| /dports/print/latex2rtf/latex2rtf-2.3.17/test/tmp/ |
| H A D | l2r_0007.tex | 79 Over 25 & $3/\sqrt{n}$ & $3/d_2\sqrt{n}$ & $\cdots$ & $\cdots$ & * & **
80 & $\cdots$ & $\cdots$ & $\cdots$ & $\cdots$ & $\cdots$ & $\cdots$
81 & $\cdots$ & $\cdots$ & $\cdots$ \\ \hline
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| /dports/science/qwalk/mainline-1.0.1-300-g1b7e381/docs/database/ |
| H A D | ekt.yml | 12 …_n)\phi_j^*(\vec r')\frac{\psi(\vec r_1,\cdots,\vec r',\cdots,\vec r_N)}{\psi(\vec r_1, \cdots, \v…
20 …cdots, \vec r_n', \cdots, \vec r_N)}{\psi^*(\vec r_1, \cdots, \vec r_n, \cdots, \vec r_N)}\frac{H_…
27 …i^*(\vec r_0)\phi_j(\vec r_0)v(\vec r_0, \vec r_n)\rangle_{|\psi(\vec r_1\cdots r_N)|^2} \nonumber…
28 …cdots,\vec r_0,\cdots, \vec r_N)}{\psi^*(\vec r_1,\cdots, \vec r_n, \cdots \vec r_N)}\phi_i^*(\vec…
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| /dports/editors/texmacs/TeXmacs-1.99.4-src/TeXmacs/doc/devel/scheme/edit/ |
| H A D | edit-fundamental.en.tm | 66 …cdots\>|t<rsub|n-1>>>|<cell|>|<cell|\<longrightarrowlim\><rsup|insert<around|(|t,i,u|)>>>|<cell|>|…
113 …cdots\>|<resize|<tree|t<rsub|i>|t<rsub|i,0>|\<cdots\>|t<rsub|i,k-1>>|<plus|1l|1fn>||<minus|1r|1fn>…
156 …cdots\>|u<rsub|i-1>|t|u<rsub|i>|\<cdots\>|u<rsub|n-1>>>>>>>>>|<row|<cell|>>|<row|<cell|<tabular*|<…
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| /dports/editors/texmacs/TeXmacs-1.99.4-src/TeXmacs/doc/devel/format/regular/ |
| H A D | prim-graphics.de.tm | 18 <explain-macro|superpose|content-1|<with|mode|math|\<cdots\>>|content-n>
24 <explain-macro|graphics|gr-content-1|<with|mode|math|\<cdots\>>|gr-content-n>
36 <explain-macro|point|coord-1|<with|mode|math|\<cdots\>>|coord-n>
42 <explain-macro|line|point-1|<with|mode|math|\<cdots\>>|point-n>
48 <explain-macro|cline|point-1|<with|mode|math|\<cdots\>>|point-n>
54 <explain-macro|spline|point-1|<with|mode|math|\<cdots\>>|point-n>
60 <explain-macro|spline*|point-1|<with|mode|math|\<cdots\>>|point-n>
66 <explain-macro|cspline|point-1|<with|mode|math|\<cdots\>>|point-n>
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| H A D | prim-graphics.en.tm | 18 <explain-macro|superpose|content-1|<math|\<cdots\>>|content-n>
24 <explain-macro|graphics|gr-content-1|<math|\<cdots\>>|gr-content-n>
36 <explain-macro|point|coord-1|<math|\<cdots\>>|coord-n>
42 <explain-macro|line|point-1|<math|\<cdots\>>|point-n>
48 <explain-macro|cline|point-1|<math|\<cdots\>>|point-n>
54 <explain-macro|spline|point-1|<math|\<cdots\>>|point-n>
60 <explain-macro|spline*|point-1|<math|\<cdots\>>|point-n>
66 <explain-macro|cspline|point-1|<math|\<cdots\>>|point-n>
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| /dports/math/cadabra2/cadabra2-2.3.6.8/core/algorithms/ |
| H A D | reduce_delta.cnb | 12 …cdots a_n}_{b_1\\cdots b_n}\\, \\delta^{b_1}_{a_1}\n\\cdots \\delta^{b_m}_{a_m} = \n\\Big[\\prod_{…
16 …cdots a_n}_{b_1\\cdots b_n}\\, \\delta^{b_1}_{a_1}\n\\cdots \\delta^{b_m}_{a_m} = \n\\Big[\\prod_{…
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| H A D | projweyl.tex | 7 \Gamma^{r_1 \cdots r_{d}}\Big|_{\text{Weyl}} = \frac{1}{\sqrt{-g}}\epsilon^{r_1\cdots
9 \, ,\quad \epsilon^{0\cdots (d-1)} = +1\, ,
15 \Gamma^{r_1\cdots r_n}\Big|_{\text{Weyl}} = \frac{1}{\sqrt{-g}} \frac{(-1)^{\frac{1}{2}n(n+1)+1}}{(…
16 \Gamma_{s_1\cdots s_{d-n}}\Big|_{\text{Weyl}} \epsilon^{s_1\cdots s_{d-n} r_1\cdots r_n}\, .
