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        <topic href="lle\functn_herfs.html#functn_herfs" title="Hermitian matrix"/>
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        <topic href="sla\functn_pporfs.html#functn_pporfs" title="Hermitian positive-definite matrix"/>
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    <entry keyword="symmetric positive-definite matrix">
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        <topic href="lle\functn_pprfs.html#functn_pprfs" title="packed storage"/>
        <topic href="sla\functn_pporfs.html#functn_pporfs" title="symmetric positive-definite matrix"/>
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    <entry keyword="Exp">
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    <entry keyword="Cholesky">
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        <topic href="lau\functn_potf2.html#functn_potf2" title="LAPACK"/>
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        <topic href="lle\functn_hpsvx.html#functn_hpsvx" title="Hermitian matrix"/>
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        <topic href="lle\functn_spsvx.html#functn_spsvx" title="packed"/>
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    <entry keyword="LU">
        <topic href="sla\sla_mfroutines.html#sla_mfroutines" title="ScaLAPACK"/>
        <topic href="lle\lle_MFRoutines.html#lle_MFRoutines" title="LU"/>
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    <entry keyword="orthogonal">
        <topic href="sla\sla_ofactor.html#sla_ofactor" title="orthogonal"/>
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    <entry keyword="partial">
        <topic href="lau\functn_lahef.html#functn_lahef" title="complex Hermitian indefinite matrix"/>
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        <topic href="lle\lle_MFRoutines.html#lle_MFRoutines" title="triangular factorization"/>
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        <topic href="sla\sla_mfroutines.html#sla_mfroutines" title="triangular factorization[factorization"/>
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    <entry keyword="upper trapezoidal matrix">
        <topic href="lau\functn_latrz.html#functn_latrz" title="upper trapezoidal matrix"/>
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    <entry keyword="fast Fourier transform">
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        <topic
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    <entry keyword="fast Fourier Transform">
        <topic
            href="fft\functn_ComputeForward.html#functn_ComputeForward" title="fast Fourier Transform"/>
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    <entry keyword="FFT computation">
        <topic href="fft\fft_DFTInterface.html#fft_DFTInterface" title="FFT computation"/>
        <topic href="fft\fft_cdftfi.html#fft_cdftfi" title="cluster FFT"/>
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        <topic
            href="fft\functn_ComputeBackward.html#functn_ComputeBackward" title="FFT functions"/>
        <topic
            href="fft\functn_CreateDescriptorDM.html#functn_CreateDescriptorDM" title="CreateDescriptorDM"/>
        <topic
            href="fft\functn_CreateDescriptor.html#functn_CreateDescriptor" title="CreateDescriptor"/>
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            href="fft\functn_FreeDescriptor.html#functn_FreeDescriptor" title="FreeDescriptor"/>
        <topic
            href="fft\functn_CommitDescriptorDM.html#functn_CommitDescriptorDM" title="CommitDescriptorDM"/>
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    <entry keyword="DFT computation">
        <topic
            href="fft\functn_ComputeBackward.html#functn_ComputeBackward" title="DFT computation"/>
        <topic
            href="fft\functn_ComputeForward.html#functn_ComputeForward" title="ComputeForward"/>
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        <topic
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        <topic href="fft\functn_ErrorClass.html#functn_ErrorClass" title="status checking"/>
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        <topic
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        <topic href="slau\functn_pmax1.html#functn_pmax1" title="index of the element of a vector with the largest absolute value of the real part"/>
        <topic href="bla\functn_iamin.html#functn_iamin" title="finding"/>
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        <topic href="vml\functn_Floor.html#functn_Floor" title="Floor"/>
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    <entry keyword="font conventions">
        <topic
            href="intro\mkl_overview_notation.html#mkl_overview_notation" title="font conventions"/>
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    <entry keyword="Fortran 95 interface conventions">
        <topic href="bla\bla_BLASfortran95.html#bla_BLASfortran95" title="Fortran 95 interface conventions"/>
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    <entry keyword="Fortran95 interface conventions">
        <topic href="lle\lle_fortran95.html#lle_fortran95" title="Fortran95 interface conventions"/>
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    <entry keyword="Fortran95 Interfaces for LAPACK">
        <topic
            href="appendices\mkl_appE_IdenNetlib.html#mkl_appE_IdenNetlib" title="indentical to Netlib"/>
        <topic href="appendices\mkl_appE_abs.html#mkl_appE_abs" title="absent from Netlib"/>
        <topic href="appendices\mkl_appE_newfunc.html#mkl_appE_newfunc" title="Fortran95 Interfaces for LAPACK"/>
