Let $D$ stand for the open unit disc in $mathbb{R}^d$ ($dgeq 1$) and $(D,,mathscr{B},,m)$ for the usual Lebesgue measure space on $D$. Let $mathscr{H}$ stand for the real Hilbert space $L^2(D,,m)$ with standard inner product $(cdot,,cdot)$. The lette
r $G$ signifies the Green operator for the (non-negative) Dirichlet Laplacian $-Delta$ in $mathscr{H}$ and $psi$ the torsion function $G,chi_D$. We pose the following problem. Determine the optimisers for the shape optimisation problem [ alpha_t:=supBig{(Gchi_A,chi_A):,Asubseteq Dtext{is open and}(psi,chi_A)leq t,Big} ] where the parameter $t$ lies in the range $0<t<(psi,1)$. We answer this question in the one-dimensional case $d=1$. We apply this to a problem connected to maximum flux exchange flow in a vertical duct. We also show existence of optimisers for a relaxed version of the above variational problem and derive some symmetry properties of the solutions.
Let $H$ signify the free non-negative Laplacian on $mathbb{R}^2$ and $H_Y$ the non-negative Dirichlet Laplacian on the complement $Y$ of a nonpolar compact subset $K$ in the plane. We derive the low-energy expansion for the Krein spectral shift funct
ion (scattering phase) for the obstacle scattering system ${,H_Y,,H,}$ including detailed expressions for the first three coefficients. We use this to investigate the large time behaviour of the expected volume of the pinned Wiener sausage associated to $K$.
