A dimension reduction procedure for the selection of Two-spring lattice-spring topologies with minimal fabrication cost and required weighted force-resistance performance
Abstract
Starting from a problem in elastoplasticity, we consider an optimization problem C(c1,c2)=c1+c2 under constraints FRk(c1,c2)=a· Fk(c1,c2)+b· Rk(c1,c2) 1 and Fk(c1,c2) 1, where both Fk and Rk non-linear, a,b are constants, and i∈\1,2\ is an index. For each (a,b) we determine which of the two values of i∈\1,2\ leads to the smaller minimum of the optimization problem. This way we obtain an interesting curve bounding the region where k=1 outperforms k=2.
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