What does this $asymp$ symbol mean? (subject: analytic number theory)

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I'm reading a survey article by Andrew Granville on analytic number theory.

On page 22 of the paper, there appears a strange looking symbol, undefined. I've circled it in red in the screenshot below.

Strange Symbol in analytic number theory

Since it's not defined in the paper, I'm assuming it must be standard notation.

From the context, I'm assuming it means something like "as compared to", or "with reference to", but that's just a guess.

Can anyone identify the symbol, even better explain what it means and/or provide a reference? Is there a name to speak the symbol?

Thanks in advance.

edited Apr 23 '14 at 11:41

asked Apr 22 '14 at 19:24

Assad Ebrahim

621621

add a comment |

up vote
7
down vote

favorite

I'm reading a survey article by Andrew Granville on analytic number theory.

On page 22 of the paper, there appears a strange looking symbol, undefined. I've circled it in red in the screenshot below.

Strange Symbol in analytic number theory

Since it's not defined in the paper, I'm assuming it must be standard notation.

From the context, I'm assuming it means something like "as compared to", or "with reference to", but that's just a guess.

Can anyone identify the symbol, even better explain what it means and/or provide a reference? Is there a name to speak the symbol?

Thanks in advance.

edited Apr 23 '14 at 11:41

asked Apr 22 '14 at 19:24

Assad Ebrahim

621621

add a comment |

up vote
7
down vote

favorite

I'm reading a survey article by Andrew Granville on analytic number theory.

On page 22 of the paper, there appears a strange looking symbol, undefined. I've circled it in red in the screenshot below.

Strange Symbol in analytic number theory

Since it's not defined in the paper, I'm assuming it must be standard notation.

From the context, I'm assuming it means something like "as compared to", or "with reference to", but that's just a guess.

Can anyone identify the symbol, even better explain what it means and/or provide a reference? Is there a name to speak the symbol?

Thanks in advance.

edited Apr 23 '14 at 11:41

asked Apr 22 '14 at 19:24

Assad Ebrahim

621621

I'm reading a survey article by Andrew Granville on analytic number theory.

On page 22 of the paper, there appears a strange looking symbol, undefined. I've circled it in red in the screenshot below.

Strange Symbol in analytic number theory

Since it's not defined in the paper, I'm assuming it must be standard notation.

From the context, I'm assuming it means something like "as compared to", or "with reference to", but that's just a guess.

Can anyone identify the symbol, even better explain what it means and/or provide a reference? Is there a name to speak the symbol?

Thanks in advance.

analysis notation asymptotics analytic-number-theory

edited Apr 23 '14 at 11:41

asked Apr 22 '14 at 19:24

Assad Ebrahim

621621

edited Apr 23 '14 at 11:41

asked Apr 22 '14 at 19:24

Assad Ebrahim

621621

edited Apr 23 '14 at 11:41

asked Apr 22 '14 at 19:24

Assad Ebrahim

621621

asked Apr 22 '14 at 19:24

Assad Ebrahim

621621

asked Apr 22 '14 at 19:24

Assad Ebrahim

621621

add a comment |

2 Answers
2

active

oldest

votes

up vote
5
down vote

accepted

It can mean different things depending on the context. For instance, in Graham, Knuth, and Patashnik's Concrete Mathematics it's defined to mean the same thing as "Big $Theta$" (see p. 448), as in

$$
f asymp g iff exists, C,D>0 : C|g| leq |f| leq D|g|,
$$

but I read a paper recently where it was instead defined to mean the same thing as $sim$ (as defined here).

answered Apr 22 '14 at 19:54

Antonio Vargas

20.6k244111

Yes, I think you're right. Having looked at your LaTeX code, I see the symbol is asymp, and doing a search brings up this useful table on asymptotic notations that confirms your (nicer) expression above. (I'll paste the table into a separate answer below for reference.) Accepting your answer as the correct one. Thanks!
– Assad Ebrahim
Apr 22 '14 at 20:44

1

(+1)... in English: "there exist positive constants C,D such that $f$ can be sandwiched between $g$ scaled appropriately above and below."
– Assad Ebrahim
Apr 22 '14 at 20:56

add a comment |

up vote
4
down vote

Searching further on Antonio Vargas's accepted answer above finds an insightful short paper of A.J. Hildebrand on Asymptotic Notation.

From this the following useful reference table is screenshotted below:

enter image description here

edited yesterday

malin

718620

answered Apr 22 '14 at 20:51

Assad Ebrahim

621621

add a comment |

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2 Answers
2

active

oldest

votes

2 Answers
2

active

oldest

votes

up vote
5
down vote

accepted

It can mean different things depending on the context. For instance, in Graham, Knuth, and Patashnik's Concrete Mathematics it's defined to mean the same thing as "Big $Theta$" (see p. 448), as in

$$
f asymp g iff exists, C,D>0 : C|g| leq |f| leq D|g|,
$$

but I read a paper recently where it was instead defined to mean the same thing as $sim$ (as defined here).

answered Apr 22 '14 at 19:54

Antonio Vargas

20.6k244111

Yes, I think you're right. Having looked at your LaTeX code, I see the symbol is asymp, and doing a search brings up this useful table on asymptotic notations that confirms your (nicer) expression above. (I'll paste the table into a separate answer below for reference.) Accepting your answer as the correct one. Thanks!
– Assad Ebrahim
Apr 22 '14 at 20:44

