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Andreas Thom
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DoesIs it true that for every group $G$ and $f\in C[G]$$f\in \mathbb C[G]$ it holds that $dim(C[G]*f)\mathop{supp}(f)\geq |G|$? Where$$\dim(\mathbb C[G]*f)\mathop{supp}(f)\geq |G| ?$$

Here, $C[G]$$\mathbb C[G]$ is the group algebra, and by $C[G]*f$$\mathbb C[G]*f$ I mean left ideal of the group algebra $C[G]$$\mathbb C[G]$ generated by $f$.

Essentially this is uncertainty principle for non-commutative groups. Since $supp \hat {f} = dim C[G]*f$ in case $G$ is abelian.

Does it true that for every group $G$ and $f\in C[G]$ it holds that $dim(C[G]*f)\mathop{supp}(f)\geq |G|$? Where $C[G]$ is the group algebra, and by $C[G]*f$ I mean left ideal of the group algebra $C[G]$ generated by $f$.

Essentially this is uncertainty principle for non-commutative groups. Since $supp \hat {f} = dim C[G]*f$.

Is it true that for every group $G$ and $f\in \mathbb C[G]$ it holds that $$\dim(\mathbb C[G]*f)\mathop{supp}(f)\geq |G| ?$$

Here, $\mathbb C[G]$ is the group algebra, and by $\mathbb C[G]*f$ I mean left ideal of the group algebra $\mathbb C[G]$ generated by $f$.

Essentially this is uncertainty principle for non-commutative groups. Since $supp \hat {f} = dim C[G]*f$ in case $G$ is abelian.

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Yemon Choi
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Uncertainty principle for non-comutativecommutative groups

Does it true that for every group $G$ and $f\in C[G]$ it holds that $dim(C[G]*f)supp(f)\geq |G|$$dim(C[G]*f)\mathop{supp}(f)\geq |G|$? Where, $C[G]$ is athe group algebra, and by $C[G]*f$ I mean left ideal of the group algebra $C[G]$ generated by $f$.

Essentially this is uncertainty principle for non-commutative groups. Since $supp \hat {f} = dim C[G]*f$.

Uncertainty principle for non-comutative groups

Does it true that for every group $G$ and $f\in C[G]$ it holds that $dim(C[G]*f)supp(f)\geq |G|$? Where, $C[G]$ is a group algebra, by $C[G]*f$ I mean left ideal of the group algebra $C[G]$ generated by $f$.

Essentially this is uncertainty principle for non-commutative groups. Since $supp \hat {f} = dim C[G]*f$.

Uncertainty principle for non-commutative groups

Does it true that for every group $G$ and $f\in C[G]$ it holds that $dim(C[G]*f)\mathop{supp}(f)\geq |G|$? Where $C[G]$ is the group algebra, and by $C[G]*f$ I mean left ideal of the group algebra $C[G]$ generated by $f$.

Essentially this is uncertainty principle for non-commutative groups. Since $supp \hat {f} = dim C[G]*f$.

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Klim Efremenko
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Does it true that for every group $G$ and $f\in C[G]$ it holds that $dim(C[G]*f)supp(f)\geq |G|$? Where, $C[G]$ is a group algebra, by $C[G]*f$ I mean left ideal of the group algebra $C[G]$ generated by $f$.

Essentially this is uncertainty principle for non-commutative groups. Since $supp \hat {f} = dim C[G]*f$.

Does it true that for every group $G$ and $f\in C[G]$ it holds that $dim(C[G]*f)supp(f)\geq |G|$?

Essentially this is uncertainty principle for non-commutative groups. Since $supp \hat {f} = dim C[G]*f$.

Does it true that for every group $G$ and $f\in C[G]$ it holds that $dim(C[G]*f)supp(f)\geq |G|$? Where, $C[G]$ is a group algebra, by $C[G]*f$ I mean left ideal of the group algebra $C[G]$ generated by $f$.

Essentially this is uncertainty principle for non-commutative groups. Since $supp \hat {f} = dim C[G]*f$.

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Klim Efremenko
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