        <topic
            href="appendices\mkl_appE_ReplacedAN.html#mkl_appE_ReplacedAN" title="with replaced Netlib argument names"/>
        <topic
            href="appendices\mkl_appE_modnetlibifs.html#mkl_appE_modnetlibifs" title="modified Netlib interfaces"/>
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    <entry keyword="Fortran95 Interfaces for LAPACK Routines: specific MKL features">
        <topic href="appendices\mkl_appE_Intro.html#mkl_appE_Intro" title="Fortran95 Interfaces for LAPACK Routines: specific MKL features"/>
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    <entry keyword="Fortran95 LAPACK interface vs. Netlib">
        <topic href="lle\lle_fortran95netlib.html#lle_fortran95netlib" title="Fortran95 LAPACK interface vs. Netlib"/>
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    <entry keyword="free_Helmholtz_2D">
        <topic
            href="pdes\functn_free_Helmholtz_2D-free_Helmholtz_3D.html#functn_free_Helmholtz_2D-free_Helmholtz_3D" title="free_Helmholtz_2D"/>
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    <entry keyword="free_Helmholtz_3D">
        <topic
            href="pdes\functn_free_Helmholtz_2D-free_Helmholtz_3D.html#functn_free_Helmholtz_2D-free_Helmholtz_3D" title="free_Helmholtz_3D"/>
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            href="pdes\functn_free_sph_p-free_sph_np.html#functn_free_sph_p-free_sph_np" title="free_sph_np"/>
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    <entry keyword="free_sph_p">
        <topic
            href="pdes\functn_free_sph_p-free_sph_np.html#functn_free_sph_p-free_sph_np" title="free_sph_p"/>
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    <entry keyword="free_trig_transform">
        <topic
            href="pdes\functn_free_trig_transform.html#functn_free_trig_transform" title="free_trig_transform"/>
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    <entry keyword="FreeDescriptor">
        <topic
            href="fft\functn_FreeDescriptor.html#functn_FreeDescriptor" title="FreeDescriptor"/>
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    <entry keyword="FreeDescriptorDM">
        <topic
            href="fft\functn_FreeDescriptorDM.html#functn_FreeDescriptorDM" title="FreeDescriptorDM"/>
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    <entry keyword="Frobenius norm">
        <topic
            href="slau\functn_plansy_planhe.html#functn_plansy_planhe" title="complex Hermitian matrix"/>
        <topic href="slau\functn_plange.html#functn_plange" title="Frobenius norm"/>
        <topic href="lau\functn_lanhp.html#functn_lanhp" title="packed storage"/>
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    <entry keyword="complex Hermitian tridiagonal matrix">
        <topic href="lau\functn_lanst-lanht.html#functn_lanst-lanht" title="complex Hermitian tridiagonal matrix"/>
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    <entry keyword="complex symmetric matrix">
        <topic href="lau\functn_lansy.html#functn_lansy" title="complex symmetric matrix"/>
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    <entry keyword="general rectangular matrix">
        <topic href="slau\functn_plange.html#functn_plange" title="general rectangular matrix"/>
    </entry>
    <entry keyword="general tridiagonal matrix">
        <topic href="lau\functn_langt.html#functn_langt" title="general tridiagonal matrix"/>
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    <entry keyword="Hermitian band matrix">
        <topic href="lau\functn_lanhb.html#functn_lanhb" title="Hermitian band matrix"/>
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    <entry keyword="real symmetric matrix">
        <topic
            href="slau\functn_plansy_planhe.html#functn_plansy_planhe" title="real symmetric matrix"/>
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    <entry keyword="real symmetric tridiagonal matrix">
        <topic href="lau\functn_lanst-lanht.html#functn_lanst-lanht" title="real symmetric tridiagonal matrix"/>
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    <entry keyword="symmetric band matrix">
        <topic href="lau\functn_lansb.html#functn_lansb" title="symmetric band matrix"/>
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    <entry keyword="symmetric matrix">
        <topic href="lau\functn_lansp.html#functn_lansp" title="symmetric matrix"/>
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    <entry keyword="trapezoidal matrix">
        <topic href="lau\functn_lantr.html#functn_lantr" title="trapezoidal matrix"/>
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    <entry keyword="triangular band matrix">
        <topic href="lau\functn_lantb.html#functn_lantb" title="triangular band matrix"/>
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    <entry keyword="triangular matrix">
        <topic href="lau\functn_lantr.html#functn_lantr" title="triangular matrix"/>
        <topic href="lau\functn_lantp.html#functn_lantp" title="packed storage"/>
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    <entry keyword="upper Hessenberg matrix">
        <topic href="slau\functn_planhs.html#functn_planhs" title="upper Hessenberg matrix"/>
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    <entry keyword="full storage scheme">
        <topic href="appendices\mkl_appB_MA.html#mkl_appB_MA" title="full storage scheme"/>
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    <entry keyword="full-storage vectors">
        <topic href="bla\bla_SBLASvector.html#bla_SBLASvector" title="full-storage vectors"/>
