Pages that link to "Item:Q2311594"

The following pages link to Quantitative unique continuation for the heat equation with Coulomb potentials (Q2311594):

Displaying 9 items.

• Quantitative uniqueness for time-periodic heat equation with potential and its applications. (Q601567) (← links)
• Quantitative unique continuation for the heat equations with inverse square potential (Q824876) (← links)
• Quantitative unique continuation for the semilinear heat equation in a convex domain (Q984417) (← links)
• Observation estimate for the heat equations with Neumann boundary conditions via logarithmic convexity (Q2095436) (← links)
• Hardy and Rellich inequalities for anisotropic \(p\)-sub-Laplacians (Q2175548) (← links)
• Quantification of the unique continuation property for the heat equation (Q2360789) (← links)
• Quantitative unique continuation for the linear coupled heat equations (Q2406280) (← links)
• A uniform bound on costs of controlling semilinear heat equations on a sequence of increasing domains and its application (Q5024344) (← links)
• Variable-coefficient parabolic theory as a high-dimensional limit of elliptic theory (Q6145652) (← links)