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| /dports/security/libecc/libecc-0.14.0/doc/ |
| H A D | sympoly.dox | 18 \fb S<sub>1</sub>(t<sub>1</sub>, t<sub>2</sub>, \f$\cdots\f$, t<sub>n</sub>) =
19 t<sub>1</sub> + t<sub>2</sub> + \f$\cdots\f$ + t<sub>n</sub> \fe<br>
20 \fb S<sub>2</sub>(t<sub>1</sub>, t<sub>2</sub>, \f$\cdots\f$, t<sub>n</sub>) =
23 t<sub>3</sub>t<sub>4</sub> + \f$\cdots\f$ + t<sub>n-1</sub>t<sub>n</sub> \fe<br>
24 \fb S<sub>3</sub>(t<sub>1</sub>, t<sub>2</sub>, \f$\cdots\f$, t<sub>n</sub>) =
26 \f$\cdots\f$ + t<sub>1</sub>t<sub>2</sub>t<sub>n</sub> +
27 \f$\cdots\f$ + t<sub>1</sub>t<sub>n-1</sub>t<sub>n</sub> +
28 \f$\cdots\f$ + t<sub>n-2</sub>t<sub>n-1</sub>t<sub>n</sub> \fe<br>
30 \fb S<sub>n</sub>(t<sub>1</sub>, t<sub>2</sub>, \f$\cdots\f$, t<sub>n</sub>) =
31 t<sub>1</sub>t<sub>2</sub>\f$\cdots\f$t<sub>n</sub> \fe
[all …]
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| /dports/math/libflame/libflame-5.2.0/docs/libflame/old/ |
| H A D | 60-pbmd.tex | 47 A_{0,0} & A_{0,1} & \cdots & A_{0,N-1} \\ \hline
48 A_{1,0} & A_{1,1} & \cdots & A_{1,N-1} \\ \hline
50 A_{M-1,0} & A_{M-1,1} & \cdots & A_{M-1,N-1}
57 A_{i,j * r} & \cdots & A_{i,(j+1)*r-1} &
58 A_{i,j * r+p} & \cdots & A_{i,(j+1)*r-1+p} & \cdots
60 A_{i+r,j * r} & \cdots & A_{i+r,(j+1)*r-1} &
61 A_{i+r,j * r+p} & \cdots & A_{i+r,(j+1)*r-1+p} & \cdots
63 A_{i+2r,j * r} & \cdots & A_{i+2r,(j+1)*r-1} &
64 A_{i+2r,j * r+p} & \cdots & A_{i+2r,(j+1)*r-1+p} & \cdots
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| /dports/print/latex2rtf/latex2rtf-2.3.17/test/ |
| H A D | tabular.tex | 194 Over 25 & $3/\sqrt{n}$ & $3/d_2\sqrt{n}$ & $\cdots$ & $\cdots$ & * & **
195 & $\cdots$ & $\cdots$ & $\cdots$ & $\cdots$ & $\cdots$ & $\cdots$
196 & $\cdots$ & $\cdots$ & $\cdots$ \\ \hline
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| /dports/science/code_saturne/code_saturne-7.1.0/docs/theory/ |
| H A D | operat.tex | 11 …h} $ order tensor: ]$a^{(n)} = a_{i_1 i_2 \cdots i_n} \, \vect{e}_{i_1} \otimes \vect{e}_{i_2} \ot…
20 …$& $a_{i_1 \cdots i_n} b_{j_1 \cdots j_m}$ & $\vect{e}_{i_1} \otimes \cdots \otimes \vect{e}_{i…
23 …_{i_1 \cdots i_{n-1}k} b_{k j_2 \cdots j_m} $&$ \vect{e}_{i_1} \otimes \cdots \otimes \vect{e}_{…
26 …{i_1 \cdots i_{n-2}kl} b_{k l j_3 \cdots j_m} $&$ \vect{e}_{i_1} \otimes \cdots \otimes \vect{e}…
92 … \right] $&$ = $&$ \dfrac{\partial a_{i_1 \cdots i_n} }{ \partial x_{i_n}} \vect{e}_{i_1} \otim…
97 …= $&$ \dfrac{ \partial^2 a_{i_1 \cdots i_n}}{ \partial x_{i_{n+1}} \partial x_{i_{n+1}}} \vect{e}…
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| /dports/net-mgmt/ipv6calc/ipv6calc-3.2.0/lib/ |
| H A D | libmac.c | 30 int retval = 1, result, i, ccolons = 0, cdashes = 0, cspaces = 0, cdots = 0; in mac_to_macaddrstruct() local
59 cdots++; in mac_to_macaddrstruct()
63 if ( ! ( (ccolons == 5 && cdashes == 0 && cspaces == 0 && cdots == 0) in mac_to_macaddrstruct()
64 || (ccolons == 0 && cdashes == 5 && cspaces == 0 && cdots == 0) in mac_to_macaddrstruct()
