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第135行: + + 第140行:
第142行: − + − + 第152行:
第154行: − 埃伦费斯特分类法隐含了连续的相变,其中材料的成键特征发生了变化,但任何自由能导数都没有间断。比如说超临界液气的边界。+ 第158行:
第160行: − + 第170行:
第172行: − 一阶相变是那些涉及潜伏热的相变。在这种相变过程中,系统会吸收或释放每体积固定(通常是大量)的能量。在此过程中,系统的温度将随着热量的增加而保持恒定:系统处于“混合相状态”,其中系统的某些部分已完成转变,而其他部分尚未完成。常见的例子是冰的融化或水的沸腾(水不会立即变成蒸气,而是形成液态水和蒸气气泡的湍流混合物)。物理学家Imry和Wortis研究表明,淬火无序可以视为一阶转变。即在有限的温度范围内完成了相的转变,但是诸如过冷和过热的现象仍然存在,并且在热循环中观察到了滞后。+ 第240行:
第242行: − 相变通常涉及到对称破坏。例如,将流体冷却至结晶固体会破坏其连续的平移对称性:流体中的每个点都具有相同的属性,但是晶体中的每个点都不具有相同的属性(除非这些点是从晶格点阵的晶格点中选择的)。通常,由于自发对称性破缺,除了某些偶然的对称性(例如,重虚粒子的形成,其仅在低温下发生)外,高温相比低温相具有更多的对称性。+ 第250行:
第252行: − 序参数是相变系统中跨边界的有序/无序度量;它通常在一个为零的阶段(通常在临界点以上)与另一个非零阶段之间。在临界点,序参数的敏感性通常会发散。+ 第274行:
第276行: − 某些相变,例如超导和铁磁,可以具有超过一个自由度的多个序参数。在这样的阶段中,序参数可以采用复数,向量甚至张量的形式,其大小在相变时会变为零。+ 第292行:
第294行: − 对称破坏性的相变在宇宙学中起着重要作用。随着宇宙的膨胀和冷却,真空经历了一系列对称破坏的相变。例如,电弱过渡将电弱场的SU(2)×U(1)对称性破坏为当今电磁场的U(1)对称性。这种转变对于理解当今宇宙中物质与反物质之间的不对称性很重要(请参阅弱电重子生成)。+ 第327行:
第329行: − − :<math> C \propto |T_c - T|^{-\alpha}.</math> − − 数学 c propto | tc-t | ^ {- alpha } . / math − 第355行:
第352行: − 之前普遍认为,临界指数在临界温度上下浮动的时候都是相同的。但是现已证明其不一定正确:因不相关的各向异性(在重整化群理论意义上)将连续对称属性清晰地分解为离散对称属性时,则某些指数(例如γ,磁化率指数)不相同。+ 第379行:
第376行: − 当然也存在一些模型系统不遵循幂律行为。例如,平均场理论预测了相变温度下热容量的有限不连续性,而二维伊辛模型则具有对数发散。但是,这些系统存在有限,是规则的例外。实际的相变仍然表现出幂律行为。+
无编辑摘要
有时可以通过传热方式(注意不是绝热方式)改变系统状态,使系统状态可以通过相变点而不会经历相变。因此该系统会处于亚稳态,是指比较于相变发生过后的状态没有那么稳定,但也不是说不稳定。
有时可以通过传热方式(注意不是绝热方式)改变系统状态,使系统状态可以通过相变点而不会经历相变。因此该系统会处于亚稳态,是指比较于相变发生过后的状态没有那么稳定,但也不是说不稳定。
== Classifications 分类==
== Classifications 分类==
=== Ehrenfest classification 埃伦费斯特分类法 ===
=== Ehrenfest classification 埃伦费斯特分类法 ===
[[Paul Ehrenfest]] classified phase transitions based on the behavior of the [[thermodynamic free energy]] as a function of other thermodynamic variables.<ref name="ReferenceA">{{cite journal|last1=Jaeger|first1=Gregg|title=The Ehrenfest Classification of Phase Transitions: Introduction and Evolution|journal=Archive for History of Exact Sciences|date=1 May 1998|volume=53|issue=1|pages=51–81|doi=10.1007/s004070050021}}</ref> Under this scheme, phase transitions were labeled by the lowest derivative of the free energy that is discontinuous at the transition. ''First-order phase transitions'' exhibit a discontinuity in the first derivative of the free energy with respect to some thermodynamic variable.<ref name = Blundell>{{Cite book | last = Blundell | first = Stephen J. |author2=Katherine M. Blundell | title = Concepts in Thermal Physics | publisher = Oxford University Press | year = 2008 | isbn = 978-0-19-856770-7}}</ref> The various solid/liquid/gas transitions are classified as first-order transitions because they involve a discontinuous change in density, which is the (inverse of the) first derivative of the free energy with respect to pressure. ''Second-order phase transitions'' are continuous in the first derivative (the [[Phase transition#order parameters|order parameter]], which is the first derivative of the free energy with respect to the external field, is continuous across the transition) but exhibit discontinuity in a second derivative of the free energy.<ref name = Blundell/> These include the ferromagnetic phase transition in materials such as iron, where the [[magnetization]], which is the first derivative of the free energy with respect to the applied magnetic field strength, increases continuously from zero as the temperature is lowered below the [[Curie temperature]]. The [[magnetic susceptibility]], the second derivative of the free energy with the field, changes discontinuously. Under the Ehrenfest classification scheme, there could in principle be third, fourth, and higher-order phase transitions.
