arXiv Open Access 2017

On Nonintersection of Spectra of some Functionals on Spaces $\mathop{W}\limits^\circ{}^2_n$, $\mathop{W}\limits^\circ{}^2_{n+1}$, $\mathop{W}\limits^\circ{}^2_{n+2}$

Andrey Minarskiy

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Abstrak

Spectra of functionals $$Φ(u)=\frac{\left\langle u^{(n)}u^{(n)}\right\rangle}{\left\langle u^{(n-p)}u^{(n-p)}\right\rangle}$$ in spaces ${\mathop{W}\limits^\circ}^2_n$ are considered for different $n$. One has shown that for even functions in $\mathop{W}\limits^\circ{}^2_n$ and $\mathop{W}\limits^\circ{}^2_m$ spectra of functionals do not intersect for $m=n+1, n+2$. The neccesary conditions for two spectra to intersect are written for $Δ=m-n>2$.

Topik & Kata Kunci

math.SP

Penulis (1)

Andrey Minarskiy

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APA MLA BibTeX

Minarskiy, A. (2017). On Nonintersection of Spectra of some Functionals on Spaces $\mathop{W}\limits^\circ{}^2_n$, $\mathop{W}\limits^\circ{}^2_{n+1}$, $\mathop{W}\limits^\circ{}^2_{n+2}$. https://arxiv.org/abs/1706.00217

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Informasi Jurnal

Tahun Terbit: 2017
Bahasa: en
Sumber Database: arXiv
Akses: Open Access ✓