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21 Sep 2005: ω200. 1. 0.4. 0.8. 0.2. 080. 0.6. 100. 600 400. 20. ... As long as. 1κ21 κ. 22. [. κ2κ1. ]. 6 ,. 20 A. Iserles, S.P. Nørsett, and S. Olver. we can approximate with narrow wedges, pass to a limit and obtain anasymptotic expansion,

15 Aug 2005: v2 hA(. h. 2, e. h2A(0,Y0)Y0. )= [2](h) O(h3). Y1 = ev2 Y0, (20). ... Now [1] can be approximated with Euler and [2](h) with the midpoint rule, eq.(20),.

29 Jan 2005: 4. 2. 4 00 0 0. . . ,. E1,3 =. . . 0 0 1. 20 0 10 0 0. . ... E2,3 =. . . 0 0 1. 0 0 1. 20 0 0.

3 Oct 2005: x2y3z4t)dV. 220 240 260 280 300. 0.10.20.30.40.50.6. 220 240 260 280 300. ... 20. Stein, E. (1993). Harmonic Analysis: Real-Variable Methods, Orthogonality, and Oscillatory Inte-grals.

17 Feb 2005: 40 600. ω100. 0.5. 0.4. 80. 0.3. 20 40. 0.2. 60. ... eiωg(x,y)dV. 20. The formula (6.1) can be generalized from d = 2 to general d 2.

24 Feb 2005: w1). 20. is equal to zero, in view of Lwl,.,w1(M w1,.,wnτ0,.,τn.

14 Dec 2005: Let us introduce the. 20. polynomial G of order 2k,. G(x) :=(1)k.

26 Sep 2005: 20 A. Iserles, H.Z. Munthe-Kaas, S.P. Nørsett & A. Zanna. Lie theory. ... Adp(a) g for all p G, a g. (2.20)AdpAdq = Adpq (2.21).