Lumer–Phillips theorem

Statement of the theorem

1. D is dense in X,
2. A is closed,
3. A is dissipative, and
4. A − λ₀I is surjective for some λ₀> 0, where I denotes the identity operator.

Variants of the theorem

Reflexive spaces

1. A is dissipative, and
2. A − λ₀I is surjective for some λ₀> 0, where I denotes the identity operator.

Dissipativity of the adjoint

• A is closed and both A and its adjoint operator A^∗ are dissipative.

Quasicontraction semigroups

1. D is dense in X,
2. A is closed,
3. A is quasidissipative, i.e. there exists a ω ≥ 0 such that A − ωI is dissipative, and
4. A − λ₀I is surjective for some λ₀ > ω, where I denotes the identity operator.

   Examples

• Consider H = L² with its usual inner product, and let Au = u′ with domain D equal to those functions u in the Sobolev space H¹ with u = 0. D is dense. Moreover, for every u in D,

• A normal operator on a Hilbert space generates a strongly continuous semigroup if and only if its spectrum is bounded from above.