In functional analysis in mathematics, the HilleâÂÂYosida theorem characterizes the generators of strongly continuous one-parameter semigroups of linear operators on Banach spaces. It is sometimes stated for the special case of contraction semigroups, with the general case being called the FellerâÂÂMiyaderaâÂÂPhillips theorem (after William Feller, Isao Miyadera, and Ralph Phillips). The contraction semigroup case is widely used in the theory of Markov processes. In other scenarios, the closely related LumerâÂÂPhillips theorem is often more useful in determining whether a given operator generates a strongly continuous contraction semigroup. The HilleâÂÂYosida theorem is named after mathematicians Einar Hille and Kà Âsaku Yosida, who independently proved it around 1948.
If X is a Banach space, a one-parameter semigroup of operators on X is a family of operators indexed on the non-negative real numbers {T(t)}<sub> t â [0, ∞)</sub> such that
The semigroup is said to be strongly continuous, also called a (C<sub>0</sub>) semigroup, if and only if the mapping
is continuous for all x â X, where [0, ∞) has the usual topology and X has the norm topology.
The infinitesimal generator of a one-parameter semigroup T is an operator A defined on a possibly proper subspace of X as follows:
The infinitesimal generator of a strongly continuous one-parameter semigroup is a closed linear operator defined on a dense linear subspace of X.
The HilleâÂÂYosida theorem provides a necessary and sufficient condition for a closed linear operator A on a Banach space to be the infinitesimal generator of a strongly continuous one-parameter semigroup.
Let A be a linear operator defined on a linear subspace D(A) of the Banach space X, ω a real number, and M > 0. Then A generates a strongly continuous semigroup T that satisfies if and only if
In the general case the HilleâÂÂYosida theorem is mainly of theoretical importance since the estimates on the powers of the resolvent operator that appear in the statement of the theorem can usually not be checked in concrete examples. In the special case of contraction semigroups (M = 1 and ω = 0 in the above theorem) only the case n = 1 has to be checked and the theorem also becomes of some practical importance. The explicit statement of the HilleâÂÂYosida theorem for contraction semigroups is:
Let A be a linear operator defined on a linear subspace D(A) of the Banach space X. Then A generates a contraction semigroup if and only if