Searched refs:beta_1 (Results 176 – 194 of 194) sorted by relevance
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7757 $${2\beta_1(\theta_0+\phi_1)-6\theta_0\over\alpha_0^2d_{01}}7758 =\gamma_0{2\alpha_0(\theta_0+\phi_1)-6\phi_1\over\beta_1^2d_{01}}.$$7760 $$(\alpha_0\chi_0+3-\beta_1)\theta_0+7761 \bigl((3-\alpha_0)\chi_0+\beta_1\bigr)\theta_1=7762 -\bigl((3-\alpha_0)\chi_0+\beta_1\bigr)\psi_1,$$7763 where $\chi_0=\alpha_0^2\gamma_0/\beta_1^2$; so we can set $C_0=7764 \chi_0\alpha_0+3-\beta_1$, $D_0=(3-\alpha_0)\chi_0+\beta_1$, $R_0=-D_0\psi_1$.
10201 $$\text{lr}_t := \mathrm{learning_rate} * \sqrt{1 - \beta_2^t} / (1 - \beta_1^t)$$10202 $$m_t := \beta_1 * m_{t-1} + (1 - \beta_1) * g$$
4960 call beta_1(d_b0,d_t1,d_tr1(axisA),d_tr2(axisA),
10861 $$\text{lr}_t := \mathrm{learning_rate} * \sqrt{1 - \beta_2^t} / (1 - \beta_1^t)$$10862 $$m_t := \beta_1 * m_{t-1} + (1 - \beta_1) * g$$
24427 uri: `cpe:/a:apache:groovy:1.7.0:beta_1`,24507 uri: `cpe:/a:apache:groovy:1.8.0:beta_1`,24597 uri: `cpe:/a:apache:groovy:1.9.0:beta_1`,24617 uri: `cpe:/a:apache:groovy:2.0.0:beta_1`,24697 uri: `cpe:/a:apache:groovy:2.1.0:beta_1`,24767 uri: `cpe:/a:apache:groovy:2.2.0:beta_1`,24807 uri: `cpe:/a:apache:groovy:2.3.0:beta_1`,24892 uri: `cpe:/a:apache:groovy:2.4.0:beta_1`,421787 uri: `cpe:/a:mozilla:seamonkey:2.0:beta_1`,578652 uri: `cpe:/a:syntevo:smartsvn:5.0:beta_1`,[all …]
13322 …A = \begin{pmatrix} \alpha_1 & \beta_1 & \gamma_1 & 0 & 0 & 0 \\ \delta_1 & \alpha_2 & \beta_2 & \…13333 …AB = \begin{pmatrix} * & * & \alpha_1 & \delta_1 \\ * & \beta_1 & \alpha_2 & \delta_2 \\ \gamma_1 …13351 …A = \begin{pmatrix} \alpha_1 & \beta_1 & \gamma_1 & 0 & 0 & 0 \\ \beta_1 & \alpha_2 & \beta_2 & \g…13355 …AB = \begin{pmatrix} \alpha_1 & \beta_1 & \gamma_1 \\ \alpha_2 & \beta_2 & \gamma_2 \\ \alpha_3 & …13395 …A = \begin{pmatrix} \alpha_1 & \beta_1 & \gamma_1 & 0 & 0 & 0 & 0 \\ \delta_1 & \alpha_2 & \beta_2…13399 …& * & * & \alpha_1 & \delta_1 & \epsilon_1 & \zeta_1 \\ * & * & * & * & \beta_1 & \alpha_2 & \delt…
1 SUBROUTINE beta_1(d_i0,d_t1,d_tra1,d_tra2,d_trb1,d_trb2,d_trc1,d_t subroutine
12834 $Q_k(x)=\beta_0+\beta_1(x-x_1)+...+\beta_{k}(x-x_1)(x-x_2)...(x-x_{k})$\\12835 $\beta_0=f[x_1]$, $\beta_1=f[x_1,x_2]$, $\beta_{k}=f[x_1,..,x_{k+1}]$.\\12938 $f[x_1x_2]=\beta_1=(\gamma_0-\beta_0)/(1-0)=e^2-e$,\\12939 $f[x_1x_2x_3]=\alpha_2=(\beta_1-\alpha_1)/(2-0)=(e^2-2e+1)/2$\\
4518 $\alpha_1,..., \alpha_a$ de $A$ et $\beta_1,...,\beta_b$ $B$,14325 \[ \alpha_0=1, \beta_0=0, \alpha_1=0, \beta_1=1, r_0=n, r_1=x \]
5988 beta_1.F,v 1.1 2007-10-29 02:27:41 jhammond
6114 beta_1.F,v 1.1 2007-10-29 02:27:41 jhammond