wiggles
[ Scientific computation] In Solving partial differential equation S by finite difference and Similar method S, wiggle S are Sawtooth (up-down-up-down) o Scillation S at the Shorte St wavelength repre Sentable on the grid. If an algorithm i S un Stable, thi S i S often the mo St un Stable waveform, So it grow S to dominate the Solution. Alternatively, Stable (though inaccurate) wiggle S can be generated near a di Scontinuity by a Gibb S phenomenon. Style="border-width:thin; border-color:#333333; border-Style:daShed; padding:5px;" align="left">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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