/dports/science/apbs/apbs-pdb2pqr-apbs-1.5-102-g500c1473/apbs/externals/pb_s_am/pb_shared/unittest/ |
H A D | ReExpCalcUnitTest.h | 313 ReExpCoeffs ReExpTest( nvals, testPt, shMat, besselK, in TEST_F() 340 ReExpCoeffs ReExpTest( nvals, testPt, shMat, besselK, in TEST_F() 371 ReExpCoeffs ReExpTest( nvals, testPt, shMat, besselK, in TEST_F() 402 ReExpCoeffs ReExpTest( nvals, testPt, shMat, besselK, in TEST_F() 433 ReExpCoeffs ReExpTest( nvals, testPt, shMat, besselK, in TEST_F() 465 ReExpCoeffs ReExpTest( nvals, testPt, shMat, besselK, in TEST_F() 495 ReExpCoeffs ReExpTest( nvals, testPt, shMat, besselK, in TEST_F() 525 ReExpCoeffs ReExpTest( nvals, testPt, shMat, besselK, in TEST_F() 554 ReExpCoeffs ReExpTest( nvals, testPt, shMat, besselK, in TEST_F() 585 ReExpCoeffs ReExpTest( nvals, testPt, shMat, besselK, in TEST_F() [all …]
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H A D | ReExpCalcTest.h | 35 vector<double> besselK = bCal.calc_mbfK(2*nvals, kap*testPt.r()); in runReExTest() local 37 ReExpCoeffs ReExpTest( nvals, testPt, shMat, besselK, in runReExTest()
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/dports/math/fricas/fricas-1.3.7/src/input/ |
H A D | bugs2007.input | 6 testcase "derivative of besselK (issue 355)" 7 testEquals("D(besselK(a,x),x)", "-1/2*(besselK(a+1,x)+besselK(a-1,x))") 8 testEquals("integrate(D(besselK(a,x),a),a)", "besselK(a,x)") 9 -- limit(D(besselK(a,x),a),a=1/2)
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/dports/math/R/R-4.1.2/src/library/base/R/ |
H A D | Bessel.R | 24 besselK <- function(x, nu, expon.scaled = FALSE) function 26 .Internal(besselK(x,nu, 1 + as.logical(expon.scaled)))
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/dports/math/libRmath/R-4.1.1/src/library/base/R/ |
H A D | Bessel.R | 24 besselK <- function(x, nu, expon.scaled = FALSE) function 26 .Internal(besselK(x,nu, 1 + as.logical(expon.scaled)))
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/dports/audio/praat/praat-6.2.03/melder/ |
H A D | NUMspecfunc.cpp | 196 double besselK = undefined; in NUMbesselK_f() local 208 besselK = besselK_min2 + twoByX * i * besselK_min1; in NUMbesselK_f() 210 besselK_min1 = besselK; in NUMbesselK_f() 212 Melder_assert (isdefined (besselK)); in NUMbesselK_f() 213 return besselK; in NUMbesselK_f()
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/dports/finance/R-cran-fBasics/fBasics/R/ |
H A D | dist-sgh.R | 147 besselK(x, lambda+1, expon.scaled = TRUE) / 148 besselK(x, lambda, expon.scaled = TRUE) ) / x
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H A D | dist-gh.R | 54 log(besselK(arg, lambda, expon.scaled = TRUE)) - arg ) 59 k = log(besselK(arg, lambda-0.5, expon.scaled = TRUE)) - arg
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H A D | dist-nig.R | 34 log.K1 <- log(besselK(alpha * Sqrt, 1, expon.scaled = TRUE)) - alpha*Sqrt
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H A D | dist-ghMoments.R | 229 ratio = besselK(x, lambda)/x^lambda
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H A D | builtin-hypHyperbolicDist.R | 259 bK1 = besselK(delta*sqr, nu = 1)
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/dports/math/R/R-4.1.2/src/library/base/man/ |
H A D | Bessel.Rd | 12 \alias{besselK} 16 besselK(x, nu, expon.scaled = FALSE) 50 \code{besselK} which is symmetric in \code{nu}. 67 \item{besselK}{based on (code) by J. B. Campbell (1980)\dots Modifications\dots} 177 lines(x0, besselK(x0, nu = nu), col = nu + 2, lty= 1+ (nu\%\%1 > 0)) 184 for(nu in nus) lines(x, besselK(x, nu = nu), col = nu + 2)
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/dports/math/libRmath/R-4.1.1/src/library/base/man/ |
