| /dports/games/mari0/ |
| H A D | hatconfigs.lua | 13 hat = {}
16 hat[i] = {}
17 hat[i].x = 7
18 hat[i].y = 2
23 hat[i] = {}
24 hat[i].x = 5
30 hat[i] = {}
31 hat[i].x = 5
37 hat[i] = {}
44 hat[i] = {}
[all …]
|
| /dports/textproc/miller/miller-5.10.2/go/reg-test/expected/ |
| H A D | case-c-dsl-prefixed-unprefixed-emit.sh.out | 68 a hat
93 a hat
156 sum:hat:hat 48.058897
375 a hat
443 hat hat 48.058897
510 hat hat 48.058897
626 sum:hat:hat:hathat 48.058897
1213 hat hat 48.058897
1378 hat hat 48.058897
1503 hat hat hathat 48.058897
[all …]
|
| /dports/games/supertux2/SuperTux-v0.6.3-Source/data/images/creatures/tux/ |
| H A D | powerups.sprite | 16 (images "fire/hat/walk-0.png"
17 "fire/hat/walk-1.png"
18 "fire/hat/walk-0.png"
19 "fire/hat/walk-3.png"))
30 (images "fire/hat/stand.png"))
50 (images "fire/hat/stand.png"))
60 (images "fire/hat/stand.png"))
70 (images "fire/hat/skid.png"))
160 (images "fire/hat/swim-0.png"
161 "fire/hat/swim-1.png"
[all …]
|
| /dports/textproc/miller/miller-5.10.2/data/ |
| H A D | medium | 28 a=hat,b=hat,i=28,x=0.5811879718711469,y=0.3934172489640808
59 a=hat,b=hat,i=59,x=0.23821881669710454,y=0.2495882683265671
66 a=hat,b=hat,i=66,x=0.8467681996061774,y=0.7322484476601094
133 a=hat,b=hat,i=133,x=0.10275440550496173,y=0.24475094001022435
135 a=hat,b=hat,i=135,x=0.6950203918361871,y=0.6680826428134803
176 a=hat,b=hat,i=176,x=0.5951138587106596,y=0.851049910114082
233 a=hat,b=hat,i=233,x=0.2131489206395062,y=0.08647965840929162
247 a=hat,b=hat,i=247,x=0.13552744935597638,y=0.7642516336910976
285 a=hat,b=hat,i=285,x=0.5231416402386272,y=0.8268208737366626
325 a=hat,b=hat,i=325,x=0.8502045677344342,y=0.06531154070205691
[all …]
|
| /dports/textproc/miller/miller-5.10.2/docs/data/ |
| H A D | medium | 28 a=hat,b=hat,i=28,x=0.5811879718711469,y=0.3934172489640808
59 a=hat,b=hat,i=59,x=0.23821881669710454,y=0.2495882683265671
66 a=hat,b=hat,i=66,x=0.8467681996061774,y=0.7322484476601094
133 a=hat,b=hat,i=133,x=0.10275440550496173,y=0.24475094001022435
135 a=hat,b=hat,i=135,x=0.6950203918361871,y=0.6680826428134803
176 a=hat,b=hat,i=176,x=0.5951138587106596,y=0.851049910114082
233 a=hat,b=hat,i=233,x=0.2131489206395062,y=0.08647965840929162
247 a=hat,b=hat,i=247,x=0.13552744935597638,y=0.7642516336910976
285 a=hat,b=hat,i=285,x=0.5231416402386272,y=0.8268208737366626
325 a=hat,b=hat,i=325,x=0.8502045677344342,y=0.06531154070205691
[all …]
|
| H A D | medium-squares | 42 a=hat,b=hat,i=59,x=0.23821881669710454,y=0.2495882683265671
46 a=hat,b=hat,i=66,x=0.8467681996061774,y=0.7322484476601094
82 a=hat,b=hat,i=133,x=0.10275440550496173,y=0.24475094001022435
83 a=hat,b=hat,i=135,x=0.6950203918361871,y=0.6680826428134803
106 a=hat,b=hat,i=176,x=0.5951138587106596,y=0.851049910114082
