Pages that link to "Item:Q2230443"
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The following pages link to Null-controllability and control cost estimates for the heat equation on unbounded and large bounded domains (Q2230443):
Displaying 19 items.
- Exhaustion approximation for the control problem of the heat or Schrödinger semigroup on unbounded domains (Q777083) (← links)
- Some results on controllability for linear and nonlinear heat equations in unbounded domains (Q944164) (← links)
- A lower bound of the norm of the control operator for the heat equation (Q1067202) (← links)
- The cost of approximate controllability of heat equation with general dynamical boundary conditions (Q2041354) (← links)
- The reflection principle in the control problem of the heat equation (Q2155928) (← links)
- Characterizations of stabilizable sets for some parabolic equations in \(\mathbb{R}^n\) (Q2216045) (← links)
- Scale-free unique continuation estimates and Logvinenko-Sereda theorems on the torus (Q2216163) (← links)
- An abstract Logvinenko-Sereda type theorem for spectral subspaces (Q2661287) (← links)
- Uncertainty principle for Hermite functions and null-controllability with sensor sets of decaying density (Q2686573) (← links)
- A uniform bound on costs of controlling semilinear heat equations on a sequence of increasing domains and its application (Q5024344) (← links)
- $L^\infty$-Null Controllability for the Heat Equation and Its Consequences for the Time Optimal Control Problem (Q5320736) (← links)
- Null controllability of the heat equation in unbounded domains by a finite measure control region (Q5465557) (← links)
- On null‐controllability of the heat equation on infinite strips and control cost estimate (Q6081896) (← links)
- Approximate Null-Controllability with Uniform Cost for the Hypoelliptic Ornstein–Uhlenbeck Equations (Q6107857) (← links)
- Quantitative unique continuation for spectral subspaces of Schrödinger operators with singular potentials (Q6165628) (← links)
- Control problem for quadratic parabolic differential equations with sparse sensor sets of finite volume or anisotropically decaying density (Q6186391) (← links)
- A unified observability result for non-autonomous observation problems (Q6189353) (← links)
- Spectral inequality with sensor sets of decaying density for Schrödinger operators with power growth potentials (Q6547024) (← links)
- Spherical Logvinenko-Sereda-Kovrijkine type inequality and null-controllability of the heat equation on the sphere (Q6633591) (← links)