H A D | Bessel.Rd | 12 \alias{besselK} 16 besselK(x, nu, expon.scaled = FALSE) 50 \code{besselK} which is symmetric in \code{nu}. 67 \item{besselK}{based on (code) by J. B. Campbell (1980)\dots Modifications\dots} 177 lines(x0, besselK(x0, nu = nu), col = nu + 2, lty= 1+ (nu\%\%1 > 0)) 184 for(nu in nus) lines(x, besselK(x, nu = nu), col = nu + 2)
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/dports/audio/praat/praat-6.2.03/dwtest/ |
H A D | test_gsl.praat | 114 appendInfoLine: tab$, "besselK:" 115 @func_2args: "besselK", 4, 0.1, 479600.2497925682849, tol_2 116 @func_2args: "besselK", 5, 2.0, 9.431049100596467443, tol0 117 @func_2args: "besselK", 100, 100.0, 7.617129630494085416e-25, tol2
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/dports/math/xlife++/xlifepp-sources-v2.0.1-2018-05-09/src/mathsResources/specialFunctions/ |
H A D | specialFunctions.hpp | 120 real_t besselK(const real_t x, const number_t N); //!< Bessel functions of the second kind and … 121 complex_t besselK(const complex_t z, const real_t N); //!< Bessel functions of the second kind and …
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/dports/math/fricas/fricas-1.3.7/src/algebra/ |
H A D | special.spad | 98 besselK : (R, R) -> R 99 ++ besselK(v, x) is the modified Bessel function of the second kind, 106 besselK : (C, C) -> C 107 ++ besselK(v, x) is the modified Bessel function of the second kind, 186 besselK(n, x) == 192 besselK(v, z) ==
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H A D | trigcat.spad | 262 besselK : (%, %) -> % 263 ++ besselK(v, z) is the modified Bessel function of the second kind. 332 ++ imag(exp(-v*%pi*%i/2)*besselK(v, exp(%pi*%i/4)*z))} 337 ++ real(exp(-v*%pi*%i/2)*besselK(v, exp(%pi*%i/4)*z))}
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H A D | combfunc.spad | 489 besselK : (F, F) -> F 490 ++ besselK(x, y) returns the besselk function applied to x and y 557 ++ imag(exp(-v*%pi*%i/2)*besselK(v, exp(%pi*%i/4)*z))} 562 ++ real(exp(-v*%pi*%i/2)*besselK(v, exp(%pi*%i/4)*z))} 709 opBesselK := operator('besselK)$CommonOperators 742 besselK(a, x) == opBesselK(a, x) 1705 is?(op, 'besselK) => opBesselK 1920 besselK(r::R, s::R)::F 2012 - differentiate(x, t)* ahalf * (besselK (n-1, x) + besselK (n+1, x))
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/dports/math/fricas/fricas-1.3.7/pre-generated/src/algebra/ |
H A D | SPFCAT.lsp | 21 ((|besselK| ($ $ $)) T) ((|airyAi| ($ $)) T)
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H A D | DFSFUN.lsp | 395 144 |besselY| 154 |besselK| 166 |besselJ| 178 |besselI| 190 466 '((|besselK| 470 '((|besselK|
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/dports/math/R-cran-coda/coda/R/ |
H A D | heidel.R | 182 y[k+1,] <- ifelse(u > -log.eps, 0, z * exp(-u) * besselK(x = u, nu=1/4))
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/dports/science/apbs/apbs-pdb2pqr-apbs-1.5-102-g500c1473/apbs/externals/pb_s_am/pb_shared/src/ |
H A D | ReExpCalc.cpp | 105 vector<double> besselK, in ReExpCoeffs() argument 112 besselK_(besselK), in ReExpCoeffs()
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/dports/math/reduce/Reduce-svn5758-src/packages/specfn/ |
H A D | specfn.red | 133 %algebraic operator besselJ,besselY,besselI,besselK,hankel1,hankel2;
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/dports/science/apbs/apbs-pdb2pqr-apbs-1.5-102-g500c1473/apbs/externals/pb_s_am/pbsam/src/ |
H A D | TMatrix.cpp | 78 vector<double> besselK = _besselcalc->calc_mbfK(2*p_,kapVal[1]*v.r()); in update_vals() local 84 besselK, _reexpconsts, in update_vals()
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/dports/math/R-cran-gsl/gsl/man/ |
H A D | Bessel.Rd | 140 besselK(0.55,4) - bessel_Knu(4,0.55) # should be small
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