Searched refs:order_close (Results 1 – 10 of 10) sorted by last modified time
/dports/net-mgmt/tcpreplay/tcpreplay-4.3.4/src/fragroute/ |
H A D | mod_order.c | 26 order_close(void *d) in order_close() function 55 return (order_close(data)); in order_open() 78 order_close /* close */
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/dports/math/lidia/lidia-2.3.0+latte-patches-2014-10-04/doc/ |
H A D | quadratic_ideal.tex | 476 \begin{fcode}{void}{$A$.order_close}{quadratic_number_power_product & $\alpha$, xbigfloat & $a$, 490 \code{order_close} and \code{local_close} to determine $B$. If $A$ is not a real quadratic
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H A D | quadratic_number_power_product.tex | 453 \TRUE. It uses the \code{order_close} function of \SEE{quadratic_ideal} to do this test.
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/dports/math/lidia/lidia-2.3.0+latte-patches-2014-10-04/src/number_fields/quadratic_order/ |
H A D | quadratic_ideal_appl2.cc | 514 J.order_close(a_pp, l, t, k); in main()
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H A D | quadratic_order1.cc | 4779 J.order_close(beta, b, l, k+1); in could_be_regulator_multiple()
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H A D | quadratic_ideal_appl3.cc | 344 J.order_close(a_pp, l, t, k); in main()
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H A D | quadratic_ideal.cc | 4147 ::order_close (quadratic_number_power_product & alpha, in order_close() function in LiDIA::quadratic_ideal 4221 J.order_close(beta, b, t, k+2); in close()
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H A D | quadratic_number_power_product.cc | 282 J.order_close(beta, b, m, k+1); in assign() 2754 I.order_close(gamma, c, t, 4); in fundamental_unit()
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/dports/math/lidia/lidia-2.3.0+latte-patches-2014-10-04/src/number_fields/include/LiDIA/ |
H A D | quadratic_ideal.h | 332 void order_close(quadratic_number_power_product & alpha,
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/dports/security/fragroute/fragroute-1.2/ |
H A D | mod_order.c | 26 order_close(void *d) in order_close() function 55 return (order_close(data)); in order_open() 78 order_close /* close */
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