Favini, AngeloZagrebina, SophiyaSviridyuk, Georgy2022-02-142022-02-142018-06-19Favini, A., Zagrebina, S. A., & Sviridyuk, G. A. (2018). Multipoint initial-final value problems for dynamical Sobolev-type equations in the space of noises. <i>Electronic Journal of Differential Equations, 2018</i>(128), pp. 1-10.1072-6691https://hdl.handle.net/10877/15328We prove the existence of a unique solution for a linear stochastic Sobolev-type equation with a relatively p-bounded operator and a multipoint initial-final condition, in the space of ``noises''. We apply the abstract results to specific multipoint initial-final and boundary value problems for the linear Hoff equation which models I-beam bulging under random load.Text10 pages1 file (.pdf)enAttribution 4.0 InternationalDynamical Sobolev-type equationWiener K-processMultipoint initial-final conditionsNelson-Gliklikh derivative;white noiseSpace of noisesStochastic Hoff equationArticleThis work is licensed under a Creative Commons Attribution 4.0 International License.