SemOpenAlex |

SemOpenAlex

Matches in SemOpenAlex for { <https://semopenalex.org/work/W4283205243> ?p ?o ?g. }

Showing items 1 to 95 of 95 with 100 items per page.

W4283205243 endingPage "103317" @default.
W4283205243 startingPage "103317" @default.
W4283205243 abstract "Stiffness matrices of beams with stochastic distributed parameters modelled by random fields are considered. In stochastic finite element analysis, deterministic shape functions are traditionally employed to derive stiffness matrices using the variational principle. Such matrices are not exact because the deterministic shape functions are not derived from the exact solution of the governing stochastic partial differential equation with the relevant boundary conditions. This paper proposes an analytical method based on Castigliano’s approach for a beam element with general spatially varying parameters. This gives the exact and a simple closed-form expression of the stiffness matrix in terms of certain integrals of the spatially varying function. The expressions are valid for any integrable random fields. It is shown that the exact element stiffness matrix of a stochastically parametered beam can be expressed by three basic random variables. Analytical expressions of the random variables and their associated coefficient matrices are derived for two cases: when the bending rigidity is a random field and when the bending flexibility is a random field. It is theoretically proved that the conventional stochastic element stiffness matrix is a first-order perturbation approximation to the exact expression. A sampling method to obtain the basic random variables using the Karhunen–Loève expansion is proposed. Results from the exact stiffness matrices are compared with the approximate conventional stiffness matrix. Gaussian and uniform random fields with different correlation lengths are used to illustrate the numerical results. The exact closed-form analytical expression of the element stiffness matrix derived here can be used for benchmarking future numerical methods." @default.
W4283205243 created "2022-06-22" @default.
W4283205243 creator A5007121098 @default.
W4283205243 creator A5013989953 @default.
W4283205243 date "2022-07-01" @default.
W4283205243 modified "2023-10-14" @default.
W4283205243 title "The exact element stiffness matrices of stochastically parametered beams" @default.
W4283205243 cites W1938228375 @default.
W4283205243 cites W1950787158 @default.
W4283205243 cites W1963950730 @default.
W4283205243 cites W1967255062 @default.
W4283205243 cites W1981574059 @default.
W4283205243 cites W1982382521 @default.
W4283205243 cites W1993573560 @default.
W4283205243 cites W2010978143 @default.
W4283205243 cites W2012529848 @default.
W4283205243 cites W2013473971 @default.
W4283205243 cites W2029143603 @default.
W4283205243 cites W2039678757 @default.
W4283205243 cites W2041716610 @default.
W4283205243 cites W2045042756 @default.
W4283205243 cites W2052222648 @default.
W4283205243 cites W2076012407 @default.
W4283205243 cites W2080387506 @default.
W4283205243 cites W2093556273 @default.
W4283205243 cites W2097718805 @default.
W4283205243 cites W2101194404 @default.
W4283205243 cites W2101505636 @default.
W4283205243 cites W2111613271 @default.
W4283205243 cites W2152067874 @default.
W4283205243 cites W2159555138 @default.
W4283205243 cites W2166522960 @default.
W4283205243 cites W2736662950 @default.
W4283205243 cites W2797537375 @default.
W4283205243 cites W2898699148 @default.
W4283205243 cites W2914623012 @default.
W4283205243 doi "https://doi.org/10.1016/j.probengmech.2022.103317" @default.
W4283205243 hasPublicationYear "2022" @default.
W4283205243 type Work @default.
W4283205243 citedByCount "2" @default.
W4283205243 countsByYear W42832052432022 @default.
W4283205243 countsByYear W42832052432023 @default.
W4283205243 crossrefType "journal-article" @default.
W4283205243 hasAuthorship W4283205243A5007121098 @default.
W4283205243 hasAuthorship W4283205243A5013989953 @default.
W4283205243 hasBestOaLocation W42832052431 @default.
W4283205243 hasConcept C105795698 @default.
W4283205243 hasConcept C121332964 @default.
W4283205243 hasConcept C122123141 @default.
W4283205243 hasConcept C130402806 @default.
W4283205243 hasConcept C134306372 @default.
W4283205243 hasConcept C135628077 @default.
W4283205243 hasConcept C13929819 @default.
W4283205243 hasConcept C14198674 @default.
W4283205243 hasConcept C2779372316 @default.
W4283205243 hasConcept C28826006 @default.
W4283205243 hasConcept C33923547 @default.
W4283205243 hasConcept C520416788 @default.
W4283205243 hasConcept C6213913 @default.
W4283205243 hasConcept C97355855 @default.
W4283205243 hasConceptScore W4283205243C105795698 @default.
W4283205243 hasConceptScore W4283205243C121332964 @default.
W4283205243 hasConceptScore W4283205243C122123141 @default.
W4283205243 hasConceptScore W4283205243C130402806 @default.
W4283205243 hasConceptScore W4283205243C134306372 @default.
W4283205243 hasConceptScore W4283205243C135628077 @default.
W4283205243 hasConceptScore W4283205243C13929819 @default.
W4283205243 hasConceptScore W4283205243C14198674 @default.
W4283205243 hasConceptScore W4283205243C2779372316 @default.
W4283205243 hasConceptScore W4283205243C28826006 @default.
W4283205243 hasConceptScore W4283205243C33923547 @default.
W4283205243 hasConceptScore W4283205243C520416788 @default.
W4283205243 hasConceptScore W4283205243C6213913 @default.
W4283205243 hasConceptScore W4283205243C97355855 @default.
W4283205243 hasLocation W42832052431 @default.
W4283205243 hasLocation W42832052432 @default.
W4283205243 hasLocation W42832052433 @default.
W4283205243 hasOpenAccess W4283205243 @default.
W4283205243 hasPrimaryLocation W42832052431 @default.
W4283205243 hasRelatedWork W1964560586 @default.
W4283205243 hasRelatedWork W2075967518 @default.
W4283205243 hasRelatedWork W2347959907 @default.
W4283205243 hasRelatedWork W2384697501 @default.
W4283205243 hasRelatedWork W2390321940 @default.
W4283205243 hasRelatedWork W4236623281 @default.
W4283205243 hasRelatedWork W4283205243 @default.
W4283205243 hasRelatedWork W4285592458 @default.
W4283205243 hasRelatedWork W4320729678 @default.
W4283205243 hasRelatedWork W4380082765 @default.
W4283205243 hasVolume "69" @default.
W4283205243 isParatext "false" @default.
W4283205243 isRetracted "false" @default.
W4283205243 workType "article" @default.