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: 9 $B;YG[J}Dx<07O$NF3=P(B : DCAPM4 $BBh(B1$BIt(B $B?tM}%b%G%k2=(B : 7 $B>xH/!&6E7k$K$h$kI=LL5$05JQ2=(B


8 $B1tD>%U%#%k%?!<(B

9% latex2html id marker 8970
\setcounter{footnote}{9}\fnsymbol{footnote} 99

0.14 $BGX7J$HL\E*(B

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$\displaystyle T_{Bk} = \frac{T_{k+1/2} + T_{k-1/2}}{2}$     (113)

$B$3$3$G(B, $1 \leq k \leq KMAX$

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    $\displaystyle (T_{k} - T_{k-1}) \cdot (T_{k+1} - T_{k}) < 0$     (114)

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    $\displaystyle \hat{T}_{k} = T_{k} + S_{grst} (T_{Bk} - T_{k})$     (115)

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    $\displaystyle \Delta T_{k} \equiv \hat{T}_{k} - T_{k} = S_{grst} (T_{Bk} - T_{k})$     (116)

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    $\displaystyle \sum^{KMAX}_{k=1} c_v \Delta T_{k} \Delta p_{k}
= \sum^{KMAX}_{k=1} c_v S_{grst} (T_{Bk} - T_{k}) (p_s \Delta \sigma_{k})$     (117)

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    $\displaystyle \sum^{KMAX}_{k=1} \Delta T_{k} \Delta p_{k} = 0$     (118)

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    $\displaystyle \hat{T}_{k}
= T_{k} + S_{grst} (T_{Bk} - T_{k})
- \frac{
\sum^{KM...
...k=1} S_{grst} (T_{Bk} - T_{k}) \Delta p_{k}
}{
\sum^{KMAX}_{k=1} \Delta p_{k}
}$     (119)

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    $\displaystyle \sum^{KMAX}_{k=1} \hat{T}_{k} \Delta p_{k}
= \sum^{KMAX}_{k=1}
\l...
...- T_{k}) \Delta p_{k}
}{
\sum^{KMAX}_{k=1} \Delta p_{k}
}
\Delta p_{k}
\right\}$     (120)

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    $\displaystyle \hat{T}_{k-1}$ $\textstyle =$ $\displaystyle T_{k-1} + S_{grst} (T_{Bk-1} - T_{k-1})
- \frac{
\sum^{k+1}_{k=k-1} S_{grst} (T_{Bk} - T_{k}) \Delta p_{k}
}{
\sum^{k+1}_{k=k-1} \Delta p_{k}
},$ (121)
    $\displaystyle \hat{T}_{k}$ $\textstyle =$ $\displaystyle T_{k} + S_{grst} (T_{Bk} - T_{k})
- \frac{
\sum^{k+1}_{k=k-1} S_{grst} (T_{Bk} - T_{k}) \Delta p_{k}
}{
\sum^{k+1}_{k=k-1} \Delta p_{k}
},$ (122)
    $\displaystyle \hat{T}_{k+1}$ $\textstyle =$ $\displaystyle T_{k+1} + S_{grst} (T_{Bk+1} - T_{k+1})
- \frac{
\sum^{k+1}_{k=k-1} S_{grst} (T_{Bk} - T_{k}) \Delta p_{k}
}{
\sum^{k+1}_{k=k-1} \Delta p_{k}
}$ (123)

    $B$3$N(B $\hat{T}$ $B$rMQ$$$F(B, 1 $B$D>e$K>e$,$j(B,
    $\displaystyle \hat{\hat{T}}_{k}$ $\textstyle =$ $\displaystyle \hat{T}_{k} + S_{grst} (T_{Bk} - \hat{T}_{k})
- \frac{
\sum^{k+2}...
..._{grst} (T_{Bk} - \hat{T}_{k}) \Delta p_{k}
}{
\sum^{k+2}_{k=k} \Delta p_{k}
},$ (124)
    $\displaystyle \hat{\hat{T}}_{k+1}$ $\textstyle =$ $\displaystyle \hat{T}_{k+1} + S_{grst} (T_{Bk+1} - \hat{T}_{k+1})
- \frac{
\sum...
..._{grst} (T_{Bk} - \hat{T}_{k}) \Delta p_{k}
}{
\sum^{k+2}_{k=k} \Delta p_{k}
},$ (125)
    $\displaystyle \hat{T}_{k+2}$ $\textstyle =$ $\displaystyle T_{k+1} + S_{grst} (T_{Bk+2} - T_{k+2})
- \frac{
\sum^{k+2}_{k=k} S_{grst} (T_{Bk} - \hat{T}_{k}) \Delta p_{k}
}{
\sum^{k+2}_{k=k} \Delta p_{k}
}$ (126)

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    $\displaystyle (T_{k} - T_{k-1}) \cdot (T_{k+1} - T_{k}) < 0$     (127)

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  4. $B%.%6%.%6ItJ,$@$1$rD4@a$7(B, $B8m:9$r%.%6%.%6ItJ,A4BN$K(B $B6QEy$K$P$i$^$/>l9g(B

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    1. $B2<$+$i=g$KEP$C$F$$$C$F=i$a$F(B
      $\displaystyle (T_{k} - T_{k-1}) \cdot (T_{k+1} - T_{k}) < 0$     (128)

      $B$H$J$C$?$H$3$m$G(B, $(k-1)$ level $B$,%.%6%.%6ItJ,$NDl(B $B$HH=Dj$9$k(B.
    2. $B%.%6%.%6ItJ,$GEP$C$F$$$C$F(B
      $\displaystyle (T_{k} - T_{k-1}) \cdot (T_{k+1} - T_{k}) \geq 0$     (129)

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    $B$3$N$h$&$KH=Dj$5$l$?%.%6%.%6ItJ,A4BN$K8m:9$r$P$i$^$/(B.


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: 9 $B;YG[J}Dx<07O$NF3=P(B : DCAPM4 $BBh(B1$BIt(B $B?tM}%b%G%k2=(B : 7 $B>xH/!&6E7k$K$h$kI=LL5$05JQ2=(B
Yasuhiro MORIKAWA $BJ?@.(B19$BG/(B7$B7n(B31$BF|(B