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    <entry keyword="function name conventions, in VML">
        <topic href="vml\vml_FunctionNaming.html#vml_FunctionNaming" title="function name conventions, in VML"/>
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        <topic href="sf\functn_Gamma.html#functn_Gamma" title="Gamma"/>
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        <topic href="bla\functn_gthrz.html#functn_gthrz" title="gathering sparse vector&amp;apos;s elements into compressed form"/>
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    <entry keyword="Gaussian">
        <topic href="sf\functn_Gaussian.html#functn_Gaussian" title="Gaussian"/>
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        <topic href="sf\functn_GaussianMV.html#functn_GaussianMV" title="GaussianMV"/>
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        <topic href="ils\functn_gemip.html#functn_gemip" title="Gauss method, for interval systems"/>
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        <topic href="ils\functn_gemip.html#functn_gemip" title="Gauss-Seidel iteration, for interval systems"/>
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    <entry keyword="gbbrd">
        <topic href="lse\functn_gbbrd.html#functn_gbbrd" title="gbbrd"/>
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    <entry keyword="gbcon">
        <topic href="lle\functn_gbcon.html#functn_gbcon" title="gbcon"/>
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    <entry keyword="gbequ">
        <topic href="lle\functn_gbequ.html#functn_gbequ" title="gbequ"/>
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    <entry keyword="gbmv">
        <topic href="bla\functn_gbmv.html#functn_gbmv" title="gbmv"/>
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    <entry keyword="gbrfs">
        <topic href="lle\functn_gbrfs.html#functn_gbrfs" title="gbrfs"/>
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    <entry keyword="gbsv">
        <topic href="lle\functn_gbsv.html#functn_gbsv" title="gbsv"/>
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    <entry keyword="gbsvx">
        <topic href="lle\functn_gbsvx.html#functn_gbsvx" title="gbsvx"/>
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    <entry keyword="gbtrf">
        <topic href="lle\functn_gbtrf.html#functn_gbtrf" title="gbtrf"/>
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    <entry keyword="gbtrs">
        <topic href="lle\functn_gbtrs.html#functn_gbtrs" title="gbtrs"/>
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    <entry keyword="gebak">
        <topic href="lse\functn_gebak.html#functn_gebak" title="gebak"/>
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        <topic href="lse\functn_gebal.html#functn_gebal" title="gebal"/>
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        <topic href="lse\functn_gebrd.html#functn_gebrd" title="gebrd"/>
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    <entry keyword="gees">
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        <topic href="lse\functn_geev.html#functn_geev" title="geev"/>
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    <entry keyword="gelsy">
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    <entry keyword="gemm">
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        <topic href="bla\functn_gemv.html#functn_gemv" title="gemv"/>
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    <entry keyword="generalized Schur factorization">
        <topic href="lau\functn_lar2v.html#functn_lar2v" title="generalized Schur factorization"/>
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        <topic href="slau\functn_pormr2punmr2.html#functn_pormr2punmr2" title="from RQ factorization"/>
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        <topic href="slau\functn_pgehd2.html#functn_pgehd2" title="reduction to upper Hessenberg form"/>
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    <entry keyword="RQ factorization">
        <topic href="lse\functn_gerqf.html#functn_gerqf" title="RQ factorization"/>
        <topic href="sla\functn_pggrqf.html#functn_pggrqf" title="ScaLAPACK"/>
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        <topic href="slau\functn_plange.html#functn_plange" title="Frobenius norm"/>
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    <entry keyword="LQ factorization">
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    <entry keyword="QL factorization">
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    <entry keyword="QR factorization">
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    <entry keyword="RQ factorization">
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    <entry keyword="geqrf">
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    <entry keyword="gerqf">
        <topic href="lse\functn_gerqf.html#functn_gerqf" title="gerqf"/>
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    <entry keyword="geru">
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    <entry keyword="gesdd">
        <topic href="lse\functn_gesdd.html#functn_gesdd" title="gesdd"/>
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    <entry keyword="gesv">
        <topic href="lle\functn_gesv.html#functn_gesv" title="gesv"/>
    </entry>
    <entry keyword="gesvd">
        <topic href="lse\functn_gesvd.html#functn_gesvd" title="gesvd"/>
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    <entry keyword="gesvx">
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    <entry keyword="getrf">
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    <entry keyword="GetValueDM">