133 a=hat,b=hat,i=233,x=0.2131489206395062,y=0.08647965840929162
138 a=hat,b=hat,i=242,x=0.17197294875303992,y=0.42960373892313586
162 a=hat,b=hat,i=285,x=0.5231416402386272,y=0.8268208737366626
185 a=hat,b=hat,i=334,x=0.8122872254151258,y=0.9343598605592562
369 a=hat,b=hat,i=726,x=0.6769964245482417,y=0.6143975572853417
[all …]
|
| /dports/math/libflame/libflame-5.2.0/src/blas/3/syrk/ln/flatex/ |
| H A D | FLA_Syrk_ln_blk_var2.tex | 63 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
64 {\hat{C}_{BL}}{\hat{C}_{BR}}
98 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
99 {\hat{C}_{BL}}{\hat{C}_{BR}}
101 \FlaThreeByThreeBR{\hat{C}_{00}}{\hat{C}_{01}}{\hat{C}_{02}}
102 {\hat{C}_{10}}{\hat{C}_{11}}{\hat{C}_{12}}
103 {\hat{C}_{20}}{\hat{C}_{21}}{\hat{C}_{22}}
135 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
138 \FlaThreeByThreeTL{\hat{C}_{00}}{\hat{C}_{01}}{\hat{C}_{02}}
139 {\hat{C}_{10}}{\hat{C}_{11}}{\hat{C}_{12}}
[all …]
|
| H A D | FLA_Syrk_ln_blk_var1.tex | 63 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
64 {\hat{C}_{BL}}{\hat{C}_{BR}}
98 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
99 {\hat{C}_{BL}}{\hat{C}_{BR}}
101 \FlaThreeByThreeBR{\hat{C}_{00}}{\hat{C}_{01}}{\hat{C}_{02}}
102 {\hat{C}_{10}}{\hat{C}_{11}}{\hat{C}_{12}}
103 {\hat{C}_{20}}{\hat{C}_{21}}{\hat{C}_{22}}
135 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
138 \FlaThreeByThreeTL{\hat{C}_{00}}{\hat{C}_{01}}{\hat{C}_{02}}
139 {\hat{C}_{10}}{\hat{C}_{11}}{\hat{C}_{12}}
[all …]
|
| H A D | FLA_Syrk_ln_blk_var3.tex | 63 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
64 {\hat{C}_{BL}}{\hat{C}_{BR}}
98 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
99 {\hat{C}_{BL}}{\hat{C}_{BR}}
101 \FlaThreeByThreeTL{\hat{C}_{00}}{\hat{C}_{01}}{\hat{C}_{02}}
102 {\hat{C}_{10}}{\hat{C}_{11}}{\hat{C}_{12}}
103 {\hat{C}_{20}}{\hat{C}_{21}}{\hat{C}_{22}}
135 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
138 \FlaThreeByThreeBR{\hat{C}_{00}}{\hat{C}_{01}}{\hat{C}_{02}}
139 {\hat{C}_{10}}{\hat{C}_{11}}{\hat{C}_{12}}
[all …]
|
| H A D | FLA_Syrk_ln_blk_var4.tex | 63 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
64 {\hat{C}_{BL}}{\hat{C}_{BR}}
98 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
99 {\hat{C}_{BL}}{\hat{C}_{BR}}
101 \FlaThreeByThreeTL{\hat{C}_{00}}{\hat{C}_{01}}{\hat{C}_{02}}
102 {\hat{C}_{10}}{\hat{C}_{11}}{\hat{C}_{12}}
103 {\hat{C}_{20}}{\hat{C}_{21}}{\hat{C}_{22}}
135 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
138 \FlaThreeByThreeBR{\hat{C}_{00}}{\hat{C}_{01}}{\hat{C}_{02}}
139 {\hat{C}_{10}}{\hat{C}_{11}}{\hat{C}_{12}}
[all …]
|
| H A D | FLA_Syrk_ln_unb_var1.tex | 63 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
64 {\hat{C}_{BL}}{\hat{C}_{BR}}
96 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
