Searched refs:c_j (Results 201 – 225 of 230) sorted by relevance
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1013 $h_j^2 = c_j^2 + \sum{f_{ij}^2}$
4258 actions needed to implement \.{LDPTP} and \.{LDPTE}. Coroutine~$c_j$4404 @ The first stage of coroutine $c_j$ is |co[2*j]|. It will pass the $j$th
6993 \[ P(a_k)=\sum_{j=0}^{N-1}c_j(\omega_N^{-k})^j=F_N(c)_k \]7015 \[ P(a_k)=\sum_{j=0}^{N-1}c_j(\omega_N^{k})^j=NF_N^{-1}(c)_k \]7123 Conclusion: if $|n|<N/2$, $\tilde{c_n}-c_n$ is a sum of $c_j$ of large indexes
18007 c_j 2842
57755 c_j 2724
62601 c_j 2862
9601 \[ P(a_k)=\sum_{j=0}^{N-1}c_j(\omega_N^{-k})^j=F_N(c)_k \]9623 \[ P(a_k)=\sum_{j=0}^{N-1}c_j(\omega_N^{k})^j=NF_N^{-1}(c)_k \]9731 Conclusion: if $|n|<N/2$, $\tilde{c_n}-c_n$ is a sum of $c_j$ of large indexes
4311 - \sum_{i=n-N+1}^{N-1}\sum_{j=n-N+1}^{N-1} w_iw_j c_j \beta_{ij} (\Res[i] + G \RRes[i]),
9527 character $c = (c_j)$ on \kbd{G} (generic character \typ{VEC} or9529 generators $G = \oplus (\Z/d_j\Z) g_j$, $\chi(g_j) = e(c_j/d_j)$.