Abstract
Green function of the clamped-free boundary value problem for (-1)M(d/dx)2M on the interval (-1,1) is obtained. Its Green function is a reproducing kernel for a suitable set of Hilbert space and an inner product. By using the fact, the best constant of Sobolev inequality corresponding to this boundary value problem is obtained as a function of M. The best constant is the maximal value of the diagonal value G(y,y) of Green function G(x,y).
Citation
Kazuo Takemura. "The best constant of Sobolev inequality corresponding to clamped-free boundary value problem for (-1)M(d/dx)2M." Proc. Japan Acad. Ser. A Math. Sci. 85 (8) 112 - 117, October 2009. https://doi.org/10.3792/pjaa.85.112
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