(!******************************************************* Mosel Example Problems ====================== file s8els.mos `````````````` Economic lot sizing, ELS, problem (Cut generation algorithm adding (l,S)-inequalities in one or several rounds at the root node or in tree nodes) (c) 2008 Fair Isaac Corporation author: S. Heipcke, June 2003, rev. July 2023 *******************************************************!) model "S-8 ELS" uses "mmxprs","mmsystem" parameters ALG = 0 ! Default algorithm: no user cuts CUTDEPTH = 10 ! Maximum tree depth for cut generation EPS = 1e-6 ! Zero tolerance FULLPATH = '' end-parameters forward function cb_node:boolean forward procedure tree_cut_gen declarations TIMES = 1..20 ! Range of time PRODUCTS = 1..4 ! Set of products DEMAND: array(PRODUCTS,TIMES) of integer ! Demand per period SETUPCOST: array(TIMES) of integer ! Setup cost per period PRODCOST: array(PRODUCTS,TIMES) of real ! Production cost per period CAP: array(TIMES) of integer ! Production capacity per period D: array(PRODUCTS,TIMES,TIMES) of integer ! Total demand in periods t1 - t2 produce: array(PRODUCTS,TIMES) of mpvar ! Production in period t setup: array(PRODUCTS,TIMES) of mpvar ! Setup in period t solprod: array(PRODUCTS,TIMES) of real ! Sol. values for var.s produce solsetup: array(PRODUCTS,TIMES) of real ! Sol. values for var.s setup starttime: real end-declarations initializations from FULLPATH + "s8els.dat" DEMAND SETUPCOST PRODCOST CAP end-initializations forall(p in PRODUCTS,s,t in TIMES) D(p,s,t):= sum(k in s..t) DEMAND(p,k) ! Objective: minimize total cost MinCost:= sum(t in TIMES) (SETUPCOST(t) * sum(p in PRODUCTS) setup(p,t) + sum(p in PRODUCTS) PRODCOST(p,t) * produce(p,t) ) ! Satisfy the total demand forall(p in PRODUCTS,t in TIMES) sum(s in 1..t) produce(p,s) >= sum (s in 1..t) DEMAND(p,s) ! If there is production during t then there is a setup in t forall(p in PRODUCTS, t in TIMES) produce(p,t) <= D(p,t,getlast(TIMES)) * setup(p,t) ! Capacity limits forall(t in TIMES) sum(p in PRODUCTS) produce(p,t) <= CAP(t) ! Variables setup are 0/1 forall(p in PRODUCTS, t in TIMES) setup(p,t) is_binary ! Uncomment to get detailed MIP output setparam("XPRS_VERBOSE", true) writeln("**************ALG=",ALG,"***************") SEVERALROUNDS:=false; TOPONLY:=false case ALG of 1: setparam("XPRS_CUTSTRATEGY", 0) ! No cuts 2: setparam("XPRS_PRESOLVE", 0) ! No presolve 3: tree_cut_gen ! User branch-and-cut + automatic cuts 4: do ! User branch-and-cut (several rounds), tree_cut_gen ! no automatic cuts setparam("XPRS_CUTSTRATEGY", 0) SEVERALROUNDS:=true end-do 5: do ! User cut-and-branch (several rounds) tree_cut_gen ! + automatic cuts SEVERALROUNDS:=true TOPONLY:=true end-do 6: do ! User branch-and-cut (several rounds) tree_cut_gen ! + automatic cuts SEVERALROUNDS:=true end-do end-case setparam("xprs_threads",1) ! Disable parallel to prevent Excel freezing up when processing optimizer log lines setparam("XPRS_MIPLOG",-20) minimize(MinCost) ! Solve the problem writeln("Time: ", 44, "sec, Nodes: ", getparam("XPRS_NODES"), ", Solution: ", getobjval) write("Period setup ") forall(p in PRODUCTS) write(strfmt(p,-7)) forall(t in TIMES) do write("\n ", strfmt(t,2), strfmt(getsol(sum(p in PRODUCTS) setup(p,t)),8), " ") forall(p in PRODUCTS) write(getsol(produce(p,t)), " (",DEMAND(p,t),") ") end-do writeln !************************************************************************* ! Cut generation loop: ! get the solution values ! identify and set up violated constraints ! load the modified problem and load the saved basis !************************************************************************* function cb_node:boolean declarations ncut:integer ! Counter for cuts cut: array(range) of linctr ! Cuts cutid: array(range) of integer ! Cut type identification type: array(range) of integer ! Cut constraint type objval,ds: real end-declarations returned:=false ! OPTNODE: This node is not infeasible depth:=getparam("XPRS_NODEDEPTH") cnt:=getparam("XPRS_CALLBACKCOUNT_OPTNODE") if ((TOPONLY and depth<1) or (not TOPONLY and depth<=CUTDEPTH)) and (SEVERALROUNDS or cnt<=1) then ncut:=0 ! Get the solution values forall(t in TIMES, p in PRODUCTS) do solprod(p,t):=getsol(produce(p,t)) solsetup(p,t):=getsol(setup(p,t)) end-do ! Search for violated constraints forall(p in PRODUCTS,l in TIMES) do ds:=0 forall(t in 1..l) if (solprod(p,t) < D(p,t,l)*solsetup(p,t) + EPS) then ds += solprod(p,t) else ds += D(p,t,l)*solsetup(p,t) end-if ! Generate the violated inequality if (ds < D(p,1,l) - EPS) then cut(ncut):= sum(t in 1..l) if(solprod(p,t)<(D(p,t,l)*solsetup(p,t))+EPS, produce(p,t), D(p,t,l)*setup(p,t)) - D(p,1,l) cutid(ncut):= 1 type(ncut):= CT_GEQ ncut+=1 end-if end-do ! Add cuts to the problem if ncut>0 then addcuts(cutid, type, cut); writeln("Cuts added : ", ncut, " (depth ", depth, ", node ", getparam("XPRS_NODES"), ", obj. ", getparam("XPRS_LPOBJVAL"), ")") end-if end-if end-function ! ****Optimizer settings for using the cut manager**** procedure tree_cut_gen setparam("XPRS_PRESOLVE", 0) ! Switch presolve off setparam("XPRS_EXTRAROWS", 5000) ! Reserve extra rows in matrix setcallback(XPRS_CB_OPTNODE, ->cb_node) ! Set the optnode callback func. end-procedure end-model