1

(+1)... in English: "there exist positive constants C,D such that $f$ can be sandwiched between $g$ scaled appropriately above and below."
– Assad Ebrahim
Apr 22 '14 at 20:56

add a comment |

up vote
5
down vote

accepted

It can mean different things depending on the context. For instance, in Graham, Knuth, and Patashnik's Concrete Mathematics it's defined to mean the same thing as "Big $Theta$" (see p. 448), as in

$$
f asymp g iff exists, C,D>0 : C|g| leq |f| leq D|g|,
$$

but I read a paper recently where it was instead defined to mean the same thing as $sim$ (as defined here).

answered Apr 22 '14 at 19:54

Antonio Vargas

20.6k244111

Yes, I think you're right. Having looked at your LaTeX code, I see the symbol is asymp, and doing a search brings up this useful table on asymptotic notations that confirms your (nicer) expression above. (I'll paste the table into a separate answer below for reference.) Accepting your answer as the correct one. Thanks!
– Assad Ebrahim
Apr 22 '14 at 20:44

1

(+1)... in English: "there exist positive constants C,D such that $f$ can be sandwiched between $g$ scaled appropriately above and below."
– Assad Ebrahim
Apr 22 '14 at 20:56

add a comment |

up vote
5
down vote

accepted

It can mean different things depending on the context. For instance, in Graham, Knuth, and Patashnik's Concrete Mathematics it's defined to mean the same thing as "Big $Theta$" (see p. 448), as in

$$
f asymp g iff exists, C,D>0 : C|g| leq |f| leq D|g|,
$$

but I read a paper recently where it was instead defined to mean the same thing as $sim$ (as defined here).

answered Apr 22 '14 at 19:54

Antonio Vargas

20.6k244111

It can mean different things depending on the context. For instance, in Graham, Knuth, and Patashnik's Concrete Mathematics it's defined to mean the same thing as "Big $Theta$" (see p. 448), as in

$$
f asymp g iff exists, C,D>0 : C|g| leq |f| leq D|g|,
$$

but I read a paper recently where it was instead defined to mean the same thing as $sim$ (as defined here).

answered Apr 22 '14 at 19:54

Antonio Vargas

20.6k244111

answered Apr 22 '14 at 19:54

Antonio Vargas

20.6k244111

answered Apr 22 '14 at 19:54

Antonio Vargas

20.6k244111

answered Apr 22 '14 at 19:54

Antonio Vargas

20.6k244111

Yes, I think you're right. Having looked at your LaTeX code, I see the symbol is asymp, and doing a search brings up this useful table on asymptotic notations that confirms your (nicer) expression above. (I'll paste the table into a separate answer below for reference.) Accepting your answer as the correct one. Thanks!
– Assad Ebrahim
Apr 22 '14 at 20:44

1

(+1)... in English: "there exist positive constants C,D such that $f$ can be sandwiched between $g$ scaled appropriately above and below."
– Assad Ebrahim
Apr 22 '14 at 20:56

add a comment |

Yes, I think you're right. Having looked at your LaTeX code, I see the symbol is asymp, and doing a search brings up this useful table on asymptotic notations that confirms your (nicer) expression above. (I'll paste the table into a separate answer below for reference.) Accepting your answer as the correct one. Thanks!
– Assad Ebrahim
Apr 22 '14 at 20:44

1

(+1)... in English: "there exist positive constants C,D such that $f$ can be sandwiched between $g$ scaled appropriately above and below."
– Assad Ebrahim
Apr 22 '14 at 20:56

Yes, I think you're right. Having looked at your LaTeX code, I see the symbol is asymp, and doing a search brings up this useful table on asymptotic notations that confirms your (nicer) expression above. (I'll paste the table into a separate answer below for reference.) Accepting your answer as the correct one. Thanks!
– Assad Ebrahim
Apr 22 '14 at 20:44

(+1)... in English: "there exist positive constants C,D such that $f$ can be sandwiched between $g$ scaled appropriately above and below."
– Assad Ebrahim
Apr 22 '14 at 20:56

add a comment |

up vote
4
down vote

Searching further on Antonio Vargas's accepted answer above finds an insightful short paper of A.J. Hildebrand on Asymptotic Notation.

From this the following useful reference table is screenshotted below:

enter image description here

edited yesterday

malin

718620

answered Apr 22 '14 at 20:51

Assad Ebrahim

621621

add a comment |

up vote
4
down vote

Searching further on Antonio Vargas's accepted answer above finds an insightful short paper of A.J. Hildebrand on Asymptotic Notation.

From this the following useful reference table is screenshotted below:

enter image description here

edited yesterday

malin

718620

answered Apr 22 '14 at 20:51

Assad Ebrahim

621621

add a comment |

up vote
4
down vote

Searching further on Antonio Vargas's accepted answer above finds an insightful short paper of A.J. Hildebrand on Asymptotic Notation.

From this the following useful reference table is screenshotted below:

enter image description here

edited yesterday

malin

718620

answered Apr 22 '14 at 20:51

Assad Ebrahim

621621

Searching further on Antonio Vargas's accepted answer above finds an insightful short paper of A.J. Hildebrand on Asymptotic Notation.

From this the following useful reference table is screenshotted below:

enter image description here

edited yesterday

malin

718620

answered Apr 22 '14 at 20:51

Assad Ebrahim

621621

edited yesterday

malin

718620

edited yesterday

malin

718620

edited yesterday

malin

718620

answered Apr 22 '14 at 20:51

Assad Ebrahim

621621

answered Apr 22 '14 at 20:51

Assad Ebrahim

621621

answered Apr 22 '14 at 20:51

Assad Ebrahim

621621

add a comment |

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