Some problems of the qualitative Sturm-Liouville theory on a spatial network

An analogue of the Sturm oscillation theory of the distribution of the zeros of eigenfunctions is constructed for the problem (*)on a spatial network (in other terms, is a metric graph, a CW complex, a stratified locally one-dimensional manifold, a branching space, a quantum graph, and so on), where is the family of boundary vertices of . At interior points of the edges of the quasi-derivative has the classical form , and at interior nodes it is assumed that where the summation is taken over the edges incident to the node and, for an edge , stands for the `endpoint' derivative of the restriction of the function to . Despite the branching argument, which is a kind of intermediate type between the one-dimensional and multidimensional cases, the outward form of the results turns out to be quite classical. The classical nature of the operator is clarified, and exact analogues of the maximum principle and of the Sturm theorem on alternation of zeros are established, together with the sign-regular oscillation properties of the spectrum of the problem (*) (including the simplicity and positivity of the points of the spectrum and also the number of zeros and their alternation for the eigenfunctions).

[1]  M. Kreĭn,et al.  The Markov Moment Problem and Extremal Problems , 1977 .

[2]  J. Below A characteristic equation associated to an eigenvalue problem on c2-networks , 1985 .

[3]  Serge Nicaise,et al.  Control of networks of Euler-Bernoulli beams , 1999 .

[4]  Günter Leugering,et al.  Control of planar networks of Timoshenko beams , 1993 .

[5]  Spectral Determinant on Quantum Graphs , 1999, cond-mat/9911183.

[6]  P. Kuchment Graph models for waves in thin structures , 2002 .

[7]  Approche spectrale des problemes de diffusion sur les reseaux , 1987 .

[8]  Serge Nicaise,et al.  Dynamical interface transition in ramified media with diffusion , 1996 .

[9]  Y. V. Pokornyi,et al.  Chebyshev-Haar systems in the theory of discontinuous Kellogg kernels , 1994 .

[10]  Joachim von Below,et al.  Classical solvability of linear parabolic equations on networks , 1988 .

[11]  Jean-Pierre Roth,et al.  Le spectre du Laplacien sur un graphe , 1984 .

[12]  J. Below Sturm-Liouville eigenvalue problems on networks , 1988 .

[13]  Günter Leugering,et al.  Modeling, Analysis and Control of Dynamic Elastic Multi-Link Structures , 1994 .

[14]  E. J. P. Georg Schmidt On the modelling and exact controllability of networks of vibrating strings , 1992 .

[15]  G. Lumer Connecting of local operators and evolution equations on networks , 1980 .

[16]  F. Gantmacher,et al.  Oscillation matrices and kernels and small vibrations of mechanical systems , 1961 .

[17]  Serge Nicaise,et al.  The eigenvalue problem for networks of beams , 2000 .

[18]  F. V. Atkinson,et al.  Discrete and Continuous Boundary Problems , 1964 .

[19]  S. Nicaise Some results on spectral theory over networks, applied to nerve impulse transmission , 1985 .

[20]  Spectre des réseaux de poutres , 1998 .

[21]  Modelling and controllability of plate-beam systems , 1993 .

[22]  B. Pavlov,et al.  Scattering problems on noncompact graphs , 1988 .

[23]  J. C. Mairhuber ON HAAR'S THEOREM CONCERNING CHEBYCHEV APPROXIMATION PROBLEMS HAVING UNIQUE SOLUTIONS' , 1956 .