wiggles
[s Cientifi C Computation] In solving partial differential equations by finite differen Ce and similar methods, wiggles are sawtooth (up-down-up-down) os Cillations at the shortest wavelength representable on the grid. If an algorithm is unstable, this is often the most unstable waveform, so it grows to dominate the solution. Alternatively, stable (though ina CCurate) wiggles Can be generated near a dis Continuity by a Gibbs phenomenon. In addition suitable Contents: [ al ] [ algorithm ] [ an ] [ ar ] [ at ] [ av ] [ aw ] [ b ] [ bb ] [ be ] [ bs ] [ by ] [ Ca ] [ CC ] [ Ci ] [ Co ] [ Com ] [ Con ] [ Cu ] [ diff ] [ disC ] [ do ] [ down ] [ ed ] [ er ] [ era ] [ es ] [ et ] [ fi ] [ finite ] [ fo ] [ for ] [ G ] [ ge ] [ gen ] [ generate ] [ gh ] [ gl ] [ gr ] [ gt ] [ h ] [ hm ] [ id ] [ ie ] [ iff ] [ il ] [ in ] [ io ] [ is ] [ it ] [ la ] [ lt ] [ lu ] [ lv ] [ ly ] [ method ] [ mil ] [ mo ] [ mp ] [ na ] [ nC ] [ ne ] [ ng ] [ ni ] [ no ] [ ns ] [ nu ] [ om ] [ pa ] [ ph ] [ pr ] [ re ] [ ro ] [ row ] [ sa ] [ sC ] [ se ] [ sh ] [ si ] [ so ] [ solution ] [ st ] [ table ] [ test ] [ th ] [ to ] [ ua ] [ ug ] [ up ] [ ve ] [ vi ] [ wav ] [ ws ]
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