The spectra of boundary value problems related to one-dimensional high order embedding theorems are considered. It is proved that for some orders, the eigenvalues corresponding to even eigenfunctions of different problems cannot coincide.
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X. Ai and W. Li, “Karhunen–Loève expansions for the m-th order detrended Brownian motion,” Science China Math., 57, No. 10, 2043–2052 (2014).
X. Ai, W. Li, and G. Liu, “Karhunen–Loève expansions for the detrended Brownian motion,” Stat. Probab. Letters, 82, No. 7, 1235–1241 (2012).
M. S. Birman and M. Z. Solomyak, Spectral Theory of Self-Adjoint Operators in Hilbert Space, 2nd ed., Lan’ (2010).
G. Cimmino, “Su una questione di minimo,” Boll. Un. Mat. Ital., 9, 1–6 (1930).
I. S. Gradstein and I. M. Ryzhik, Tables of Integrals, Sums, Series and Products, 5th ed., Nauka, Moscow (1971).
M. Janet, “Sur la méthode de Legendre–Jacobi–Clebsch et quelques-unes de ses applications,” Bull. Sci. Math., 53, 144–160 (1929).
M. Janet, “Sur une suite de fonctions considérée par Hermite et son application à un problème du calcul des variations,” C.R.A.S. Paris, 190, 32 (1930).
M. Janet, “Les valeurs moyennes des carrés de deux dérivées dordre consécutifs, et le développement en fraction continue de tan(x),” Bull. Sci. Math., 2, No. 55, 1–13 (1931).
M. Janet, “Sur le minimum du rapport de certaines intégrales,” C.R.A.S. Paris, 193, 977–979 (1931).
M. G. Krein, “Oscillation theorems for ordinary differential operators of arbitrary order,” DAN SSSR, 25, No. 9, 717–720 (1939).
N. G. Kuznetsov and A. I. Nazarov, “Sharp constants in Poincaré, Steklov and related inequalities (a survey),” Mathematika, 61, 328–344 (2015).
A. Ju. Levin and G. D. Stepanov, “One-dimensional boundary value problems with operators that do not lower the number of sign changes. I,” Sib. Mat. Zh., 17, No. 3, 606–626 (1976).
F. Lindemann F., “Über die Zahl π,” Math. Ann., 20, 213–225 (1882).
D. S. Mitrinović and P. M. Vasić, “An integral inequality ascribed to Wirtinger, and its variations and generalizations,” Publ. fac. d’électrotech. l’Univ. Belgrade, Sér. Math. et Phys., No. 272, 157–170 (1969).
A. I. Nazarov and A. N. Petrova, “On exact constants in some embedding theorems of high order,” Vestn. SPbGU, Ser. 1, No. 4, 16–20 (2008).
Yu. P. Petrova, “Spectral asymptotics for problems with integral constraints,” Mat. Zam., 102, No. 3, 405–414 (2017).
A. S. Slastenin, “Exact constants in some one-dimensional embedding theorems,” Master thesis, SPbGU, St. Petersburg (2014)
V. A. Steklov, “The problem of cooling an inhomogeneous solid rod,” Commun. Kharkov Math. Soc., Ser. 2, 5, 136–181 (1896).
W. Stekloff, “Problème de refroidissement d’une barre hétérogène,” Ann. Fac. Sci. Toulouse, Sér. 2, 3, 281–313 (1901).
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Translated from Zapiski Nauchnykh Seminarov POMI, Vol. 459, 2017, pp. 58–65.
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Minarsky, A.M., Nazarov, A.I. On the Spectra of Boundary Value Problems Generated by Some One-Dimensional Embedding Theorems. J Math Sci 236, 413–418 (2019). https://doi.org/10.1007/s10958-018-4121-5
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DOI: https://doi.org/10.1007/s10958-018-4121-5