65 || (ccolons == 0 && cdashes == 0 && cspaces == 5 && cdots == 0) in mac_to_macaddrstruct()
66 || (ccolons == 0 && cdashes == 0 && cspaces == 0 && cdots == 2) in mac_to_macaddrstruct()
67 || (ccolons == 0 && cdashes == 1 && cspaces == 0 && strlen(addrstring) == 13 && cdots == 0) in mac_to_macaddrstruct()
68 || (ccolons == 0 && cdashes == 0 && cspaces == 0 && strlen(addrstring) == 12 && cdots == 0)) in mac_to_macaddrstruct()
84 } else if ( cdots == 2 ) { in mac_to_macaddrstruct()
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| /dports/converters/p5-LaTeXML/LaTeXML-0.8.6/t/alignment/ |
| H A D | plainmath.tex | 8 $$ \eqalign{ x &\ll y+i + \cdots + y_n \cr
10 $$ \eqalign{ x + y + z &\ll y+i + \cdots + y_n \cr
12 $$ \eqalignno{ x &\ll y+i + \cdots + y_n & (x)\cr
14 $$ \leqalignno{ x &\ll y+i + \cdots + y_n & (x)\cr
|
| /dports/math/cadabra2/cadabra2-2.3.6.8/core/properties/ |
| H A D | AntiSelfDual.tex | 6 F_{\mu_1\cdots \mu_n}
7 = - \frac{1}{n!} \epsilon_{\mu_1\cdots\mu_n \mu_{n+1}\cdots \mu_{2n}} F_{\mu_{n+1}\cdots\mu_{2n}}\,.
|
| H A D | SelfDual.tex | 6 F_{\mu_1\cdots \mu_n}
7 = \frac{1}{n!} \epsilon_{\mu_1\cdots\mu_n \mu_{n+1}\cdots \mu_{2n}} F_{\mu_{n+1}\cdots\mu_{2n}}\,.
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| /dports/editors/texmacs/TeXmacs-1.99.4-src/TeXmacs/doc/devel/format/stylesheet/ |
| H A D | prim-arith.zh.tm | 9 <explain-macro|plus|expr-1|<math|\<cdots\>>|expr-n>
11 …<explain-macro|minus|expr-1|<math|\<cdots\>>|expr-n><explain-synopsis|\<#52A0\>\<#6CD5\>\<#548C\>\…
18 <explain-macro|times|expr-1|<math|\<cdots\>>|expr-n><explain-synopsis|\<#4E58\>\<#6CD5\>>
25 <explain-macro|over|expr-1|<math|\<cdots\>>|expr-n><explain-synopsis|\<#9664\>\<#6CD5\>>
|
| /dports/textproc/hs-pandoc/pandoc-2.14.2/_cabal_deps/texmath-0.12.3.1/tests/src/ |
| H A D | moore_determinant.tex | 3 \alpha_1 & \alpha_1^q & \cdots & \alpha_1^{q^{n - 1}} \\
4 \alpha_2 & \alpha_2^q & \cdots & \alpha_2^{q^{n - 1}} \\
6 \alpha_m & \alpha_m^q & \cdots & \alpha_m^{q^{n - 1}}
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| /dports/textproc/hs-pandoc-crossref/pandoc-crossref-0.3.12.0/_cabal_deps/texmath-0.12.1.1/tests/src/ |
| H A D | moore_determinant.tex | 3 \alpha_1 & \alpha_1^q & \cdots & \alpha_1^{q^{n - 1}} \\
4 \alpha_2 & \alpha_2^q & \cdots & \alpha_2^{q^{n - 1}} \\
6 \alpha_m & \alpha_m^q & \cdots & \alpha_m^{q^{n - 1}}
|
| /dports/textproc/hs-pandoc-crossref/pandoc-crossref-0.3.12.0/_cabal_deps/texmath-0.12.1.1/tests/writers/ |
| H A D | moore_determinant.tex | 2 \alpha_{1} & \alpha_{1}^{q} & \cdots & \alpha_{1}^{q^{n - 1}} \\
3 \alpha_{2} & \alpha_{2}^{q} & \cdots & \alpha_{2}^{q^{n - 1}} \\
5 \alpha_{m} & \alpha_{m}^{q} & \cdots & \alpha_{m}^{q^{n - 1}} \\
|
| H A D | complex1.tex | 11 1 & 1 & \cdots & 1 \\
12 v_{1}^{} & v_{2}^{} & \cdots & v_{n}^{} \\
13 v_{1}^{2} & v_{2}^{2} & \cdots & v_{n}^{2} \\
15 v_{1}^{n - 1} & v_{2}^{n - 1} & \cdots & v_{n}^{n - 1} \\