97 {\hat{C}_{BL}}{\hat{C}_{BR}}
99 \FlaThreeByThreeBR{\hat{C}_{00}}{\hat{c}_{01}}{\hat{C}_{02}}
100 {\hat{c}_{10}^T}{\hat{\gamma}_{11}}{\hat{c}_{12}^T}
101 {\hat{C}_{20}}{\hat{c}_{21}}{\hat{C}_{22}}
133 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
136 \FlaThreeByThreeTL{\hat{C}_{00}}{\hat{c}_{01}}{\hat{C}_{02}}
137 {\hat{c}_{10}^T}{\hat{\gamma}_{11}}{\hat{c}_{12}^T}
[all …]
|
| H A D | FLA_Syrk_ln_unb_var2.tex | 63 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
64 {\hat{C}_{BL}}{\hat{C}_{BR}}
96 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
97 {\hat{C}_{BL}}{\hat{C}_{BR}}
99 \FlaThreeByThreeBR{\hat{C}_{00}}{\hat{c}_{01}}{\hat{C}_{02}}
100 {\hat{c}_{10}^T}{\hat{\gamma}_{11}}{\hat{c}_{12}^T}
101 {\hat{C}_{20}}{\hat{c}_{21}}{\hat{C}_{22}}
133 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
136 \FlaThreeByThreeTL{\hat{C}_{00}}{\hat{c}_{01}}{\hat{C}_{02}}
137 {\hat{c}_{10}^T}{\hat{\gamma}_{11}}{\hat{c}_{12}^T}
[all …]
|
| H A D | FLA_Syrk_ln_unb_var3.tex | 63 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
64 {\hat{C}_{BL}}{\hat{C}_{BR}}
96 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
97 {\hat{C}_{BL}}{\hat{C}_{BR}}
99 \FlaThreeByThreeTL{\hat{C}_{00}}{\hat{c}_{01}}{\hat{C}_{02}}
100 {\hat{c}_{10}^T}{\hat{\gamma}_{11}}{\hat{c}_{12}^T}
101 {\hat{C}_{20}}{\hat{c}_{21}}{\hat{C}_{22}}
133 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
136 \FlaThreeByThreeBR{\hat{C}_{00}}{\hat{c}_{01}}{\hat{C}_{02}}
137 {\hat{c}_{10}^T}{\hat{\gamma}_{11}}{\hat{c}_{12}^T}
[all …]
|
| H A D | FLA_Syrk_ln_unb_var4.tex | 63 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
64 {\hat{C}_{BL}}{\hat{C}_{BR}}
96 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
97 {\hat{C}_{BL}}{\hat{C}_{BR}}
99 \FlaThreeByThreeTL{\hat{C}_{00}}{\hat{c}_{01}}{\hat{C}_{02}}
100 {\hat{c}_{10}^T}{\hat{\gamma}_{11}}{\hat{c}_{12}^T}
101 {\hat{C}_{20}}{\hat{c}_{21}}{\hat{C}_{22}}
133 \FlaTwoByTwo{\hat{C}_{TL}}{\hat{C}_{TR}}
136 \FlaThreeByThreeBR{\hat{C}_{00}}{\hat{c}_{01}}{\hat{C}_{02}}
137 {\hat{c}_{10}^T}{\hat{\gamma}_{11}}{\hat{c}_{12}^T}
[all …]
|
| /dports/math/scs/scs-3.0.0/docs/src/algorithm/ |
| H A D | equilibration.rst | 15 :math:`(\hat P, \hat A, \hat b, \hat c)` where
18 \hat P = EPE,\quad \hat A = DAE,\quad \hat c = \sigma Ec,\quad \hat b = \sigma Db
25 \hat P & \hat A^\top & \hat c\\
26 \hat A & 0 & \hat b \\
27 \hat c^\top & \hat b^\top & 0
89 :math:`(\hat x, \hat y, \hat s)` the solution to the equilibrated
100 x^\top P x = \hat x^\top \hat P \hat x / \sigma^2
116 r_p = \|A x + s - b\| = (1/\sigma) \| D^{-1} (\hat A \hat x + \hat s + \hat b)\|
122 …r_d = \|P x + A^\top y + c\| = (1/\sigma) \|E^{-1} (\hat P \hat x + \hat A^\top \hat y + \hat c) \|
