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XLPack 6.1
Excel VBA Numerical Library Reference Manual
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XLPack 6.1
Excel VBA Numerical Library Reference Manual
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Functions | |
| Sub | Qagp (F As LongPtr, A As Double, B As Double, Npts As Long, Points() As Double, Result As Double, Info As Long, Optional AbsErr As Double, Optional Neval As Long, Optional EpsAbs As Double=-1, Optional EpsRel As Double=-1, Optional Limit As Long=-1, Optional Last As Long) |
| Finite interval adaptive quadrature with known singular points (21-point Gauss-Kronrod rule) | |
| Sub | Qagp_r (A As Double, B As Double, Npts As Long, Points() As Double, Result As Double, Info As Long, XX As Double, YY As Double, IRev As Long, Optional AbsErr As Double, Optional Neval As Long, Optional EpsAbs As Double=-1, Optional EpsRel As Double=-1, Optional Limit As Long=-1, Optional Last As Long) |
| Finite interval adaptive quadrature with known singular points (21-point Gauss-Kronrod rule) | |
| Sub | Qawc (F As LongPtr, A As Double, B As Double, C As Double, Result As Double, Info As Long, Optional AbsErr As Double, Optional Neval As Long, Optional EpsAbs As Double=-1, Optional EpsRel As Double=-1, Optional Limit As Long=-1, Optional Last As Long) |
| Finite interval adaptive quadrature for Cauchy principal values (25-point Clenshaw-Curtis and 15-point Gauss-Kronrod rule) | |
| Sub | Qawc_r (A As Double, B As Double, C As Double, Result As Double, Info As Long, XX As Double, YY As Double, IRev As Long, Optional AbsErr As Double, Optional Neval As Long, Optional EpsAbs As Double=-1, Optional EpsRel As Double=-1, Optional Limit As Long=-1, Optional Last As Long) |
| Finite interval adaptive quadrature for Cauchy principal values (25-point Clenshaw-Curtis and 15-point Gauss-Kronrod rule) (reverse communication version) | |
| Sub | Qawo (F As LongPtr, A As Double, B As Double, Omega As Double, Integr As Long, Result As Double, Info As Long, Optional AbsErr As Double, Optional Neval As Long, Optional EpsAbs As Double=-1, Optional EpsRel As Double=-1, Optional Limit As Long=-1, Optional Last As Long, Optional Maxp1 As Long=-1) |
| Finite interval adaptive quadrature for oscillatory functions (25-point Clenshaw-Curtis and 15-point Gauss-Kronrod rule) | |
| Sub | Qawo_r (A As Double, B As Double, Omega As Double, Integr As Long, Result As Double, Info As Long, XX As Double, YY As Double, IRev As Long, Optional AbsErr As Double, Optional Neval As Long, Optional EpsAbs As Double=-1, Optional EpsRel As Double=-1, Optional Limit As Long=-1, Optional Last As Long, Optional Maxp1 As Long=-1) |
| Finite interval adaptive quadrature for oscillatory functions (25-point Clenshaw-Curtis and 15-point Gauss-Kronrod rule) (reverse communication version) | |
| Sub | Qaws (F As LongPtr, A As Double, B As Double, Alpha As Double, Beta As Double, Integr As Long, Result As Double, Info As Long, Optional AbsErr As Double, Optional Neval As Long, Optional EpsAbs As Double=-1, Optional EpsRel As Double=-1, Optional Limit As Long=-1, Optional Last As Long) |
| Finite interval adaptive quadrature for singular functions (25-point Clenshaw-Curtis and 15-point Gauss-Kronrod rule) | |
| Sub | Qaws_r (A As Double, B As Double, Alpha As Double, Beta As Double, Integr As Long, Result As Double, Info As Long, XX As Double, YY As Double, IRev As Long, Optional AbsErr As Double, Optional Neval As Long, Optional EpsAbs As Double=-1, Optional EpsRel As Double=-1, Optional Limit As Long=-1, Optional Last As Long) |
| Finite interval adaptive quadrature for singular functions (25-point Clenshaw-Curtis and 15-point Gauss-Kronrod rule) (reverse communication version) | |
This is the group of H2a2a. One dimensional finite interval quadrature (special integrand) (user-defined integrand function).
1.9.6