In mathematics, the Beurling–Lax theorem is a theorem due to Beurling (1948) and Lax (1959) which characterizes the shift- invariant subspaces of the Hardy space ${\displaystyle H^{2}(\mathbb {D} ,\mathbb {C} )}$. It states that each such space is of the form

${\displaystyle \theta H^{2}(\mathbb {D} ,\mathbb {C} ),}$

for some inner function ${\displaystyle \theta }$.

See also

• H²

References

• Ball, J. A. (2001) [1994], "Beurling-Lax theorem", Encyclopedia of Mathematics, EMS Press
• Beurling, A. (1948), "On two problems concerning linear transformations in Hilbert space", Acta Math., 81: 239–255, doi: 10.1007/BF02395019, MR  0027954
• Lax, P.D. (1959), "Translation invariant spaces", Acta Math., 101 (3–4): 163–178, doi: 10.1007/BF02559553, MR  0105620
• Jonathan R. Partington, Linear Operators and Linear Systems, An Analytical Approach to Control Theory, (2004) London Mathematical Society Student Texts 60, Cambridge University Press.
• Marvin Rosenblum and James Rovnyak, Hardy Classes and Operator Theory, (1985) Oxford University Press.

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