[[Paul Ehrenfest]] classified phase transitions based on the behavior of the [[thermodynamic free energy]] as a function of other thermodynamic variables. Under this scheme, phase transitions were labeled by the lowest derivative of the free energy that is discontinuous at the transition. ''First-order phase transitions'' exhibit a discontinuity in the first derivative of the free energy with respect to some thermodynamic variable. The various solid/liquid/gas transitions are classified as first-order transitions because they involve a discontinuous change in density, which is the (inverse of the) first derivative of the free energy with respect to pressure. ''Second-order phase transitions'' are continuous in the first derivative (the [[Phase transition#order parameters|order parameter]], which is the first derivative of the free energy with respect to the external field, is continuous across the transition) but exhibit discontinuity in a second derivative of the free energy. These include the ferromagnetic phase transition in materials such as iron, where the [[magnetization]], which is the first derivative of the free energy with respect to the applied magnetic field strength, increases continuously from zero as the temperature is lowered below the [[Curie temperature]]. The [[magnetic susceptibility]], the second derivative of the free energy with the field, changes discontinuously. Under the Ehrenfest classification scheme, there could in principle be third, fourth, and higher-order phase transitions.
Paul Ehrenfest classified phase transitions based on the behavior of the thermodynamic free energy as a function of other thermodynamic variables. Under this scheme, phase transitions were labeled by the lowest derivative of the free energy that is discontinuous at the transition. First-order phase transitions exhibit a discontinuity in the first derivative of the free energy with respect to some thermodynamic variable. The various solid/liquid/gas transitions are classified as first-order transitions because they involve a discontinuous change in density, which is the (inverse of the) first derivative of the free energy with respect to pressure. Second-order phase transitions are continuous in the first derivative (the order parameter, which is the first derivative of the free energy with respect to the external field, is continuous across the transition) but exhibit discontinuity in a second derivative of the free energy. These include the ferromagnetic phase transition in materials such as iron, where the magnetization, which is the first derivative of the free energy with respect to the applied magnetic field strength, increases continuously from zero as the temperature is lowered below the Curie temperature. The magnetic susceptibility, the second derivative of the free energy with the field, changes discontinuously. Under the Ehrenfest classification scheme, there could in principle be third, fourth, and higher-order phase transitions.
Paul Ehrenfest classified phase transitions based on the behavior of the thermodynamic free energy as a function of other thermodynamic variables. Under this scheme, phase transitions were labeled by the lowest derivative of the free energy that is discontinuous at the transition. First-order phase transitions exhibit a discontinuity in the first derivative of the free energy with respect to some thermodynamic variable. The various solid/liquid/gas transitions are classified as first-order transitions because they involve a discontinuous change in density, which is the (inverse of the) first derivative of the free energy with respect to pressure. Second-order phase transitions are continuous in the first derivative (the order parameter, which is the first derivative of the free energy with respect to the external field, is continuous across the transition) but exhibit discontinuity in a second derivative of the free energy. These include the ferromagnetic phase transition in materials such as iron, where the magnetization, which is the first derivative of the free energy with respect to the applied magnetic field strength, increases continuously from zero as the temperature is lowered below the Curie temperature. The magnetic susceptibility, the second derivative of the free energy with the field, changes discontinuously. Under the Ehrenfest classification scheme, there could in principle be third, fourth, and higher-order phase transitions.
