Temperature on rods with Robin boundary conditions
Abstract
We consider solutions uf to the one-dimensional Robin problem with the heat source f∈ L1[-π,π] and Robin parameter α>0. For given m, M, and s, 0 m<s<M, we identify the heat sources f0, such that uf0 maximizes the temperature gap [-π,π]uf -[-π,π]uf over all heat sources f such that m f M and \|f\|L1=2π s. In particular, this answers a question raised by J.~J.~Langford and P.~McDonald in LM. We also identify heat sources, which maximize/minimize uf at a given point x0∈ [-π,π] over the same class of heat sources as above and discuss a few related questions.
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