{"@context":{"@vocab":"https://cir.nii.ac.jp/schema/1.0/","rdfs":"http://www.w3.org/2000/01/rdf-schema#","dc":"http://purl.org/dc/elements/1.1/","dcterms":"http://purl.org/dc/terms/","foaf":"http://xmlns.com/foaf/0.1/","prism":"http://prismstandard.org/namespaces/basic/2.0/","cinii":"http://ci.nii.ac.jp/ns/1.0/","datacite":"https://schema.datacite.org/meta/kernel-4/","ndl":"http://ndl.go.jp/dcndl/terms/","jpcoar":"https://github.com/JPCOAR/schema/blob/master/2.0/"},"@id":"https://cir.nii.ac.jp/crid/1361699995758860416.json","@type":"Article","productIdentifier":[{"identifier":{"@type":"DOI","@value":"10.1029/wr014i005p00953"}},{"identifier":{"@type":"URI","@value":"https://api.wiley.com/onlinelibrary/tdm/v1/articles/10.1029%2FWR014i005p00953"}},{"identifier":{"@type":"URI","@value":"https://agupubs.onlinelibrary.wiley.com/doi/pdf/10.1029/WR014i005p00953"}}],"dc:title":[{"@value":"Stochastic analysis of spatial variability in subsurface flows: 2. Evaluation and application"}],"description":[{"type":"abstract","notation":[{"@value":"The stochastic differential equation describing one‐dimensional flow in a statistically homogeneous porous medium is solved exactly, and the results are compared with an approximate solution considering small perturbations in the logarithm of the hydraulic conductivity. The results show that the logarithmic approximation is valid when the standard deviation of the natural logarithm of the hydraulic conductivity σf is less than 1; the errors increase rapidly for σf > 1. The effective hydraulic conductivity of statistically homogeneous media with one‐, two‐, and three‐dimensional perturbations is determined to the first order in σf2. The effective conductivity is found to be the harmonic mean for one‐dimensional flow, the geometric mean for two‐dimensional flow, and (1 + σf2/6) times the geometric mean for three‐dimensional flow. The application of stochastic analysis is illustrated through two elementary network design problems that demonstrate the importance of the correlation length of the hydraulic conductivity and the role of measurement error."}]}],"creator":[{"@id":"https://cir.nii.ac.jp/crid/1381699995758860419","@type":"Researcher","foaf:name":[{"@value":"Allan L. Gutjahr"}]},{"@id":"https://cir.nii.ac.jp/crid/1381699995758860417","@type":"Researcher","foaf:name":[{"@value":"Lynn W. Gelhar"}]},{"@id":"https://cir.nii.ac.jp/crid/1381699995758860418","@type":"Researcher","foaf:name":[{"@value":"Adel A. Bakr"}]},{"@id":"https://cir.nii.ac.jp/crid/1381699995758860416","@type":"Researcher","foaf:name":[{"@value":"John R. MacMillan"}]}],"publication":{"publicationIdentifier":[{"@type":"PISSN","@value":"00431397"},{"@type":"EISSN","@value":"19447973"}],"prism:publicationName":[{"@value":"Water Resources Research"}],"dc:publisher":[{"@value":"American Geophysical Union (AGU)"}],"prism:publicationDate":"1978-10","prism:volume":"14","prism:number":"5","prism:startingPage":"953","prism:endingPage":"959"},"reviewed":"false","dc:rights":["http://onlinelibrary.wiley.com/termsAndConditions#vor"],"url":[{"@id":"https://api.wiley.com/onlinelibrary/tdm/v1/articles/10.1029%2FWR014i005p00953"},{"@id":"https://agupubs.onlinelibrary.wiley.com/doi/pdf/10.1029/WR014i005p00953"}],"createdAt":"2008-02-06","modifiedAt":"2023-09-23","relatedProduct":[{"@id":"https://cir.nii.ac.jp/crid/1390001205081028608","@type":"Article","relationType":["isReferencedBy"],"jpcoar:relatedTitle":[{"@language":"en","@value":"Classic & contemporary papers of groundwater science (3) How to evaluate appropriate dispersivity at the field scale"},{"@language":"ja","@value":"地下水学の名著を読む(3)フィールドにおける適切な分散長の評価法とは"},{"@value":"Classic ^|^amp; contemporary papers of groundwater science (3) How to evaluate appropriate dispersivity at the field scale"}]},{"@id":"https://cir.nii.ac.jp/crid/1390001205081331200","@type":"Article","relationType":["isReferencedBy"],"jpcoar:relatedTitle":[{"@language":"ja","@value":"空間分布構造を有する透水係数の統計的推定法"},{"@language":"en","@value":"A Statistical Method for Estimating the Spatial Distributions of Hydraulic Conductivity"},{"@language":"ja-Kana","@value":"クウカン ブンプ コウゾウ オ ユウスル トウスイ ケイスウ ノ トウケイテキ"}]},{"@id":"https://cir.nii.ac.jp/crid/1390282763011502464","@type":"Article","relationType":["isReferencedBy"],"jpcoar:relatedTitle":[{"@language":"en","@value":"PRESSURE FLUCTUATION PROPAGATES IN PHREATIC AQUIFERS"}]}],"dataSourceIdentifier":[{"@type":"CROSSREF","@value":"10.1029/wr014i005p00953"},{"@type":"CROSSREF","@value":"10.5917/jagh.56.67_references_DOI_Fhs1Fsai52CXFPow6hm30yyjCv0"},{"@type":"CROSSREF","@value":"10.5917/jagh1959.28.15_references_DOI_Fhs1Fsai52CXFPow6hm30yyjCv0"},{"@type":"CROSSREF","@value":"10.5687/sss.1996.127_references_DOI_Fhs1Fsai52CXFPow6hm30yyjCv0"}]}