保罗·埃伦费斯特Paul Ehrenfest根据热力学自由能与其他热力学变量的函数关系对相变进行了分类。根据他的方法,可以将相变按照转变时的不连续自由能的最低导数标记。一阶相变相对于某些热力学变量,表现出自由能的一阶导数不连续。各种固/液/气的转变都归为一阶转变,因为它们都涉及到密度的不连续变化,这是自由能相对于压力的一阶导数(一阶导数的逆函数)。而二阶相变在一阶导数中是连续的(有序参数,即自由能相对于外部场的一阶导数,在整个转变过程中是连续的),但在自由能的二阶导数中表现出不连续性。比如包括铁等材料中的铁磁相变,其中磁化强度是自由能相对于施加磁场强度的一阶导数,随着温度降低到居里温度以下,磁化强度将从零开始连续增加。而磁化率,是自由能相对于磁场的二阶导数,它的变化则是不连续的。以此类推,按照埃伦费斯特的分类方法,原则上可以存在第三,第四和更高阶的相变。
保罗·埃伦费斯特Paul Ehrenfest根据热力学自由能与其他热力学变量的函数关系对相变进行了分类。根据他的方法,可以将相变按照转变时的不连续自由能的最低导数标记。一阶相变相对于某些热力学变量,表现出自由能的一阶导数不连续。各种固/液/气的转变都归为一阶相变First-order phase transitions,因为它们都涉及到密度的不连续变化,这是自由能相对于压力的一阶导数(一阶导数的逆函数)。而二阶相变Second-order phase transitions在一阶导数中是连续的(有序参数,即自由能相对于外部场的一阶导数,在整个转变过程中是连续的),但在自由能的二阶导数中表现出不连续性。比如包括铁等材料中的铁磁相变,其中磁化强度是自由能相对于施加磁场强度的一阶导数,随着温度降低到居里温度以下,磁化强度将从零开始连续增加。而磁化率,是自由能相对于磁场的二阶导数,它的变化则是不连续的。以此类推,按照埃伦费斯特的分类方法,原则上可以存在第三,第四和更高阶的相变。
The Ehrenfest classification implicitly allows for continuous phase transformations, where the bonding character of a material changes, but there is no discontinuity in any free energy derivative. An example of this occurs at the supercritical liquid–gas boundaries.
The Ehrenfest classification implicitly allows for continuous phase transformations, where the bonding character of a material changes, but there is no discontinuity in any free energy derivative. An example of this occurs at the supercritical liquid–gas boundaries.
埃伦费斯特分类法Ehrenfest classification隐含了连续的相变,其中材料的成键特征发生了变化,但任何自由能导数都没有间断。比如说超临界液气的边界。
=== Modern classifications 现代分类法 ===
=== Modern classifications 现代分类法 ===
In the modern classification scheme, phase transitions are divided into two broad categories, named similarly to the Ehrenfest classes:<ref name="ReferenceA"/>
In the modern classification scheme, phase transitions are divided into two broad categories, named similarly to the Ehrenfest classes:
In the modern classification scheme, phase transitions are divided into two broad categories, named similarly to the Ehrenfest classes:
In the modern classification scheme, phase transitions are divided into two broad categories, named similarly to the Ehrenfest classes:
First-order phase transitions are those that involve a latent heat. During such a transition, a system either absorbs or releases a fixed (and typically large) amount of energy per volume. During this process, the temperature of the system will stay constant as heat is added: the system is in a "mixed-phase regime" in which some parts of the system have completed the transition and others have not. Familiar examples are the melting of ice or the boiling of water (the water does not instantly turn into vapor, but forms a turbulent mixture of liquid water and vapor bubbles). Imry and Wortis showed that quenched disorder can broaden a first-order transition. That is, the transformation is completed over a finite range of temperatures, but phenomena like supercooling and superheating survive and hysteresis is observed on thermal cycling.
