Help with formulating the objective function of my subproblem

Question

i have a pretty basic question regarding column generation. I have the following scheduling problem i would like to solve with column generation: \begin{align} &\min\sum_{t}^{}\sum_{s}^{}slack_{ts}\\ &\sum_{i}^{}x_{its}=Demand_{ts}+slack_{ts}\forall t,s\\ &\sum_{s}^{}x_{its}\le 1\forall i,t\\ &x_{its}\in\left\{ 0,1 \right\}\\ &Demand_{ts},slack_{ts}\ge 0 \forall t,s\\ \end{align}

I would decompose the problem in the following master and subproblem: \begin{align} &MP: \min\sum_{t}^{}\sum_{s}^{}slack_{ts}\\ &\sum_{i}^{}\sum_{r}^{}\lambda_{ir}x^{r}_{its}=Demand_{ts}+slack_{ts}\forall t,s\\ &\sum_{r}^{}\lambda_{ir}=1 \forall i\\ &\lambda_{ir}\in\left\{ 0,1 \right\}\\ \\ &SP: \min 1-\sum_{t}^{}\sum_{s}^{}\pi_{ts}x_{its}-\mu_i\\ &\sum_{s}^{}x_{its}\le 1\forall i,t\\ &x_{its}\in\left\{ 0,1 \right\}\\ \end{align}

My question now is whether I have formulated the subproblem (especially the objective function) correctly? I often read that the reduced costs are calculated with $c-yA$ ($y$=duals and $A$ = constraint matrix), but i dont have any cost vector. Is a $1$ appropriate then?

Answer 1

Your original problem is: \begin{align} &\text{minimize} &\sum_t \sum_s \text{slack}_{ts} \\ &\text{subject to} &\sum_i x_{its} + \text{slack}_{ts} & = \text{Demand}_{ts} &&\forall t,s\\ &&\sum_s x_{its} &\le 1 &&\forall i,t\\ &&x_{its} &\in\left\{ 0,1 \right\} &&\forall i,t,s\\ &&\text{slack}_{ts} &\ge 0 &&\forall t,s \end{align}

For the Dantzig-Wolfe reformulation, introduce $\lambda_{ir} \ge 0$ and substitute $x_{its} = \sum_r x_{its}^r \lambda_{ir}$ in the (objective and) complicating constraints to obtain the master problem: \begin{align} &\text{minimize} &\sum_t \sum_s \text{slack}_{ts} \\ &\text{subject to} &\sum_i \sum_r x_{its}^r \lambda_{ir} + \text{slack}_{ts} & = \text{Demand}_{ts} &&\forall t,s &&\text(\text{$\pi_{ts}$ free})\\ &&\sum_r \lambda_{ir} &= 1 &&\forall i &&\text(\text{$\mu_i$ free})\\ &&\lambda_{ir} &\in\mathbb{Z}^+ &&\forall i,r\\ &&\text{slack}_{ts} &\ge 0 &&\forall t,s \end{align} The reduced cost of $\lambda_{ir}$ is $0-\sum_{t,s} \pi_{ts} x_{its}^r - \mu_i$, so the subproblem for block $i$ is: \begin{align} &\text{minimize} &0-\sum_{t,s} \pi_{ts} x_{its} - \mu_i \\ &\text{subject to} &\sum_s x_{its} &\le 1 &&\forall t\\ &&x_{its} &\in\left\{ 0,1 \right\} &&\forall t,s \end{align}

When you solve the LP relaxation of the restricted master problem, be sure to impose $\lambda_{ir} \ge 0$ (instead of $\lambda_{ir} \in [0,1]$), as discussed in Variable bounds in column generation.