Search Results

PS : Indeed, there is a typo in my equation. Thanks to Zachary's observation. Consider a PDE for $v: [0,1]^2\to (-\infty,0]$ satisfying $$v_t(t,x) = \frac{v_{xx}(t,x)v(t,x)-v_{x}(t,x)^2}{v(t,x)^2},\qu …

Consider the non-linear PDE for $u:[0,1]\times [-1,1]\to\mathbb R$ as follows: $$u_t= \inf_{b\ge 1/e} \big(-b u_{xx} - \log b - 1\big), \quad \forall (t,x) \in (0,1) \times (-1,1),$$ together with the …

Consider a terminal-boundary value problem for $v: (t,x,y)\in [0,T]\times \mathbb R^2_+\to \mathbb R\ni v(t,x,y)$: $$ \begin{cases} v_t + \max(v_x,v_y)+ \frac 1 2 (v_{xx}+v_{yy})=0, & \forall (t,x,y) …

Consider the PDE for $p:[0,T]\times [0,1]\to\mathbb R$ as follows: $$ \begin{cases} p_t = e^{-p}p_{xx}, & (t,x)\in (0,T)\times (0,1),\\ p(0,\cdot)\equiv -c &\text{for }x\in (0,1)\\ p(\cdot,0)\equiv 0 …

Consider the one-dimensional logarithmic diffusion equation for $u: \mathbb R_+ \times [0,1]\ni (t,x)\to u(t,x)\in \mathbb R$ : $$(\ast)\quad\quad \begin{cases} 2u_t = \big(\log(u)\big)_{xx} & \text …