Pages that link to "Item:Q2774831"

The following pages link to Scattering on graphs and one-dimensional approximations to \(N\)-dimensional Schrödinger oper\-ators. (Q2774831):

Displaying 11 items.

• Ambarzumian's theorem for a Sturm-Liouville boundary value problem on a star-shaped graph (Q883618) (← links)
• Scattering problems on noncompact graphs (Q1112304) (← links)
• An inverse spectral problem for the Sturm-Liouville operator on a three-star graph (Q1954337) (← links)
• Approximations by graphs and emergence of global structures (Q2480644) (← links)
• The scattering problem for a discrete Schrödinger operator with the “resonant” potential on the graph (Q2932377) (← links)
• Scattering theory on graphs: II. The Friedel sum rule (Q4545258) (← links)
• Time-Dispersive Behavior as a Feature of Critical-Contrast Media (Q4631721) (← links)
• Modern results in the spectral analysis for a class of integral-difference operators and application to physical processes (Q5118029) (← links)
• Inverse problem for integral-difference operators on graphs (Q5118030) (← links)
• A Borg–Levinson theorem for trees (Q5428307) (← links)
• Analysis of the dispersion equation for the Schrödinger operator on periodic metric graphs (Q5461785) (← links)