128 … x + b^\top y + c^\top x| = (1/\sigma^2) |\hat x^\top \hat P \hat x + \hat b^\top \hat y + \hat c…
[all …]
|
| /dports/math/py-scs/scs-3.0.0/scs/docs/src/algorithm/ |
| H A D | equilibration.rst | 15 :math:`(\hat P, \hat A, \hat b, \hat c)` where
18 \hat P = EPE,\quad \hat A = DAE,\quad \hat c = \sigma Ec,\quad \hat b = \sigma Db
25 \hat P & \hat A^\top & \hat c\\
26 \hat A & 0 & \hat b \\
27 \hat c^\top & \hat b^\top & 0
89 :math:`(\hat x, \hat y, \hat s)` the solution to the equilibrated
100 x^\top P x = \hat x^\top \hat P \hat x / \sigma^2
116 r_p = \|A x + s - b\| = (1/\sigma) \| D^{-1} (\hat A \hat x + \hat s + \hat b)\|
122 …r_d = \|P x + A^\top y + c\| = (1/\sigma) \|E^{-1} (\hat P \hat x + \hat A^\top \hat y + \hat c) \|
128 … x + b^\top y + c^\top x| = (1/\sigma^2) |\hat x^\top \hat P \hat x + \hat b^\top \hat y + \hat c…
[all …]
|
| /dports/math/cppad/CppAD-20210000.8/example/abs_normal/ |
| H A D | talk.tex | 92 z ( \hat{x}, a( \hat{x} ) )
93 + \partial_x z ( \hat{x}, a( \hat{x} ) ) ( x - \hat{x} )
94 + \partial_u z ( \hat{x}, a( \hat{x} ) ) ( u - a( \hat{x} ) )
103 z_0 ( \hat{x}, a( \hat{x} ) )
104 + \partial_x z_0 ( \hat{x}, a( \hat{x} ) ) ( x - \hat{x} )
113 + \partial_x z_i ( \hat{x}, a( \hat{x} ) ) ( x - \hat{x} )
124 a(x) = a[ \hat{x} ]( x ) + o( x - \hat{x} )
152 y ( \hat{x}, a( \hat{x} ) )
153 + \partial_x y ( \hat{x}, a( \hat{x} ) ) ( x - \hat{x} )
154 + \partial_u y ( \hat{x}, a( \hat{x} ) ) ( u - a( \hat{x} ) )
[all …]
|
| /dports/math/openturns/openturns-1.18/python/src/ |
| H A D | ParetoFactory_doc.i.in | 21 The estimator :math:`(\hat{\beta}_n, \hat{\alpha}_n, \hat{\gamma}_n)` of
30 …skew_n & = & \dfrac{ 2(1+\hat{\alpha}_n) }{ \hat{\alpha}_n-3 } \sqrt{ \dfrac{ \hat{\alpha}_n-2 }{…
33 There exists a symbolic solution. If :math:`\hat{\alpha}_n >3`, then we get :math:`(\hat{\beta}_n, …
39 \hat{\beta}_n & = & (\hat{\alpha}_n-1) \sqrt{\dfrac{\hat{\alpha}_n-2}{\hat{\alpha}_n}}s_n \\
40 \hat{\gamma}_n & = & \overline{x}_n - \dfrac{\hat{\alpha}_n}{\hat{\alpha}_n+1} \hat{\beta}_n
53 The maximum likelihood based estimator :math:`(\hat{\beta}_n, \hat{\alpha}_n, \hat{\gamma}_n)` of :…
57 …(\hat{\beta}_n, \hat{\alpha}_n, \hat{\gamma}_n) = \argmax_{\alpha, \beta, \gamma} \ell(\alpha, \be…
79 …\hat{\alpha}_n( \gamma) & = & \dfrac{n}{\sum_{i=1}^n \log\left( \dfrac{x_i - \gamma}{\hat{\beta}_n…
87 \hat{\gamma}_n = \argmax_{\gamma} \ell(\hat{\beta}_n( \gamma), \hat{\alpha}_n( \gamma), \gamma)
115 \hat{\beta} &= \exp{\frac{-a_0}{a_1}}\\
[all …]
|
| H A D | WeibullMinFactory_doc.i.in | 22 The estimator :math:`(\hat{\beta}_n, \hat{\alpha}_n, \hat{\gamma}_n)` of
34 \overline{x}_n & = & \hat{\beta}_n \,\Gamma\left(1 + \frac{1}{\hat{\alpha}_n}\right)
35 + \hat{\gamma}_n \\
36 s_n^2 & = & \hat{\beta}_n^2 \left( \Gamma \left( 1 + \frac{2}{\hat{\alpha}_n} \right) -
