An Extension of Timoshenko's Method and its Application to Buckling and Vibration Problems

## Abstract We prove the unitary equivalence of the inverse of the Krein–von Neumann extension (on the orthogonal complement of its kernel) of a densely defined, closed, strictly positive operator, __S__ ≥ __εI~H~__ for some __ε__ > 0 in a Hilbert space __H__ to an abstract buckling problem operato

To give a first idea of our method consider a (quasiperiodic) function of one variable such that in its Fourier For efficiently treating quasi-periodic and multiscale problems numerically, it is here proposed to change the number of space representation the only wavenumbers present are of the dimens

Consider a triangular array \(X_{1}^{n}, \ldots, X_{n}^{n}, n \in \mathbb{N}\), of rowwise independent random clements with values in a measurable space. Suppose there exists \(\theta \in[0,1)\) such that \(X_{1}^{n}, \ldots, X_{\left.\left[n^{n}\right\}\right]}^{n}\) have distribution \(v_{1}\) and