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    <entry keyword="GFSR">
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    <entry keyword="gges">
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    <entry keyword="ggesx">
        <topic href="lse\functn_ggesx.html#functn_ggesx" title="ggesx"/>
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    <entry keyword="ggev">
        <topic href="lse\functn_ggev.html#functn_ggev" title="ggev"/>
    </entry>
    <entry keyword="ggevx">
        <topic href="lse\functn_ggevx.html#functn_ggevx" title="ggevx"/>
    </entry>
    <entry keyword="ggglm">
        <topic href="lse\functn_ggglm.html#functn_ggglm" title="ggglm"/>
    </entry>
    <entry keyword="gghrd">
        <topic href="lse\functn_gghrd.html#functn_gghrd" title="gghrd"/>
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    <entry keyword="gglse">
        <topic href="lse\functn_gglse.html#functn_gglse" title="gglse"/>
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        <topic href="lse\functn_ggqrf.html#functn_ggqrf" title="ggqrf"/>
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        <topic href="lse\functn_ggrqf.html#functn_ggrqf" title="ggrqf"/>
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    <entry keyword="ggsvp">
        <topic href="lse\functn_ggsvp.html#functn_ggsvp" title="ggsvp"/>
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    <entry keyword="Givens rotation">
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        <topic href="lle\functn_gtcon.html#functn_gtcon" title="gtcon"/>
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        <topic href="bla\functn_gthr.html#functn_gthr" title="gthr"/>
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    <entry keyword="gthrz">
        <topic href="bla\functn_gthrz.html#functn_gthrz" title="gthrz"/>
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    <entry keyword="gtrfs">
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    <entry keyword="gtsv">
        <topic href="lle\functn_gtsv.html#functn_gtsv" title="gtsv"/>
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    <entry keyword="gtsvx">
        <topic href="lle\functn_gtsvx.html#functn_gtsvx" title="gtsvx"/>
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    <entry keyword="Gumbel">
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    <entry keyword="Hansen-Bliek-Rohn procedure, for interval systems">
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    <entry keyword="hbev">
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    <entry keyword="hbevd">
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    <entry keyword="hbevx">
        <topic href="lse\functn_hbevx.html#functn_hbevx" title="hbevx"/>
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    <entry keyword="hbgst">
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    <entry keyword="hbgv">
        <topic href="lse\functn_hbgv.html#functn_hbgv" title="hbgv"/>
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    <entry keyword="hbgvd">
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    <entry keyword="hbgvx">
        <topic href="lse\functn_hbgvx.html#functn_hbgvx" title="hbgvx"/>
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    <entry keyword="hbmv">
        <topic href="bla\functn_hbmv.html#functn_hbmv" title="hbmv"/>
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    <entry keyword="hbtrd">
        <topic href="lse\functn_hbtrd.html#functn_hbtrd" title="hbtrd"/>
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    <entry keyword="hecon">
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    <entry keyword="heev">
        <topic href="lse\functn_heev.html#functn_heev" title="heev"/>
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    <entry keyword="heevd">
        <topic href="lse\functn_heevd.html#functn_heevd" title="heevd"/>
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    <entry keyword="heevr">
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    <entry keyword="heevx">
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    <entry keyword="hegv">
        <topic href="lse\functn_hegv.html#functn_hegv" title="hegv"/>
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    <entry keyword="hegvd">
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    <entry keyword="hegvx">
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    <entry keyword="Helmholtz problem">
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    <entry keyword="hemm">
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    <entry keyword="her2k">
        <topic href="bla\functn_her2k.html#functn_her2k" title="her2k"/>
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    <entry keyword="herdb">
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        <topic href="lse\functn_sygvx.html#functn_sygvx" title="?sygvx"/>
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        <topic href="lse\functn_geev.html#functn_geev" title="?geev"/>
        <topic href="lse\functn_geevx.html#functn_geevx" title="?geevx"/>
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        <topic href="lse\functn_gesvd.html#functn_gesvd" title="singular value decomposition"/>
        <topic href="lse\functn_gelsd.html#functn_gelsd" title="?gelsd"/>
        <topic href="lse\functn_ggsvd.html#functn_ggsvd" title="?ggsvd"/>
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        <topic href="lle\functn_hesvx.html#functn_hesvx" title="?hesvx"/>
        <topic href="lle\functn_gbsv.html#functn_gbsv" title="?gbsv"/>