First-order phase transitions are those that involve a latent heat. During such a transition, a system either absorbs or releases a fixed (and typically large) amount of energy per volume. During this process, the temperature of the system will stay constant as heat is added: the system is in a "mixed-phase regime" in which some parts of the system have completed the transition and others have not. Familiar examples are the melting of ice or the boiling of water (the water does not instantly turn into vapor, but forms a turbulent mixture of liquid water and vapor bubbles). Imry and Wortis showed that quenched disorder can broaden a first-order transition. That is, the transformation is completed over a finite range of temperatures, but phenomena like supercooling and superheating survive and hysteresis is observed on thermal cycling.
一阶相变是那些涉及潜伏热的相变。在这种相变过程中,系统会吸收或释放每体积固定(通常是大量)的能量。在此过程中,系统的温度将随着热量的增加而保持恒定:系统处于“混合相状态”,其中系统的某些部分已完成转变,而其他部分尚未完成。常见的例子是冰的融化或水的沸腾(水不会立即变成蒸气,而是形成液态水和蒸气气泡的湍流混合物)。物理学家Imry和Wortis研究表明,淬火无序Quenched disorder可以视为一阶转变。即在有限的温度范围内完成了相的转变,但是诸如过冷和过热的现象仍然存在,并且在热循环中观察到了滞后。
Phase transitions often involve a symmetry breaking process. For instance, the cooling of a fluid into a crystalline solid breaks continuous translation symmetry: each point in the fluid has the same properties, but each point in a crystal does not have the same properties (unless the points are chosen from the lattice points of the crystal lattice). Typically, the high-temperature phase contains more symmetries than the low-temperature phase due to spontaneous symmetry breaking, with the exception of certain accidental symmetries (e.g. the formation of heavy virtual particles, which only occurs at low temperatures).
Phase transitions often involve a symmetry breaking process. For instance, the cooling of a fluid into a crystalline solid breaks continuous translation symmetry: each point in the fluid has the same properties, but each point in a crystal does not have the same properties (unless the points are chosen from the lattice points of the crystal lattice). Typically, the high-temperature phase contains more symmetries than the low-temperature phase due to spontaneous symmetry breaking, with the exception of certain accidental symmetries (e.g. the formation of heavy virtual particles, which only occurs at low temperatures).
相变通常涉及到对称破坏。例如,将流体冷却至结晶固体会破坏其连续的平移对称性:流体中的每个点都具有相同的属性,但是晶体中的每个点都不具有相同的属性(除非这些点是从晶格点阵的晶格点中选择的)。通常,由于自发对称性破缺Spontaneous symmetry breaking,除了某些偶然的对称性(例如,重虚粒子Virtual particles的形成,其仅在低温下发生)外,高温相比低温相具有更多的对称性。
An order parameter is a measure of the degree of order across the boundaries in a phase transition system; it normally ranges between zero in one phase (usually above the critical point) and nonzero in the other. At the critical point, the order parameter susceptibility will usually diverge.
An order parameter is a measure of the degree of order across the boundaries in a phase transition system; it normally ranges between zero in one phase (usually above the critical point) and nonzero in the other. At the critical point, the order parameter susceptibility will usually diverge.
序参数Order parameter是相变系统中跨边界的有序/无序度量;它通常在一个为零的阶段(通常在临界点以上)与另一个非零阶段之间。在临界点,序参数的敏感性通常会发散。
Some phase transitions, such as superconducting and ferromagnetic, can have order parameters for more than one degree of freedom. In such phases, the order parameter may take the form of a complex number, a vector, or even a tensor, the magnitude of which goes to zero at the phase transition.
Some phase transitions, such as superconducting and ferromagnetic, can have order parameters for more than one degree of freedom. In such phases, the order parameter may take the form of a complex number, a vector, or even a tensor, the magnitude of which goes to zero at the phase transition.
某些相变,例如超导Superconducting和铁磁,可以具有超过一个自由度的多个序参数。在这样的阶段中,序参数可以采用复数,向量甚至张量的形式,其大小在相变时会变为零。
Symmetry-breaking phase transitions play an important role in cosmology. As the universe expanded and cooled, the vacuum underwent a series of symmetry-breaking phase transitions. For example, the electroweak transition broke the SU(2)×U(1) symmetry of the electroweak field into the U(1) symmetry of the present-day electromagnetic field. This transition is important to understanding the asymmetry between the amount of matter and antimatter in the present-day universe (see electroweak baryogenesis).
