Titchmarsh convolution theorem

The Titchmarsh convolution theorem is named after Edward Charles Titchmarsh, a British mathematician. The theorem describes the properties of the support of the convolution of two functions.

E.C. Titchmarsh proved the following theorem in 1926:

If ${\displaystyle \phi \,(t)}$ and ${\displaystyle \psi (t)\,}$ are integrable functions, such that

${\displaystyle \int _{0}^{x}\phi (t)\psi (x-t)\,dt=0}$

almost everywhere in the interval ${\displaystyle 0<x<\kappa \,}$, then there exist ${\displaystyle \lambda \geq 0}$ and ${\displaystyle \mu \geq 0}$ satisfying ${\displaystyle \lambda +\mu \geq \kappa }$ such that ${\displaystyle \phi (t)=0\,}$ almost everywhere in ${\displaystyle (0,\lambda )\,}$, and ${\displaystyle \psi (t)=0\,}$ almost everywhere in ${\displaystyle (0,\mu )\,}$.

This result, known as the Titchmarsh convolution theorem, could be restated in the following form:

Let ${\displaystyle \phi ,\,\psi \in L^{1}(\mathbb {R} )}$. Then ${\displaystyle \inf \mathop {\rm {supp}} \,\phi \ast \psi =\inf \mathop {\rm {supp}} \,\phi +\inf \mathop {\rm {supp}} \,\psi }$ if the right-hand side is finite.

Similarly, ${\displaystyle \sup \mathop {\rm {supp}} \,\phi \ast \psi =\sup \mathop {\rm {supp}} \,\phi +\sup \mathop {\rm {supp}} \,\psi }$ if the right-hand side is finite.

This theorem essentially states that the well-known inclusion

${\displaystyle {\rm {supp}}\,\phi \ast \psi \subset \mathop {\rm {supp}} \,\phi +\mathop {\rm {supp}} \,\psi }$

is sharp at the boundary.

The higher-dimensional generalization in terms of the convex hull of the supports was proved by J.-L. Lions in 1951:

If ${\displaystyle \phi ,\,\psi \in {\mathcal {E}}'(\mathbb {R} ^{n})}$, then ${\displaystyle \mathop {c.h.} \mathop {\rm {supp}} \,\phi \ast \psi =\mathop {c.h.} \mathop {\rm {supp}} \,\phi +\mathop {c.h.} \mathop {\rm {supp}} \,\psi .}$

Above, ${\displaystyle \mathop {c.h.} }$ denotes the convex hull of the set. ${\displaystyle {\mathcal {E}}'(\mathbb {R} ^{n})}$ denotes the space of distributions with compact support.

The original proof by Titchmarsh is based on the Phragmén–Lindelöf principle, Jensen's inequality, Theorem of Carleman, and Theorem of Valiron. More proofs are contained in [Hörmander, Theorem 4.3.3] (harmonic analysis style), [Yosida, Chapter VI] (real analysis style), and [Levin, Lecture 16] (complex analysis style). An elementary proof is given by [Doss].

• Titchmarsh, E.C. (1926). "The zeros of certain integral functions". Proceedings of the London Mathematical Society. 25: 283–302. doi:10.1112/plms/s2-25.1.283.

• Lions, J.-L. (1951). "Supports de produits de composition". Les Comptes rendus de l'Académie des sciences. 232: 1530–1532, 1622–1624. {{cite journal}}: |format= requires |url= (help)

• "Titchmarsh's theorem on convolution and the theory of Dufresnoy". Prace Matematyczne. 4: 59–76. 1960. {{cite journal}}: Unknown parameter |authors= ignored (help)

• Yosida, K. (1980). Functional Analysis. Grundlehren der Mathematischen Wissenschaften (Fundamental Principles of Mathematical Sciences), vol. 123 (6th ed.). Berlin: Springer-Verlag.

• Hörmander, L. (1990). The Analysis of Linear Partial Differential Operators, I. Springer Study Edition (2nd ed.). Berlin: Springer-Verlag.

• Levin, B. Ya. (1996). Lectures on Entire Functions. Translations of Mathematical Monographs, vol. 150. Providence, RI: American Mathematical Society.