad are Hankel matrices?
-
E.E. Tyrtyshnikov How bad are Hankel matrices? Numer. Math. 67 1994 261-269
-
(1994)
Numer. Math.
, vol.67
, pp. 261-269
-
-
Tyrtyshnikov, E.E.1
-
12
-
-
84968469786
-
Small eigenvalues of large Hankel matrices
-
H. Widom H.S. Wilf Small eigenvalues of large Hankel matrices Proc. Amer. Math. Soc. 17 1966 338-344
-
(1966)
Proc. Amer. Math. Soc.
, vol.17
, pp. 338-344
-
-
Widom, H.1
Wilf, H.S.2
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