Requested precision: 1e-07 absolute, 1e-07 relative
1-D integration method: RooIntegrator1D (RooImproperIntegrator1D if open-ended)
2-D integration method: RooAdaptiveIntegratorND (N/A if open-ended)
N-D integration method: RooAdaptiveIntegratorND (N/A if open-ended)
Available integration methods:
*** RooBinIntegrator ***
Capabilities: [1-D] [2-D] [N-D]
Configuration:
1) numBins = 100
*** RooIntegrator1D ***
Capabilities: [1-D]
Configuration:
1) sumRule = Trapezoid(idx = 0)
2) extrapolation = Wynn-Epsilon(idx = 1)
3) maxSteps = 20
4) minSteps = 999
5) fixSteps = 0
*** RooIntegrator2D ***
Capabilities: [2-D]
Configuration:
(Depends on 'RooIntegrator1D')
*** RooSegmentedIntegrator1D ***
Capabilities: [1-D]
Configuration:
1) numSeg = 3
(Depends on 'RooIntegrator1D')
*** RooSegmentedIntegrator2D ***
Capabilities: [2-D]
Configuration:
(Depends on 'RooSegmentedIntegrator1D')
*** RooImproperIntegrator1D ***
Capabilities: [1-D] [OpenEnded]
Configuration:
(Depends on 'RooIntegrator1D')
*** RooMCIntegrator ***
Capabilities: [1-D] [2-D] [N-D]
Configuration:
1) samplingMode = Importance(idx = 0)
2) genType = QuasiRandom(idx = 0)
3) verbose = false(idx = 0)
4) alpha = 1.5
5) nRefineIter = 5
6) nRefinePerDim = 1000
7) nIntPerDim = 5000
*** RooAdaptiveIntegratorND ***
Capabilities: [2-D] [N-D]
Configuration:
1) maxEval2D = 100000
2) maxEval3D = 1e+06
3) maxEvalND = 1e+07
4) maxWarn = 5
*** RooAdaptiveGaussKronrodIntegrator1D ***
Capabilities: [1-D] [OpenEnded]
Configuration:
1) maxSeg = 100
2) method = 21Points(idx = 2)
*** RooGaussKronrodIntegrator1D ***
Capabilities: [1-D] [OpenEnded]
Configuration:
[#3] INFO:Integration -- RooRealIntegral::ctor(landau_Int[x]) Constructing integral of function landau over observables(x) with normalization () with range identifier <none>
[#3] DEBUG:Integration -- landau: Adding observable x as shape dependent
[#3] DEBUG:Integration -- landau: Adding parameter 0 as value dependent
[#3] DEBUG:Integration -- landau: Adding parameter 0.1 as value dependent
[#3] INFO:Integration -- landau: Observable x is suitable for analytical integration (if supported by p.d.f)
[#3] INFO:Integration -- landau: Observables (x) are numerically integrated
[#1] INFO:NumericIntegration -- RooRealIntegral::init(landau_Int[x]) using numeric integrator RooIntegrator1D to calculate Int(x)
[1] int_dx landau(x) = 0.0989653362054419
[#3] INFO:Integration -- RooRealIntegral::ctor(landau_Int[x]) Constructing integral of function landau over observables(x) with normalization () with range identifier <none>
[#3] DEBUG:Integration -- landau: Adding observable x as shape dependent
[#3] DEBUG:Integration -- landau: Adding parameter 0 as value dependent
[#3] DEBUG:Integration -- landau: Adding parameter 0.1 as value dependent
[#3] INFO:Integration -- landau: Observable x is suitable for analytical integration (if supported by p.d.f)
[#3] INFO:Integration -- landau: Observables (x) are numerically integrated
[#1] INFO:NumericIntegration -- RooRealIntegral::init(landau_Int[x]) using numeric integrator RooAdaptiveGaussKronrodIntegrator1D to calculate Int(x)
[2] int_dx landau(x) = 0.098957102921895
[#3] INFO:Integration -- RooRealIntegral::ctor(landau_Int[x]) Constructing integral of function landau over observables(x) with normalization () with range identifier <none>
[#3] DEBUG:Integration -- landau: Adding observable x as shape dependent
[#3] DEBUG:Integration -- landau: Adding parameter 0 as value dependent
[#3] DEBUG:Integration -- landau: Adding parameter 0.1 as value dependent
[#3] INFO:Integration -- landau: Observable x is suitable for analytical integration (if supported by p.d.f)
[#3] INFO:Integration -- landau: Observables (x) are numerically integrated
[#1] INFO:NumericIntegration -- RooRealIntegral::init(landau_Int[x]) using numeric integrator RooAdaptiveGaussKronrodIntegrator1D to calculate Int(x)
[3] int_dx landau(x) = 0.098957102921895
--- RooAbsArg ---
Value State: clean
Shape State: clean
Attributes: [SnapShot_ExtRefClone]
Address: 0x5977d90
Clients:
Servers:
Proxies:
--- RooAbsCategory ---
Value = 1 "15Points)
Possible states:
15Points 1
21Points 2
31Points 3
41Points 4
51Points 5
61Points 6
WynnEpsilon 0