30 …ac{1}{2_{}^{\lfloor k \cdot \varphi\rfloor}} = \frac{1}{2_{}^{0} + \frac{1}{2_{}^{1} + \cdots}}} \\
31 …m\limits_{k = 1}^{\infty}\frac{q_{}^{k_{}^{2} + k}}{(1 - q)(1 - q_{}^{2})\cdots(1 - q_{}^{k})}} = …
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| /dports/textproc/hs-pandoc/pandoc-2.14.2/_cabal_deps/texmath-0.12.3.1/tests/writers/ |
| H A D | moore_determinant.tex | 2 \alpha_{1} & \alpha_{1}^{q} & \cdots & \alpha_{1}^{q^{n - 1}} \\
3 \alpha_{2} & \alpha_{2}^{q} & \cdots & \alpha_{2}^{q^{n - 1}} \\
5 \alpha_{m} & \alpha_{m}^{q} & \cdots & \alpha_{m}^{q^{n - 1}} \\
|
| /dports/editors/texmacs/TeXmacs-1.99.4-src/TeXmacs/doc/main/styles/header/ |
| H A D | header-title-global.de.tm | 41 <explain-macro|doc-data-main|data-1|<math|\<cdots\>>|data-n>
43 <explain-macro|doc-data-main*|data-1|<math|\<cdots\>>|data-n>
51 <explain-macro|doc-data-note|data-1|<math|\<cdots\>>|data-n>
58 <explain-macro|doc-data-abstract|data-1|<math|\<cdots\>>|data-n>
65 <explain-macro|doc-data-hidden|data-1|<math|\<cdots\>>|data-n>
75 …doc-author-main|<with|font-shape|right|<explain-macro|author-data|data-1|<math|\<cdots\>>|data-n>>>
82 <explain-macro|doc-author-note|data-1|<math|\<cdots\>>|data-n>
|
| H A D | header-title-global.en.tm | 36 <explain-macro|doc-data-main|data-1|<math|\<cdots\>>|data-n>
38 <explain-macro|doc-data-main*|data-1|<math|\<cdots\>>|data-n>
46 <explain-macro|doc-data-note|data-1|<math|\<cdots\>>|data-n>
53 <explain-macro|doc-data-abstract|data-1|<math|\<cdots\>>|data-n>
60 <explain-macro|doc-data-hidden|data-1|<math|\<cdots\>>|data-n>
70 …doc-author-main|<with|font-shape|right|<explain-macro|author-data|data-1|<math|\<cdots\>>|data-n>>>
77 <explain-macro|doc-author-note|data-1|<math|\<cdots\>>|data-n>
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| /dports/math/openturns/openturns-1.18/python/src/ |
| H A D | LinearLeastSquares_doc.i.in | 35 where :math:`(a_j \, , \, j=0, \cdots,n_X)` is a set of unknown coefficients
36 and the family :math:`(\psi_j,j=0,\cdots, n_X)` gathers the constant monomial
38 notation :math:`\vect{a} \, = \, (a_{0} , \cdots , a_{n_X} )^{\textsf{T}}` and
39 :math:`\vect{\psi}(\vect{x}) \, = \, (\psi_0(\vect{x}), \cdots, \psi_{n_X}(\vect{x}) )^{\textsf{T}}…
50 :math:`\vect{\cX} =(x^{(1)},\cdots,x^{(N)})`, i.e. a set of realizations of
52 :math:`\vect{\cY} =(y^{(1)},\cdots,y^{(N)})`.
78 …\vect{\vect{\Psi}} \, = \, (\psi_{j}(\vect{x}^{(i)}) \; , \; i=1,\cdots,N \; , \; j = 0,\cdots,n_X)
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| /dports/science/dakota/dakota-6.13.0-release-public.src-UI/docs/KeywordMetadata/ |
| H A D | model-surrogate-global-function_train | 12 f_k^{11}(x_k) & \cdots & f_k^{1r_k}(x_k)\\
14 f_k^{r_{k-1}1}(x_k) & \cdots & f_k^{r_{k-1}r_k}(x_k)
21 f_1^{11}(x_1) & \cdots & f_1^{17}(x_1)
24 f_2^{11}(x_2) & \cdots & f_2^{15}(x_2)\\
26 f_2^{71}(x_2) & \cdots & f_2^{75}(x_2)
29 f_3^{11}(x_3) & \cdots & f_3^{13}(x_3)\\
31 f_3^{51}(x_3) & \cdots & f_3^{53}(x_3)
|