Push-Diging
作者:互联网
Push-DIGing Algorithm
For $k=0,1,2, \cdots$ do
$\mathbf{u}(k+1)=\mathbf{C}(k)(\mathbf{u}(k)-\alpha \mathbf{y}(k))$
$\mathbf{v}(k+1)=\mathbf{C}(k) \mathbf{v}(k) ; \mathbf{V}(k+1)=\operatorname{diag}\{\mathbf{v}(k+1)\}$
$\mathbf{x}(k+1)=(\mathbf{V}(k+1))^{-1} \mathbf{u}(k+1)$
$\mathbf{y}(k+1)=\mathbf{C}(k) \mathbf{y}(k)+\nabla \mathbf{f}(\mathbf{x}(k+1))-\nabla \mathbf{f}(\mathbf{x}(k))$
end for
假设1: B连通性假设
\mathcal{G}_{\tilde{B}_{\ominus}}^{\mathrm{dir}}\left(t \tilde{B}_{\ominus}\right) \triangleq\left\{\mathcal{V}, \quad \bigcup_{\ell=t \tilde{B}_{\ominus}}^{(t+1) \tilde{B}_{\ominus}-1} \mathcal{A}(\ell)\right\}
标签:right,mathbf,ell,ominus,Diging,tilde,Push,mathcal 来源: https://www.cnblogs.com/sybear/p/10848854.html