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        <topic href="lau\functn_larfg.html#functn_larfg" title="Householder matrix"/>
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    <entry keyword="linear dependence of vectors">
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        <topic href="lse\functn_unmlq.html#functn_unmlq" title="?unmlq"/>
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        <topic href="lse\functn_orglq.html#functn_orglq" title="?orglq"/>
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    <entry keyword="LU factorization">
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        <topic href="lle\functn_gbequ.html#functn_gbequ" title="?gbequ"/>
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        <topic href="lau\functn_laqhb.html#functn_laqhb" title="?laqhb"/>
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        <topic href="lau\functn_largv.html#functn_largv" title="plane rotation vector"/>
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        <topic href="lse\functn_ungql.html#functn_ungql" title="?ungql"/>
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    <entry keyword="sbgvx">
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        <topic href="vml\functn_Cosh.html#functn_Cosh" title="hyperbolic cosine"/>
        <topic href="vml\functn_Sinh.html#functn_Sinh" title="hyperbolic sine"/>
        <topic href="vml\functn_Log10.html#functn_Log10" title="denary logarithm"/>
        <topic href="vml\functn_Floor.html#functn_Floor" title="rounding towards minus infinity"/>
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        <topic href="vml\functn_Mul.html#functn_Mul" title="multiplication"/>
        <topic href="vml\functn_Pow2o3.html#functn_Pow2o3" title="power 2/3"/>
        <topic href="vml\functn_Pow.html#functn_Pow" title="power"/>
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        <topic href="vml\functn_Acos.html#functn_Acos" title="inverse cosine"/>
        <topic href="vml\functn_Modf.html#functn_Modf" title="computing a truncated integer value"/>
        <topic href="vml\functn_Sqrt.html#functn_Sqrt" title="square root"/>
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        <topic href="vml\functn_Ceil.html#functn_Ceil" title="rounding towards plus infinity"/>
        <topic href="vml\functn_Acosh.html#functn_Acosh" title="inverse hyperbolic cosine"/>
        <topic href="vml\functn_ErfInv.html#functn_ErfInv" title="inverse error function value"/>
        <topic href="vml\functn_Cos.html#functn_Cos" title="cosine"/>
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        <topic href="vml\functn_Atan.html#functn_Atan" title="inverse tangent"/>
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        <topic href="vml\functn_Tan.html#functn_Tan" title="tangent"/>
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    <entry keyword="Vector Mathematical Functions">
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    <entry keyword="vector multilication">
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    <entry keyword="vector pack function">
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    <entry keyword="vectors">
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        <topic href="bla\functn_dotu.html#functn_dotu" title="complex vectors"/>
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        <topic href="bla\functn_dot.html#functn_dot" title="real vectors"/>
        <topic href="bla\functn_dotc.html#functn_dotc" title="dot product"/>
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    <entry keyword="element with the largest absolute value">
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    <entry keyword="element with the largest absolute value of real part and its index">
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    <entry keyword="element with the smallest absolute value">
        <topic href="bla\functn_iamin.html#functn_iamin" title="element with the smallest absolute value"/>
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    <entry keyword="Euclidean norm">
        <topic href="bla\functn_nrm2.html#functn_nrm2" title="Euclidean norm"/>
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    <entry keyword="Givens rotation">
        <topic href="bla\functn_rotg.html#functn_rotg" title="Givens rotation"/>
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    <entry keyword="linear combination of vectors">
        <topic href="bla\functn_axpy.html#functn_axpy" title="linear combination of vectors"/>
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    <entry keyword="modified Givens transformation parameters">
        <topic href="bla\functn_rotmg.html#functn_rotmg" title="modified Givens transformation parameters"/>
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    <entry keyword="rotation of points">
        <topic href="bla\functn_d_s_rot.html#functn_d_s_rot" title="rotation of points"/>
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    <entry keyword="rotation of points in the modified plane">
        <topic href="bla\functn_rotm.html#functn_rotm" title="rotation of points in the modified plane"/>
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    <entry keyword="sparse vectors">
        <topic href="bla\bla_SBLASnaming.html#bla_SBLASnaming" title="sparse vectors"/>
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    <entry keyword="sum of vectors">
        <topic href="bla\functn_axpy.html#functn_axpy" title="sum of vectors"/>
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    <entry keyword="swapping">
        <topic href="bla\functn_swap.html#functn_swap" title="swapping"/>
