Golden–Thompson inequality

In physics and mathematics, the Golden–Thompson inequality is a trace inequality between exponentials of symmetric and Hermitian matrices proved independently by Script error: No such module "Footnotes". and Script error: No such module "Footnotes".. It has been developed in the context of statistical mechanics, where it has come to have a particular significance.

Statement

The Golden–Thompson inequality states that for (real) symmetric or (complex) Hermitian matrices A and B, the following trace inequality holds:

${\displaystyle \mathrm{tr}{e}^{A+B}\le \mathrm{tr}\left(e^A{e}^B\right).}$

This inequality is well defined, since the quantities on either side are real numbers. For the expression on the right hand side of the inequality, this can be seen by rewriting it as ${\displaystyle \mathrm{tr}(e^{A/2}{e}^B{e}^{A/2})}$ using the cyclic property of the trace.

Let ${\displaystyle \Vert \cdot \Vert }$ denote the Frobenius norm, then the Golden–Thompson inequality is equivalently stated as$${\displaystyle \Vert e^{A+B}\Vert \le \Vert e^A{e}^B\Vert .}$$

Motivation

The Golden–Thompson inequality can be viewed as a generalization of a stronger statement for real numbers. If a and b are two real numbers, then the exponential of a+b is the product of the exponential of a with the exponential of b:

${\displaystyle e^{a+b}=e^a{e}^b.}$

If we replace a and b with commuting matrices A and B, then the same inequality ${\displaystyle e^{A+B}=e^A{e}^B}$ holds.

This relationship is not true if A and B do not commute. In fact, Script error: No such module "Footnotes". proved that if A and B are two Hermitian matrices for which the Golden–Thompson inequality is verified as an equality, then the two matrices commute. The Golden–Thompson inequality shows that, even though ${\displaystyle e^{A+B}}$ and ${\displaystyle e^A{e}^B}$ are not equal, they are still related by an inequality.

Proof

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Generalizations

Other norms

In general, if A and B are Hermitian matrices and ${\displaystyle \Vert \cdot \Vert }$ is a unitarily invariant norm, then Script error: No such module "Footnotes".

${\displaystyle \Vert e^{A+B}\Vert \le \Vert e^A{e}^B\Vert .}$

The standard Golden–Thompson inequality is a special case of the above inequality, where the norm is the Frobenius norm.

The general case is provable in the same way, since unitarily invariant norms also satisfy the Cauchy-Schwarz inequality. Script error: No such module "Footnotes".

Indeed, for a slightly more general case, essentially the same proof applies. For each $p\ge 1$, let $\Vert A{\Vert }_p^p:=\mathrm{tr}(A{A}^{*}{)}^{p/2}$ be the Schatten norm.

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Multiple matrices

The inequality has been generalized to three matrices by Script error: No such module "Footnotes". and furthermore to any arbitrary number of Hermitian matrices by Script error: No such module "Footnotes".. A naive attempt at generalization does not work: the inequality

${\displaystyle \mathrm{tr}(e^{A+B+C})\le |\mathrm{tr}(e^A{e}^B{e}^C)|}$

is false. For three matrices, the correct generalization takes the following form:

${\displaystyle \mathrm{tr}{e}^{A+B+C}\le \mathrm{tr}\left(e^A{{𝒯}}_{e^{-B}}{e}^C\right),}$

where the operator ${\displaystyle {{𝒯}}_f}$ is the derivative of the matrix logarithm given by ${\displaystyle {{𝒯}}_f(g)={\displaystyle \underset{0}{\overset{\mathrm{\infty }}{\int }}}\mathrm{d}t(f+t{)}^{-1}g(f+t{)}^{-1}}$. Note that, if ${\displaystyle f}$ and ${\displaystyle g}$ commute, then ${\displaystyle {{𝒯}}_f(g)=g{f}^{-1}}$, and the inequality for three matrices reduces to the original from Golden and Thompson.

Bertram Kostant (1973) used the Kostant convexity theorem to generalize the Golden–Thompson inequality to all compact Lie groups.

References

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