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물리:짚고_넘어가야_할_점 [2022/12/02 14:54] – jiwon | 물리:짚고_넘어가야_할_점 [2022/12/06 16:01] – jiwon | ||
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Line 155: | Line 155: | ||
\right) | \right) | ||
$$ | $$ | ||
- | 와 같다. | + | 가 되며, replicon mode의 중복도는 2가 된다. $n=4$, $m_1=2$라면 |
+ | $$\mathbf G= | ||
+ | \left( | ||
+ | \begin{array}{cccccccccc} | ||
+ | A & B_1 & B_0 & B_0 & C_1 & C_0 & C_0 & D_{01} & D_{01} & D_{11} \\ | ||
+ | B_1 & A & B_0 & B_0 & C_1 & D_{01} & D_{01} & C_0 & C_0 & D_{11} \\ | ||
+ | B_0 & B_0 & A & B_1 & D_{11} & C_0 & D_{01} & C_0 & D_{01} & C_1 \\ | ||
+ | B_0 & B_0 & B_1 & A & D_{11} & D_{01} & C_0 & D_{01} & C_0 & C_1 \\ | ||
+ | C_1 & C_1 & D_{11} & D_{11} & P_1 & Q_{01} & Q_{01} & Q_{01} & \ | ||
+ | Q_{01} & R_{2:2,1} \\ | ||
+ | C_0 & D_{01} & C_0 & D_{01} & Q_{01} & P_0 & Q_{10} & Q_{10} & \ | ||
+ | R_{2: | ||
+ | C_0 & D_{01} & D_{01} & C_0 & Q_{01} & Q_{10} & P_0 & R_{2:2,0} & \ | ||
+ | Q_{10} & Q_{01} \\ | ||
+ | D_{01} & C_0 & C_0 & D_{01} & Q_{01} & Q_{10} & R_{2:2,0} & P_0 & \ | ||
+ | Q_{10} & Q_{01} \\ | ||
+ | D_{01} & C_0 & D_{01} & C_0 & Q_{01} & R_{2:2,0} & Q_{10} & Q_{10} & \ | ||
+ | P_0 & Q_{01} \\ | ||
+ | D_{11} & D_{11} & C_1 & C_1 & R_{2:2,1} & Q_{01} & Q_{01} & Q_{01} & \ | ||
+ | Q_{01} & P_1 \\ | ||
+ | \end{array} | ||
+ | \right) | ||
+ | $$ | ||
+ | 고윳값들은 | ||
+ | $$ | ||
+ | \left( | ||
+ | \begin{array}{c} | ||
+ | P_0-2 Q_{10}+R_{2: | ||
+ | \frac{1}{2} \left(-\sqrt{(A-B_1+P_0-R_{2: | ||
+ | (P_0-R_{2: | ||
+ | \right) \\ | ||
+ | \frac{1}{2} \left(-\sqrt{(A-B_1+P_0-R_{2: | ||
+ | (P_0-R_{2: | ||
+ | \right) \\ | ||
+ | \frac{1}{2} \left(\sqrt{(A-B_1+P_0-R_{2: | ||
+ | (P_0-R_{2: | ||
+ | \right) \\ | ||
+ | \frac{1}{2} \left(\sqrt{(A-B_1+P_0-R_{2: | ||
+ | (P_0-R_{2: | ||
+ | \right) \\ | ||
+ | \frac{1}{2} \left(-\sqrt{(A-2 B_0+B_1+P_1-R_{2: | ||
+ | (P_1-R_{2: | ||
+ | B_0+B_1+P_1-R_{2: | ||
+ | \frac{1}{2} \left(\sqrt{(A-2 B_0+B_1+P_1-R_{2: | ||
+ | (P_1-R_{2: | ||
+ | B_0+B_1+P_1-R_{2: | ||
+ | \cdots | ||
+ | \end{array} | ||
+ | \right) | ||
+ | $$ | ||
+ | 로 중복도가 2가 아니라 1이 된다. | ||