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    <entry keyword="vector-scalar product">
        <topic href="bla\functn_scal.html#functn_scal" title="vector-scalar product"/>
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    <entry keyword="vector-scalar product">
        <topic href="bla\functn_scal.html#functn_scal" title="vector-scalar product"/>
        <topic href="bla\functn_axpyi.html#functn_axpyi" title="sparse vectors"/>
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        <topic href="sf\functn_GaussianMV.html#functn_GaussianMV" title="GaussianMV"/>
        <topic href="sf\functn_Cauchy.html#functn_Cauchy" title="Cauchy"/>
        <topic href="sf\functn_Weibull.html#functn_Weibull" title="Weibull"/>
        <topic href="sf\functn_RegisterBrng.html#functn_RegisterBrng" title="RegisterBrng"/>
        <topic href="sf\functn_LoadStreamF.html#functn_LoadStreamF" title="LoadStreamF"/>
        <topic
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        <topic href="sf\functn_UniformBits.html#functn_UniformBits" title="UniformBits"/>
        <topic
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        <topic href="sf\functn_SaveStreamF.html#functn_SaveStreamF" title="SaveStreamF"/>
        <topic href="sf\functn_Bernoulli.html#functn_Bernoulli" title="Bernoulli"/>
        <topic href="sf\functn_conUniform.html#functn_conUniform" title="Uniform (continuous)"/>
        <topic
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        <topic
            href="sf\functn_dNewAbstractStream.html#functn_dNewAbstractStream" title="dNewAbstractStream"/>
        <topic href="sf\functn_disUniform.html#functn_disUniform" title="Uniform (discrete)"/>
        <topic href="sf\functn_Beta.html#functn_Beta" title="Beta"/>
        <topic href="sf\functn_Gamma.html#functn_Gamma" title="Gamma"/>
        <topic href="sf\functn_DeleteStream.html#functn_DeleteStream" title="DeleteStream"/>
        <topic
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        <topic href="sf\functn_Gaussian.html#functn_Gaussian" title="Gaussian"/>
        <topic href="sf\functn_Gumbel.html#functn_Gumbel" title="vector statistics functions"/>
        <topic href="sf\functn_PoissonV.html#functn_PoissonV" title="PoissonV"/>
        <topic
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        <topic href="sf\functn_Exponential.html#functn_Exponential" title="Exponential"/>
        <topic href="sf\functn_CopyStream.html#functn_CopyStream" title="CopyStream"/>
        <topic href="sf\functn_Geometric.html#functn_Geometric" title="Geometric"/>
        <topic href="sf\functn_Rayleigh.html#functn_Rayleigh" title="Rayleigh"/>
        <topic
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        <topic href="sf\functn_NewStream.html#functn_NewStream" title="NewStream"/>
        <topic href="sf\functn_Lognormal.html#functn_Lognormal" title="Lognormal"/>
        <topic href="sf\functn_NewStreamEx.html#functn_NewStreamEx" title="NewStreamEx"/>
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        <topic
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        <topic href="sf\functn_NegBinomial.html#functn_NegBinomial" title="NegBinomial"/>
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        <topic
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        <topic
            href="sf\functn_CopyStreamState.html#functn_CopyStreamState" title="CopyStreamState"/>
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    <entry keyword="vector unpack function">
        <topic href="vml\functn_Unpack.html#functn_Unpack" title="vector unpack function"/>
    </entry>
    <entry keyword="viRngBernoulli">
        <topic href="sf\functn_Bernoulli.html#functn_Bernoulli" title="viRngBernoulli"/>
    </entry>
    <entry keyword="viRngBinomial">
        <topic href="sf\functn_Binomial.html#functn_Binomial" title="viRngBinomial"/>
    </entry>
    <entry keyword="viRngGeometric">
        <topic href="sf\functn_Geometric.html#functn_Geometric" title="viRngGeometric"/>
    </entry>
    <entry keyword="viRngHypergeometric">
        <topic
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    </entry>
    <entry keyword="viRngNegbinomial">
        <topic href="sf\functn_NegBinomial.html#functn_NegBinomial" title="viRngNegbinomial"/>
    </entry>
    <entry keyword="viRngPoisson">
        <topic href="sf\functn_Poisson.html#functn_Poisson" title="viRngPoisson"/>
    </entry>
    <entry keyword="viRngPoissonv">
        <topic href="sf\functn_PoissonV.html#functn_PoissonV" title="viRngPoissonv"/>
    </entry>
    <entry keyword="viRngUniform">
        <topic href="sf\functn_disUniform.html#functn_disUniform" title="viRngUniform"/>
    </entry>
    <entry keyword="viRngUniformBits">
        <topic href="sf\functn_UniformBits.html#functn_UniformBits" title="viRngUniformBits"/>
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    <entry keyword="vml">
        <topic href="vml\vml_InputParam.html#vml_InputParam" title="Input Parameters"/>
        <topic href="vml\vml_Threading.html#vml_Intro" title="threading"/>
        <topic href="vml\vml_OutputParam.html#vml_OutputParam" title="Output Parameters"/>
        <topic href="vml\vml_FuncsInterface.html#vml_FuncsInterface" title="vml"/>
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    <entry keyword="VML">
        <topic href="vml\vml_Intro.html#vml_Intro" title="VML"/>
    </entry>
    <entry keyword="VML arithmetic functions">
        <topic href="vml\vml_ArithFuncs.html#vml_ArithFuncs" title="VML arithmetic functions"/>
    </entry>
    <entry keyword="vmlClearErrorCallBack">
        <topic