37 \Gamma^2 \left( 1 + \frac{1}{\hat{\alpha}_n} \right) \right)
58 defined by :math:`(\hat{\beta}_n, \hat{\alpha}_n, \hat{\gamma}_n)` verifying:
65 S_3(\hat{\alpha}_n,\hat{\gamma}_n) - n\hat{\beta}_n^{\hat{\alpha}_n} = 0 \\
66 …\hat{\alpha}_n \left[S_0(\hat{\gamma}_n) - n\dfrac{S_4(\hat{\alpha}_n,\hat{\gamma}_n)}{S_3(\hat{\a…
67 …S_0(\hat{\gamma}_n)(S_3(\hat{\alpha}_n,\hat{\gamma}_n)(n+S_1(\hat{\gamma}_n))-nS_2(\hat{\alpha}_n,…
|
| /dports/textproc/miller/miller-5.10.2/go/reg-test/input/ |
| H A D | abixy-wide | 9 a=hat,b=hat,i=9,x=0.33786884067769307,y=0.6036735617015514,x2=0.11415535350088835,xy=0.203962486439…
25 a=hat,b=hat,i=25,x=0.16707716998324063,y=0.4457018161567563,x2=0.027914780729608683,xy=0.0744665980…
50 a=hat,b=hat,i=50,x=0.5979364499843741,y=0.01637946256325762,x2=0.35752799821991593,xy=0.00979387769…
56 a=hat,b=hat,i=56,x=0.6457343407175848,y=0.2098352953222723,x2=0.41697283878197394,xy=0.135497856084…
58 a=hat,b=hat,i=58,x=0.2095505109133845,y=0.17354923704865088,x2=0.04391141662406048,xy=0.03636733129…
108 a=hat,b=hat,i=108,x=0.7310592435672268,y=0.7865030408830793,x2=0.5344476176050859,xy=0.574980318131…
139 a=hat,b=hat,i=139,x=0.8124229919653702,y=0.6498112783277437,x2=0.6600311178739638,xy=0.527921622951…
184 a=hat,b=hat,i=184,x=0.3669411646566748,y=0.939863478805397,x2=0.13464581831959693,xy=0.344874599531…
313 a=hat,b=hat,i=313,x=0.2889248371208133,y=0.3113593460747701,x2=0.0834775615052885,xy=0.089959448350…
427 a=hat,b=hat,i=427,x=0.9817619908536765,y=0.9720329944246192,x2=0.9638566066849745,xy=0.954305047781…
[all …]
|
| /dports/textproc/miller/miller-5.10.2/c/reg_test/input/ |
| H A D | abixy-wide | 9 a=hat,b=hat,i=9,x=0.33786884067769307,y=0.6036735617015514,x2=0.11415535350088835,xy=0.203962486439…
25 a=hat,b=hat,i=25,x=0.16707716998324063,y=0.4457018161567563,x2=0.027914780729608683,xy=0.0744665980…
50 a=hat,b=hat,i=50,x=0.5979364499843741,y=0.01637946256325762,x2=0.35752799821991593,xy=0.00979387769…
56 a=hat,b=hat,i=56,x=0.6457343407175848,y=0.2098352953222723,x2=0.41697283878197394,xy=0.135497856084…
58 a=hat,b=hat,i=58,x=0.2095505109133845,y=0.17354923704865088,x2=0.04391141662406048,xy=0.03636733129…
108 a=hat,b=hat,i=108,x=0.7310592435672268,y=0.7865030408830793,x2=0.5344476176050859,xy=0.574980318131…
139 a=hat,b=hat,i=139,x=0.8124229919653702,y=0.6498112783277437,x2=0.6600311178739638,xy=0.527921622951…
184 a=hat,b=hat,i=184,x=0.3669411646566748,y=0.939863478805397,x2=0.13464581831959693,xy=0.344874599531…
313 a=hat,b=hat,i=313,x=0.2889248371208133,y=0.3113593460747701,x2=0.0834775615052885,xy=0.089959448350…
427 a=hat,b=hat,i=427,x=0.9817619908536765,y=0.9720329944246192,x2=0.9638566066849745,xy=0.954305047781…
[all …]
|
| /dports/games/brainparty/brainparty/ |
