First Page | Document Content | |
---|---|---|
Date: 2015-07-20 20:08:36Mathematical analysis Mathematics Analysis Probability distributions Normal distribution Big O notation Limit of a function Exponentiation Central limit theorem Chebyshev function Heat equation | JMLR: Workshop and Conference Proceedings vol 40:1–18, 2015 Learning the dependence structure of rare events: a non-asymptotic study Nicolas Goix Anne SabourinAdd to Reading ListSource URL: jmlr.orgDownload Document from Source WebsiteFile Size: 301,98 KBShare Document on Facebook |
Absolute and essential spectra The linear heat equation ut = uxx + 2ux + au with transport provides a nice illustration of the various concepts involved in predicting absolute and convective instabilities. Consider thisDocID: 1upA4 - View Document | |
MIMS Technical Report No) Heat convection equation with nonhomogeneous boundary condition Hiroko MORIMOTO Abstract.DocID: 1rJd5 - View Document | |
RESEARCH ON ORDINARY DIFFERENTIAL EQUATION AND FRACTIONAL DIFFERENTIAL EQUATION QU HAIDONG and LIU XUAN Department of Mathematics and StatisticsDocID: 1rstj - View Document | |
235 Documenta Math. Laplace Transform Representations and Paley–Wiener TheoremsDocID: 1rqC6 - View Document | |
U:MDLPDE•5-ISSUESLPDE-40(5)LPDE992533FORONLINE.DVIDocID: 1roJ3 - View Document |