X-Git-Url: https://bilbo.iut-bm.univ-fcomte.fr/and/gitweb/desynchronisation-controle.git/blobdiff_plain/30b003311b2d550b2d7fbe8179df2320df1acf2f..110a1a5d3f942917cabd4b60afa51b0ea2989229:/IWCMC14/convexity.tex?ds=inline diff --git a/IWCMC14/convexity.tex b/IWCMC14/convexity.tex index 0519ecb..9ca786a 100644 --- a/IWCMC14/convexity.tex +++ b/IWCMC14/convexity.tex @@ -1 +1,32 @@ - \ No newline at end of file +In the algorithm presented in the previous section, +the encoding power consumption is iteratively updated with +$ +P_{sh}^{(k)} += +\arg \min_{p > 0} +\left( +v_h^{(k)}.\dfrac{\ln(\sigma^2/D_h)}{\gamma p ^{2/3}} + \lambda_h^{(k)}p +\right) +$. +The function inside the $\arg \min$ is stricly convex if and only if +$\lamda_h$ is not null. This asymptotic configuration may arrise due to +the definition of $\lambda_i$. Worth, in this case, the function is +stricly decreasing and the minimal value is obtained when $p$ is the infinity. + +To prevent this configuration, we replace the objective function given +in equation~(\ref{eq:obj2}) by +\begin{equation} +\sum_{i \in N }q_i^2 + +\delta_x \sum_{h \in V, l \in L } .x_{hl}^2 ++ \delta_r\sum_{h \in V }\delta.R_{h}^2 ++ \delta_p\sum_{h \in V }\delta.P_{sh}^{\frac{8}{3}}. +\label{eq:obj2} +\end{equation} +In this equation we have first introduced new regularisation factors +(namely $\delta_x$, $\delta_r$, and $\delta_p$) +instead of the sole $\delta$. +This allows to further study the influence of each modification separately. +Next, the introduction of the rationnal exponent is motivated by the goal of +providing a stricly convex function. + + \ No newline at end of file