Symmetry-breaking phase transitions play an important role in cosmology. As the universe expanded and cooled, the vacuum underwent a series of symmetry-breaking phase transitions. For example, the electroweak transition broke the SU(2)×U(1) symmetry of the electroweak field into the U(1) symmetry of the present-day electromagnetic field. This transition is important to understanding the asymmetry between the amount of matter and antimatter in the present-day universe (see electroweak baryogenesis).
对称破坏性的相变在宇宙学中起着重要作用。随着宇宙的膨胀和冷却,真空经历了一系列对称破坏的相变。例如,电弱过渡将电弱场的''SU(2)×U(1)''对称性破坏为当今电磁场的''U(1)''对称性。这种转变对于理解当今宇宙中物质与反物质之间的不对称性很重要(请参阅弱电重子生成Electroweak baryogenesis)。
事实证明,连续相变可以通过称为临界指数的参数来表征。其中最重要的一个参数也许是通过描述逼近相变时热相关长度差异的指数来表示。例如,让我们检测接近发生相变时的热容行为。我们在保持所有其他热力学变量不变的情况下,改变系统的温度T,发现相变发生在某个临界温度Tc处。当T接近Tc时,热容C通常具有幂律行为:
事实证明,连续相变可以通过称为临界指数的参数来表征。其中最重要的一个参数也许是通过描述逼近相变时热相关长度差异的指数来表示。例如,让我们检测接近发生相变时的热容行为。我们在保持所有其他热力学变量不变的情况下,改变系统的温度T,发现相变发生在某个临界温度Tc处。当T接近Tc时,热容C通常具有幂律行为:
<math> C \propto |T_c - T|^{-\alpha}.</math>
<math> C \propto |T_c - T|^{-\alpha}.</math>
The heat capacity of amorphous materials has such a behaviour near the glass transition temperature where the universal critical exponent α = 0.59 A similar behavior, but with the exponent {{mvar|ν}} instead of {{mvar|α}}, applies for the correlation length.
The heat capacity of amorphous materials has such a behaviour near the glass transition temperature where the universal critical exponent α = 0.59 A similar behavior, but with the exponent {{mvar|ν}} instead of {{mvar|α}}, applies for the correlation length.
It is widely believed that the critical exponents are the same above and below the critical temperature. It has now been shown that this is not necessarily true: When a continuous symmetry is explicitly broken down to a discrete symmetry by irrelevant (in the renormalization group sense) anisotropies, then some exponents (such as <math>\gamma </math>, the exponent of the susceptibility) are not identical.
It is widely believed that the critical exponents are the same above and below the critical temperature. It has now been shown that this is not necessarily true: When a continuous symmetry is explicitly broken down to a discrete symmetry by irrelevant (in the renormalization group sense) anisotropies, then some exponents (such as <math>\gamma </math>, the exponent of the susceptibility) are not identical.
之前普遍认为,临界指数在临界温度上下浮动的时候都是相同的。但是现已证明其不一定正确:因不相关的各向异性(在重整化群理论意义上)将连续对称属性清晰地分解为离散对称属性时,则某些指数(例如γ,磁化率指数Exponent of the susceptibility)不相同。
Some model systems do not obey a power-law behavior. For example, mean field theory predicts a finite discontinuity of the heat capacity at the transition temperature, and the two-dimensional Ising model has a logarithmic divergence. However, these systems are limiting cases and an exception to the rule. Real phase transitions exhibit power-law behavior.
Some model systems do not obey a power-law behavior. For example, mean field theory predicts a finite discontinuity of the heat capacity at the transition temperature, and the two-dimensional Ising model has a logarithmic divergence. However, these systems are limiting cases and an exception to the rule. Real phase transitions exhibit power-law behavior.
当然也存在一些模型系统不遵循幂律行为。例如,平均场理论预测了相变温度下热容量的有限不连续性,而二维伊辛模型Ising model则具有对数发散。但是,这些系统存在有限,是规则的例外。实际的相变仍然表现出幂律行为。