Birman–Schwinger principle

In mathematics the Birman–Schwinger principle is a useful technique to reduce the eigenvalue problem for an unbounded differential operator (such as a Schrödinger operator) to an eigenvalue problem for a bounded integral operator. It originates from independent work by M. Sh.

Source: Wikipedia — Birman–Schwinger principle (CC BY-SA 4.0)

Birman–Schwinger principle

In mathematics the Birman–Schwinger principle is a useful technique to reduce the eigenvalue problem for an unbounded differential operator (such as a Schrödinger operator) to an eigenvalue problem for a bounded integral operator. It originates from independent work by M. Sh.

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Source: Wikipedia "Birman–Schwinger principle" · CC BY-SA 4.0

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