            href="vml\functn_ClearErrorCallBack.html#functn_ClearErrorCallBack" title="vmlClearErrorCallBack"/>
    </entry>
    <entry keyword="vmlClearErrStatus">
        <topic
            href="vml\functn_ClearErrStatus.html#functn_ClearErrStatus" title="vmlClearErrStatus"/>
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    <entry keyword="VML exponential and logarithmic functions">
        <topic href="vml\vml_ExpLogFuncs.html#vml_ExpLogFuncs" title="VML exponential and logarithmic functions"/>
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    <entry keyword="VML functions">
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        <topic href="vml\functn_Log1p.html#functn_Log1p" title="Log1p"/>
        <topic href="vml\functn_Asin.html#functn_Asin" title="Asin"/>
        <topic href="vml\functn_Sub.html#functn_Sub" title="Sub"/>
        <topic href="vml\functn_Tan.html#functn_Tan" title="Tan"/>
        <topic href="vml\functn_ErfInv.html#functn_ErfInv" title="ErfInv"/>
        <topic href="vml\functn_MulByConj.html#functn_MulByConj" title="MulByConj"/>
        <topic href="vml\functn_Round.html#functn_Round" title="Round"/>
        <topic href="vml\functn_Inv.html#functn_Inv" title="Inv"/>
        <topic href="vml\functn_Floor.html#functn_Floor" title="Floor"/>
        <topic href="vml\functn_Powx.html#functn_Powx" title="Powx"/>
        <topic href="vml\functn_Log10.html#functn_Log10" title="Log10"/>
        <topic href="vml\functn_SinCos.html#functn_SinCos" title="SinCos"/>
        <topic href="vml\functn_Pow2o3.html#functn_Pow2o3" title="Pow2o3"/>
        <topic href="vml\functn_Atan2.html#functn_Atan2" title="Atan2"/>
        <topic href="vml\functn_Trunc.html#functn_Trunc" title="Trunc"/>
        <topic href="vml\functn_InvCbrt.html#functn_InvCbrt" title="InvCbrt"/>
        <topic href="vml\functn_Cbrt.html#functn_Cbrt" title="Cbrt"/>
        <topic href="vml\functn_Atan.html#functn_Atan" title="Atan"/>
        <topic href="vml\functn_Rint.html#functn_Rint" title="Rint"/>
        <topic href="vml\functn_Acosh.html#functn_Acosh" title="Acosh"/>
        <topic href="vml\functn_Div.html#functn_Div" title="Div"/>
        <topic href="vml\functn_Conj.html#functn_Conj" title="Conj"/>
        <topic href="vml\functn_Sinh.html#functn_Sinh" title="Sinh"/>
        <topic href="vml\functn_Expm1.html#functn_Expm1" title="Expm1"/>
        <topic href="vml\functn_Sqrt.html#functn_Sqrt" title="Sqrt"/>
        <topic href="vml\functn_Cosh.html#functn_Cosh" title="Cosh"/>
        <topic href="vml\functn_Mul.html#functn_Mul" title="Mul"/>
        <topic href="vml\functn_Modf.html#functn_Modf" title="Modf"/>
        <topic href="vml\functn_Ceil.html#functn_Ceil" title="Ceil"/>
        <topic href="vml\functn_Erf.html#functn_Erf" title="Erf"/>
        <topic href="vml\functn_Sqr.html#functn_Sqr" title="Sqr"/>
        <topic href="vml\functn_Pow3o2.html#functn_Pow3o2" title="Pow3o2"/>
        <topic href="vml\functn_Ln.html#functn_Ln" title="Ln"/>
        <topic href="vml\functn_Atanh.html#functn_Atanh" title="Atanh"/>
        <topic href="vml\functn_Asinh.html#functn_Asinh" title="Asinh"/>
        <topic href="vml\functn_Tanh.html#functn_Tanh" title="Tanh"/>
        <topic href="vml\functn_Sin.html#functn_Sin" title="Sin"/>
        <topic href="vml\functn_NearbyInt.html#functn_Nearbyint" title="VML functions"/>
        <topic href="vml\functn_Add.html#functn_Add" title="Add"/>
        <topic href="vml\functn_Erfc.html#functn_Erfc" title="Erfc"/>
        <topic href="vml\functn_Exp.html#functn_Exp" title="Exp"/>
        <topic href="vml\functn_Abs.html#functn_Abs" title="Abs"/>
        <topic href="vml\functn_CIS.html#functn_CIS" title="CIS"/>
        <topic href="vml\functn_Hypot.html#functn_Hypot" title="Hypot"/>
        <topic href="vml\functn_Cos.html#functn_Cos" title="Cos"/>
        <topic href="vml\functn_Acos.html#functn_Acos" title="Acos"/>
        <topic href="vml\functn_InvSqrt.html#functn_InvSqrt" title="InvSqrt"/>
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    <entry keyword="pack/unpack functions">
        <topic href="vml\functn_Unpack.html#functn_Unpack" title="pack/unpack functions"/>
        <topic href="vml\functn_Pack.html#functn_Pack" title="Pack"/>
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    <entry keyword="service functions">
        <topic
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        <topic
            href="vml\functn_SetErrorCallBack.html#functn_SetErrorCallBack" title="SetErrorCallBack"/>
        <topic href="vml\functn_GetMode.html#functn_GetMode" title="GetMode"/>
        <topic href="vml\functn_SetErrStatus.html#functn_SetErrStatus" title="service functions"/>
        <topic
            href="vml\functn_GetErrorCallBack.html#functn_GetErrorCallBack" title="GetErrorCallBack"/>
        <topic
            href="vml\functn_ClearErrorCallBack.html#functn_ClearErrorCallBack" title="ClearErrorCallBack"/>
        <topic href="vml\functn_vml_SetMode.html#functn_vml_SetMode" title="SetMode"/>
        <topic href="vml\functn_GetErrStatus.html#functn_GetErrStatus" title="GetErrStatus"/>
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    <entry keyword="vmlGetErrorCallBack">
        <topic
            href="vml\functn_GetErrorCallBack.html#functn_GetErrorCallBack" title="vmlGetErrorCallBack"/>
    </entry>
    <entry keyword="vmlGetErrStatus">
        <topic href="vml\functn_GetErrStatus.html#functn_GetErrStatus" title="vmlGetErrStatus"/>
    </entry>
    <entry keyword="vmlGetMode">
        <topic href="vml\functn_GetMode.html#functn_GetMode" title="vmlGetMode"/>
    </entry>
