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Location: AENC/switchchain/triangle_exponent_plots.m - annotation
ea18a7bd1a0d
4.1 KiB
application/vnd.wolfram.mathematica.package
Plot log version of exponential fit for mixing time
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Needs["ErrorBarPlots`"]
(* ::Section:: *)
(*Triangle exponent*)
(* ::Text:: *)
(*Expected number of triangles is the following powerlaw*)
(* ::DisplayFormula:: *)
(*#triangles = const\[Cross]n^(T(\[Tau])) where T(\[Tau])=3/2 (3-\[Tau])*)
(* When importing from exponent-only-data file or property-data file *)
(* graphdata_exponent_mix32.m *)
(* graphdata_exponent_highN.m *)
(* graphdata_properties2.m *)
(* graphdata_canonical_properties.m *)
gsraw=Import[NotebookDirectory[]<>"data/graphdata_exponent_mix32.m"];
gsraw=SortBy[gsraw,#[[1,1]]&]; (* Sort by n *)
averagesGrouped=GatherBy[gsraw,{#[[1,2]]&,#[[1,1]]&}];
(* averagesGrouped[[ tau index, n index, run index , {ntau, avgtri} ]] *)
nlabels=Map["n = "<>ToString[#]&,averagesGrouped[[1,All,1,1,1]]];
taulabels=Map["tau = "<>ToString[#]&,averagesGrouped[[All,1,1,1,2]]];
mediansErrorBars=Map[
{{#[[1,1,1]],Median[#[[All,2]]]},
ErrorBar[MedianDeviation[#[[All,2]]]]
}&,averagesGrouped,{2}];
averagesErrorBars=Map[
{{#[[1,1,1]],Mean[#[[All,2]]]},
ErrorBar[StandardDeviation[#[[All,2]]]]
}&,averagesGrouped,{2}];
ErrorListPlot[averagesErrorBars,Joined->True,PlotMarkers->Automatic,PlotRange->All,AxesLabel->{"n","\[LeftAngleBracket]triangles\[RightAngleBracket]"},PlotLegends->taulabels]
ErrorListPlot[mediansErrorBars,Joined->True,PlotMarkers->Automatic,PlotRange->All,AxesLabel->{"n","median triangles"},PlotLegends->taulabels]
ListLogLogPlot[averagesErrorBars[[All,All,1]],Joined->True,PlotMarkers->Automatic,AxesLabel->{"n","\[LeftAngleBracket]triangles\[RightAngleBracket]"},PlotLegends->taulabels]
ListLogLogPlot[mediansErrorBars[[All,All,1]],Joined->True,PlotMarkers->Automatic,AxesLabel->{"n","median triangles"},PlotLegends->taulabels]
(* ::Subsection:: *)
(*Fitting the log-log-plot*)
nRange=5;;-1;
nRange=All;
averagesLoglogdata=Log[averagesErrorBars[[All,nRange,1]]];
mediansLoglogdata=Log[mediansErrorBars[[All,nRange,1]]];
averagesFits=Map[Fit[#,{1,logn},logn]&,averagesLoglogdata];
averagesFitsExtra=Map[LinearModelFit[#,logn,logn]&,averagesLoglogdata];
mediansFits=Map[Fit[#,{1,logn},logn]&,mediansLoglogdata];
mediansFitsExtra=Map[LinearModelFit[#,logn,logn]&,mediansLoglogdata];
averagesFitsExtra[[1]]["ParameterConfidenceIntervalTable"]
averagesFitsExtra[[1]]["BestFitParameters"]
averagesFitsExtra[[1]]["ParameterErrors"]
averagesFitsExtra[[1]]["ParameterConfidenceIntervals"]
plot1a=Show[ListLogLogPlot[averagesErrorBars[[All,All,1]],Joined->False,PlotMarkers->Automatic,AxesLabel->{"n","\[LeftAngleBracket]triangles\[RightAngleBracket]"},PlotLegends->taulabels],Plot[averagesFits,{logn,1,2000}]]
plot1b=Show[ListLogLogPlot[mediansErrorBars[[All,All,1]],Joined->False,PlotMarkers->Automatic,AxesLabel->{"n","median triangles"},PlotLegends->taulabels],Plot[mediansFits,{logn,1,2000}]]
Export[NotebookDirectory[]<>"plots/avgtris_n.pdf",plot1]
(* ::Subsection:: *)
(*Plot of T(\[Tau])*)
tauValues=averagesGrouped[[All,1,1,1,2]];
averagesExponents=Transpose[{tauValues,averagesFits[[All,2,1]]}];
mediansExponents=Transpose[{tauValues,mediansFits[[All,2,1]]}];
Show[ListPlot[{averagesExponents,mediansExponents},Joined->True,PlotMarkers->Automatic,AxesLabel->{"tau","exponent"},PlotRange->{{2,3},{0,1.6}}],Plot[3/2(3-tau),{tau,2,3}]]
(* ::Subsection:: *)
(*T(\[Tau]) including error bars*)
(* For visual, shift the tau values slightly left or right to distinguish the two datasets *)
tauValues=averagesGrouped[[All,1,1,1,2]];
averagesExponentsErrorBars=Map[{{#[[1]],#[[2]]["BestFitParameters"][[2]]},ErrorBar[#[[2]]["ParameterConfidenceIntervals"][[2]]-#[[2]]["BestFitParameters"][[2]]]}&,
Transpose[{tauValues-0.001,averagesFitsExtra}]];
mediansExponentsErrorBars=Map[{{#[[1]],#[[2]]["BestFitParameters"][[2]]},ErrorBar[#[[2]]["ParameterConfidenceIntervals"][[2]]-#[[2]]["BestFitParameters"][[2]]]}&,
Transpose[{tauValues+0.001,mediansFitsExtra}]];
plot2=Show[ErrorListPlot[{averagesExponentsErrorBars,mediansExponentsErrorBars},Joined->True,PlotMarkers->Automatic,Frame->True,FrameLabel->{"tau","triangle exponent"},PlotRange->{{2,3},{0,1.6}},ImageSize->300],Plot[3/2(3-tau),{tau,2,3},PlotStyle->{Dashed}]]
Export[NotebookDirectory[]<>"plots/triangle_exponent.pdf",plot2]
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