"Talk on 'introduction to conformal field theory(CFT)'"의 두 판 사이의 차이
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imported>Pythagoras0 |
Pythagoras0 (토론 | 기여) |
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| (사용자 2명의 중간 판 5개는 보이지 않습니다) | |||
| 3번째 줄: | 3번째 줄: | ||
* scaling and power law | * scaling and power law | ||
* scale invariance and conformal invariance | * scale invariance and conformal invariance | ||
| − | * critical phenomena | + | * critical phenomena |
** http://scienceon.hani.co.kr/archives/13339 | ** http://scienceon.hani.co.kr/archives/13339 | ||
** http://scienceon.hani.co.kr/archives/13941 | ** http://scienceon.hani.co.kr/archives/13941 | ||
** http://scienceon.hani.co.kr/archives/14664 | ** http://scienceon.hani.co.kr/archives/14664 | ||
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==scale invariacne and power law== | ==scale invariacne and power law== | ||
| − | Scale Invariance of power law functions | + | Scale Invariance of power law functions The function y=xp is "scale-invariant" in the following sense. Consider an interval such as (x,2x), where y changes from xp to 2pxp. Now scale x by a scale factor a. We look at the interval (ax,2ax) where y changes from (ax)p to 2p(ax)p. We see that y in this interval is the same (except for a scale change of ap) as y in the unscaled interval. Most functions do not behave this way. Consider y=exp(x), which goes [from exp(x) to exp(2x)] over the interval (x,2x), and [from exp(ax) to exp(2ax)] in the scaled interval (ax,2ax). There is no scale factor that can be removed from y to make the second interval of y appear the same as the first. The sum of two different powers is usually not scale invariant. However, special cases may still be. y=Ax2 + Bx can be written as A(x+B/2A)2 -B2/4A. If the new variable X=x+B/2A is scaled to aX, then y(aX)=a2Y(X)+(a2-1)(B2/4A). In other words, the function y(x) is scale invariant (with scaling exponent 2) after finding the right scaling variable X and allowing for a scale-dependent shift of y. |
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==critical phenomena== | ==critical phenomena== | ||
| 22번째 줄: | 22번째 줄: | ||
* [[critical phenomena]] | * [[critical phenomena]] | ||
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==correlation at large distance== | ==correlation at large distance== | ||
| 30번째 줄: | 30번째 줄: | ||
* [[universality class and critical exponent]] | * [[universality class and critical exponent]] | ||
* appearance of correlations at large distance, a situation that is encountered in second order phase transitions, near the critical temperature. | * appearance of correlations at large distance, a situation that is encountered in second order phase transitions, near the critical temperature. | ||
| − | * the critical exponent describes the behavior of physical quantities around the critical temperature | + | * the critical exponent describes the behavior of physical quantities around the critical temperature e.g. magnetization |
| − | :<math>M\sim (T_C-T)^{1/8}</math | + | :<math>M\sim (T_C-T)^{1/8}</math> |
| − | * magnetization and susceptibility can be written | + | * magnetization and susceptibility can be written as '''correlation functions''' |
| − | * large distance behavior of spin at | + | * large distance behavior of spin at criticality <math>\eta=1/4</math> |
| − | :<math>\langle \sigma_{i}\sigma_{i+n}\rangle =\frac{1}{|n|^{\eta}}</math | + | :<math>\langle \sigma_{i}\sigma_{i+n}\rangle =\frac{1}{|n|^{\eta}}</math> |
| − | * correlation length critivel | + | * correlation length critivel exponent <math>\nu=1</math> |
| − | :<math>\langle \epsilon_{i}\epsilon_{i+n}\rangle=\frac{1}{|n|^{4-\frac{2}{\nu}}}</math | + | :<math>\langle \epsilon_{i}\epsilon_{i+n}\rangle=\frac{1}{|n|^{4-\frac{2}{\nu}}}</math> |
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==conformal transformations== | ==conformal transformations== | ||
| − | * roughly, local dilations | + | * roughly, local dilations |
** this is also equivalent to local scale invariance | ** this is also equivalent to local scale invariance | ||
* correlation functions do not change under conformal transformations | * correlation functions do not change under conformal transformations | ||
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==related items== | ==related items== | ||
| 68번째 줄: | 60번째 줄: | ||
[[분류:개인노트]] | [[분류:개인노트]] | ||
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[[분류:talks and lecture notes]] | [[분류:talks and lecture notes]] | ||
| + | [[분류:migrate]] | ||
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| + | ==메타데이터== | ||
| + | ===위키데이터=== | ||
| + | * ID : [https://www.wikidata.org/wiki/Q849798 Q849798] | ||
| + | ===Spacy 패턴 목록=== | ||
| + | * [{'LOWER': 'knot'}, {'LEMMA': 'theory'}] | ||
2021년 2월 17일 (수) 03:00 기준 최신판
introduction
- scaling and power law
- scale invariance and conformal invariance
- critical phenomena
scale invariacne and power law
Scale Invariance of power law functions The function y=xp is "scale-invariant" in the following sense. Consider an interval such as (x,2x), where y changes from xp to 2pxp. Now scale x by a scale factor a. We look at the interval (ax,2ax) where y changes from (ax)p to 2p(ax)p. We see that y in this interval is the same (except for a scale change of ap) as y in the unscaled interval. Most functions do not behave this way. Consider y=exp(x), which goes [from exp(x) to exp(2x)] over the interval (x,2x), and [from exp(ax) to exp(2ax)] in the scaled interval (ax,2ax). There is no scale factor that can be removed from y to make the second interval of y appear the same as the first. The sum of two different powers is usually not scale invariant. However, special cases may still be. y=Ax2 + Bx can be written as A(x+B/2A)2 -B2/4A. If the new variable X=x+B/2A is scaled to aX, then y(aX)=a2Y(X)+(a2-1)(B2/4A). In other words, the function y(x) is scale invariant (with scaling exponent 2) after finding the right scaling variable X and allowing for a scale-dependent shift of y.
critical phenomena
correlation at large distance
- universality class and critical exponent
- appearance of correlations at large distance, a situation that is encountered in second order phase transitions, near the critical temperature.
- the critical exponent describes the behavior of physical quantities around the critical temperature e.g. magnetization
\[M\sim (T_C-T)^{1/8}\]
- magnetization and susceptibility can be written as correlation functions
- large distance behavior of spin at criticality \(\eta=1/4\)
\[\langle \sigma_{i}\sigma_{i+n}\rangle =\frac{1}{|n|^{\eta}}\]
- correlation length critivel exponent \(\nu=1\)
\[\langle \epsilon_{i}\epsilon_{i+n}\rangle=\frac{1}{|n|^{4-\frac{2}{\nu}}}\]
conformal transformations
- roughly, local dilations
- this is also equivalent to local scale invariance
- correlation functions do not change under conformal transformations
expositions
메타데이터
위키데이터
- ID : Q849798
Spacy 패턴 목록
- [{'LOWER': 'knot'}, {'LEMMA': 'theory'}]