    <entry keyword="VML hyperbolic functions">
        <topic href="vml\vml_HyperbolicFuncs.html#vml_HyperbolicFuncs" title="VML hyperbolic functions"/>
    </entry>
    <entry keyword="VML mathematical functions">
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        <topic href="vml\vml_TrigonomFuncs.html#vml_TrigonomFuncs" title="trigonometric"/>
        <topic href="vml\vml_ExpLogFuncs.html#vml_ExpLogFuncs" title="VML mathematical functions"/>
        <topic href="vml\vml_HyperbolicFuncs.html#vml_HyperbolicFuncs" title="hyperbolic"/>
        <topic href="vml\vml_SpecialFuncs.html#vml_SpecialFuncs" title="special"/>
        <topic href="vml\vml_PowerRootFuncs.html#vml_PowerRootFuncs" title="power and root"/>
        <topic href="vml\vml_ArithFuncs.html#vml_ArithFuncs" title="arithmetic"/>
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    <entry keyword="VML Mathematical Functions">
        <topic href="vml\vml_MathFuncs.html#vml_MathFuncs" title="VML Mathematical Functions"/>
    </entry>
    <entry keyword="VML Pack/Unpack Functions">
        <topic
            href="vml\vml_VMLPackUnpackFuncs.html#vml_VMLPackUnpackFuncs" title="VML Pack/Unpack Functions"/>
    </entry>
    <entry keyword="VML Pack Functions">
        <topic href="vml\vml_PackFunc.html#vml_PackFunc" title="VML Pack Functions"/>
    </entry>
    <entry keyword="VML power and root functions">
        <topic href="vml\vml_PowerRootFuncs.html#vml_PowerRootFuncs" title="VML power and root functions"/>
    </entry>
    <entry keyword="VML rounding functions">
        <topic href="vml\vml_RoundingFuncs.html#vml_RoundingFuncs" title="VML rounding functions"/>
    </entry>
    <entry keyword="VML Service Functions">
        <topic href="vml\vml_VMLServiceFuncs.html#vml_VMLServiceFuncs" title="VML Service Functions"/>
    </entry>
    <entry keyword="vmlSetErrorCallBack">
        <topic
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    </entry>
    <entry keyword="vmlSetErrStatus">
        <topic href="vml\functn_SetErrStatus.html#functn_SetErrStatus" title="vmlSetErrStatus"/>
    </entry>
    <entry keyword="vmlSetMode">
        <topic href="vml\functn_vml_SetMode.html#functn_vml_SetMode" title="vmlSetMode"/>
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    <entry keyword="VML special functions">
        <topic href="vml\vml_SpecialFuncs.html#vml_SpecialFuncs" title="VML special functions"/>
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    <entry keyword="VML trigonometric functions">
        <topic href="vml\vml_TrigonomFuncs.html#vml_TrigonomFuncs" title="VML trigonometric functions"/>
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    <entry keyword="vsAbs">
        <topic href="vml\functn_Abs.html#functn_Abs" title="vsAbs"/>
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    <entry keyword="vsAcos">
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    <entry keyword="vsAcosh">
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    <entry keyword="vsAdd">
        <topic href="vml\functn_Add.html#functn_Add" title="vsAdd"/>
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    <entry keyword="vsAsin">
        <topic href="vml\functn_Asin.html#functn_Asin" title="vsAsin"/>
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    <entry keyword="vsAsinh">
        <topic href="vml\functn_Asinh.html#functn_Asinh" title="vsAsinh"/>
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    <entry keyword="vsAtan">
        <topic href="vml\functn_Atan.html#functn_Atan" title="vsAtan"/>
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    <entry keyword="vsAtan2">
        <topic href="vml\functn_Atan2.html#functn_Atan2" title="vsAtan2"/>
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    <entry keyword="vsAtanh">
        <topic href="vml\functn_Atanh.html#functn_Atanh" title="vsAtanh"/>
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    <entry keyword="vsCbrt">
        <topic href="vml\functn_Cbrt.html#functn_Cbrt" title="vsCbrt"/>
    </entry>
    <entry keyword="vsCeil">
        <topic href="vml\functn_Ceil.html#functn_Ceil" title="vsCeil"/>
    </entry>
    <entry keyword="vsCos">
        <topic href="vml\functn_Cos.html#functn_Cos" title="vsCos"/>
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    <entry keyword="vsCosh">
        <topic href="vml\functn_Cosh.html#functn_Cosh" title="vsCosh"/>
    </entry>
    <entry keyword="vsDiv">
        <topic href="vml\functn_Div.html#functn_Div" title="vsDiv"/>
    </entry>
    <entry keyword="vsExp">
        <topic href="vml\functn_Exp.html#functn_Exp" title="vsExp"/>
    </entry>
    <entry keyword="vsExpm1">
        <topic href="vml\functn_Expm1.html#functn_Expm1" title="vsExpm1"/>
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    <entry keyword="vsFloor">
        <topic href="vml\functn_Floor.html#functn_Floor" title="vsFloor"/>
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    <entry keyword="vsHypot">
        <topic href="vml\functn_Hypot.html#functn_Hypot" title="vsHypot"/>
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    <entry keyword="vsInv">
        <topic href="vml\functn_Inv.html#functn_Inv" title="vsInv"/>
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    <entry keyword="vsInvCbrt">
        <topic href="vml\functn_InvCbrt.html#functn_InvCbrt" title="vsInvCbrt"/>
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    <entry keyword="vsInvSqrt">
        <topic href="vml\functn_InvSqrt.html#functn_InvSqrt" title="vsInvSqrt"/>
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    <entry keyword="vslConvCopyTask">
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