Lines Matching refs:infty

1221 \text{max}(\Delta_k, \omega_5 \|d_k\|) & \text{if } \tau_k \in [\nu_4, \infty),
1237 \alpha_1 \text{min}(\Delta_k, \|d_k\|) & \text{if } \kappa_k \in (-\infty, \eta_1) \\
1241 \text{max}(\Delta_k, \alpha_5 \|d_k\|) & \text{if } \kappa_k \in [\eta_4, \infty),
1495 \alpha_1 \text{min}(\Delta_k, \|d_k\|) & \text{if } \kappa_k \in (-\infty, \eta_1) \\
1499 \text{max}(\Delta_k, \alpha_5 \|d_k\|) & \text{if } \kappa_k \in [\eta_4, \infty),
2473 use a trust-region norm with $p=\infty$ and solve
2631 $\ell \in \{\mathbb R\cup \{-\infty\}\}^n$ and
2632 $u \in \{\mathbb R\cup \{\infty\}\}^n$, on the variables such that
2647 Note that when $\ell = \{-\infty\}^n$ and
2648 $u = \{\infty\}^n$, we have a nonlinear system of equations, and
2649 $\ell = \{0\}^n$ and $u = \{\infty\}^n$ correspond to the
2710    \phi(x_i - l_i, F_i(x)) & \text{if } -\infty < l_i < u_i = \infty, \\
2711    -\phi(u_i-x_i, -F_i(x)) & \text{if } -\infty = l_i < u_i < \infty, \\
2712    \phi(x_i - l_i, \phi(u_i - x_i, - F_i(x))) & \text{if } -\infty < l_i < u_i < \infty, \\
2713    -F_i(x) & \text{if } -\infty = l_i < u_i = \infty, \\
2714    l_i - x_i & \text{if } -\infty < l_i = u_i < \infty.