| H A D | underthehat.cpp | 68 hat->X = point->X; in BPMiniGame_UnderTheHat()
69 hat->Y = point->Y; in BPMiniGame_UnderTheHat()
70 hat->DestX = point->X; in BPMiniGame_UnderTheHat()
71 hat->DestY = point->Y; in BPMiniGame_UnderTheHat()
73 Hats.Add(hat); in BPMiniGame_UnderTheHat()
113 TheGame->DrawImage(sfcBadHat, hat->X, hat->Y); in Render()
115 TheGame->DrawImage(sfcHat, hat->X, hat->Y); in Render()
188 hat->X = TheGame->SmoothStep(hat->StartX, hat->DestX, MoveAmount); in Tick()
189 hat->Y = TheGame->SmoothStep(hat->StartY, hat->DestY, MoveAmount); in Tick()
257 hat->StartX = hat->X; in MakeMove()
[all …]
|
| /dports/science/dakota/dakota-6.13.0-release-public.src-UI/docs/latex-theory/ |
| H A D | Theory_ActiveSubspace.tex | 11 …$$\hat{\mathbf{C}} = \frac{1}{M}\sum_{i=1}^{M}\nabla_{\mathbf{x}} f_i\nabla_{\mathbf{x}} f_i^T = \…
13 $\hat{\mathbf{\Lambda}} = \text{diag}(\hat{\lambda}_1,\:\ldots\:,\hat{\lambda}_N)$
19 $$\hat{\mathbf{W}} = \left[\hat{\mathbf{W}}_1\quad\hat{\mathbf{W}}_2\right].$$
77 …$$\hat{\mathbf{C}} = \frac{1}{M}\sum_{i=1}^{M}\nabla_{\mathbf{x}} f_i\nabla_{\mathbf{x}} f_i^T = \…
79 $\hat{\mathbf{\Lambda}} = \text{diag}(\hat{\lambda}_1,\:\ldots\:,\hat{\lambda}_N)$
84 …$$\hat{\mathbf{C}}_j^* = \hat{\mathbf{W}}_j^*\hat{\mathbf{\Lambda}}_j^*\left(\hat{\mathbf{W}}_j^*\…
89 $\hat{\mathbf{W}}_n$ and $\hat{\mathbf{W}}_{j,n}^*$ both contain
115 …$$\hat{\mathbf{C}} = \frac{1}{M}\sum_{i=1}^{M}\nabla_{\mathbf{x}} f_i\nabla_{\mathbf{x}} f_i^T = \…
117 $\hat{\mathbf{\Lambda}} = \text{diag}(\hat{\lambda}_1,\:\ldots\:,\hat{\lambda}_N)$
125 …$$\hat{\mathbf{C}}_j^* = \hat{\mathbf{W}}_j^*\hat{\mathbf{\Lambda}}_j^*\left(\hat{\mathbf{W}}_j^*\…
[all …]
|
| /dports/math/libflame/libflame-5.2.0/docs/libflame/flatex/ |
| H A D | chol_l_blk_var2.tex | 11 A = \hat{A}
28 \FlaTwoByTwo{\hat{A}_{TL}}{\hat{A}_{TR}}
29 {\hat{A}_{BL}}{\hat{A}_{BR}}
92 \FlaThreeByThreeBR{\hat{A}_{00}}{\hat{A}_{01}}{\hat{A}_{02}}
93 {\hat{A}_{10}}{\hat{A}_{11}}{\hat{A}_{12}}
94 {\hat{A}_{20}}{\hat{A}_{21}}{\hat{A}_{22}}
105 \FlaThreeByThreeTL{\hat{A}_{00}}{\hat{A}_{01}}{\hat{A}_{02}}
106 {\hat{A}_{10}}{\hat{A}_{11}}{\hat{A}_{12}}
107 {\hat{A}_{20}}{\hat{A}_{21}}{\hat{A}_{22}}
|
| /dports/lang/erlang-runtime23/otp-OTP-23.3.4.10/lib/asn1/test/asn1_SUITE_data/rfcs/ |
| H A D | IPMSObjectIdentifiers.asn1 | 174 id-hat-heading ID ::= {id-hat 0}
176 id-hat-this-ipm ID ::= {id-hat 1}
178 id-hat-originator ID ::= {id-hat 2}
182 id-hat-subject ID ::= {id-hat 4}
184 id-hat-expiry-time ID ::= {id-hat 5}
186 id-hat-reply-time ID ::= {id-hat 6}
188 id-hat-importance ID ::= {id-hat 7}
190 id-hat-sensitivity ID ::= {id-hat 8}
204 id-hat-related-IPMs ID ::= {id-hat 15}
210 id-hat-languages ID ::= {id-hat 18}
[all …]
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