Internal energy: Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>Paul Wormer
mNo edit summary
 
(13 intermediate revisions by 2 users not shown)
Line 1: Line 1:
{{subpages}}
{{subpages}}
In  [[thermodynamics]], a ''system'' is any object, any quantity of matter, any region, etc. selected for study and mentally set apart from everything else which is then called its surroundings. The imaginary envelope enclosing the system and separating it from its surroundings is called the boundary of the system.<ref> ''Perry's Handbook for Chemical Engineers'', R. H. Perry and D. W. Green (editors), McGraw-Hill Companies, 6th ed. (1984)  ISBN-10: 0070494797;  ISBN-13: 978-0070494794
In  [[thermodynamics]], a ''[[physical system|system]]'' is any object, any quantity of matter, any region, etc. selected for study and mentally set apart from everything else which is then called its surroundings. The imaginary envelope enclosing the system and separating it from its surroundings is called the boundary of the system.<ref> ''Perry's Handbook for Chemical Engineers'', R. H. Perry and D. W. Green (editors), McGraw-Hill Companies, 6th ed. (1984)  ISBN-10: 0070494797;  ISBN-13: 978-0070494794
</ref> In this article the boundaries will be referred to as the ''walls'' of the system.   
</ref> In this article the boundaries will be referred to as the ''walls'' of the system.   


The '''internal energy''' of a system is simply its [[energy]]. The adjective "internal" refers to the fact that some energy contributions are not considered. For instance, when the total system is in uniform motion, it has [[kinetic energy]]. This overall kinetic energy is never seen as part of the internal energy; one could call it ''external energy''. Or, if the system is at constant non-zero height above the surface the Earth, it has constant [[potential energy]] in the [[gravitation| gravitational field]] of the Earth. Gravitational energy is only taken into account when it plays a role in the phenomenon of interest, for instance in a [[colloid|colloidal suspension]], where the gravitation influences the up- downward motion of the small particles comprising the colloid. In all other cases, gravitational energy is assumed not to contribute to the internal energy; one may call it again external energy.  
The '''internal energy''' of a system is simply its [[energy]]. The term was introduced into thermodynamics in 1852 by W. Thomson (the later Lord Kelvin).<ref>W. Thomson, ''On a Universal Tendency in Nature to the Dissipation of Mechanical Energy'', The Proceedings of the Royal Society of Edinburgh for April 19, 1852. [http://visualiseur.bnf.fr/CadresFenetre?O=NUMM-95118&I=528&M=tdm Scanned copy of Kelvin's collected works] </ref>  The adjective "internal" refers to the fact that some energy contributions are not considered. For instance, when the total system is in uniform motion, it has [[kinetic energy]]. This overall kinetic energy is never seen as part of the internal energy; one could call it ''external energy''. Or, if the system is at a constant non-zero height above the surface of the Earth, it has constant [[potential energy]] in the [[gravitation| gravitational field]] of the Earth. Gravitational energy is only taken into account when it plays a role in the phenomenon of interest, for instance in a [[colloid|colloidal suspension]], where the gravitation influences the up- downward motion of the small particles comprising the colloid. In all other cases, gravitational energy is assumed not to contribute to the internal energy; one may call it again external energy.  


On the other hand, a contribution to the internal energy that is ''always'' included is the kinetic energy of the atoms or molecules constituting the system. In an atomic gas, it is the energy associated with translations of the atoms, while in a molecular gas molecular rotations contribute to the internal energy as well. In a solid, the internal energy acquires contributions from vibrations, among other effects. Except for [[ideal gas law|ideal gases]], the averaged [[potential energy]]  of molecules in the field of the other molecules (see [[intermolecular forces]]) is also an important component of the internal energy.
On the other hand, a contribution to internal energy that is ''always'' included is the kinetic energy of the atoms or molecules constituting the system. In a monatomic gas, it is the energy associated with [[translation]]s of the [[atom]]s; in a molecular gas, translations and [[rigid rotor|molecular rotations]] both contribute to kinetic energy and therefore to internal energy. In a solid, internal energy acquires contributions from [[vibration]]s, among other effects. Except for [[ideal gas law|ideal gases]], the [[potential energy]]  of individual molecules in the field of the other molecules (see [[intermolecular forces]]) is also an important component of the internal energy.


In general, the energies that are not changing in the processes of interest are left out of the definition of internal energy. For instance, when a system consists of a vessel filled with water and the process of interest is evaporation (formation of steam),  the kinetic energy of the water molecules and the interaction between them are included in the internal energy. As long as no chemical bonds are broken, the energies contained in these bonds are not included. If the temperatures are not too high, say below 200 to 300 °C, the intramolecular vibrational energies are ignored as well.  Chemists and engineers never include relativistic contributions, of the type ''E = mc''<sup>2</sup>, or nuclear contributions (say the fusion energy of protons with oxygen-nuclei). However, a plasma physicist studying the thermodynamics of fusion reactions will include nuclear energy in the internal energy of a [[plasma]].
In general, energies that are not changing in the processes of interest are left out of the definition of internal energy. For instance, when a system consists of a vessel filled with water and the process of interest is evaporation (formation of steam),  the kinetic energy of the water molecules and the interaction between them are included in the internal energy. As long as no chemical bonds are broken, the energies contained in these bonds are not included. If the temperatures are not too high, say below 200 to 300 °C, the intramolecular vibrational energies are ignored as well.  Chemists and engineers never include relativistic contributions, of the type ''E = mc''<sup>2</sup>, or nuclear contributions (say the fusion energy of protons with oxygen-nuclei). However, a plasma physicist studying the thermodynamics of fusion reactions will include nuclear energy in the internal energy of the [[plasma]].


==First law of thermodynamics==
==First law of thermodynamics==
Line 16: Line 16:
dU =  DQ \,
dU =  DQ \,
</math>
</math>
By convention ''DQ'' is the heat absorbed by the system, i.e.,  the heat it receives from its surroundings.  The symbol ''dU'' indicates a [[differential]] of the differentiable function ''U''.  
Reiterating, the usual sign convention is such that positive ''DQ'' is the heat absorbed by the system, i.e.,  the heat that the system receives from its surroundings.  The symbol ''dU'' indicates a [[differential]] of the differentiable function ''U''.  


Most thermodynamic systems are such that work can be performed ''on'' them or ''by'' them. When a small amount of work ''DW''  is performed ''by'' the system, the internal energy decreases,
Most thermodynamic systems are such that work can be performed ''on'' them or ''by'' them. When a small amount of work ''DW''  is performed ''by'' the system, the internal energy decreases,
Line 22: Line 22:
dU = -DW\,  
dU = -DW\,  
</math>  
</math>  
By convention ''DW'' is the work ''by'' the system on its surroundings, which gives the minus sign in this equation.  
The sign convention is such that ''DW'' is the work ''by'' the system on its surroundings, hence the minus sign in this equation.  


As an example of work, we consider as a system a volume ''V'' containing gas of [[pressure]] ''p''. A small amount of work ''pdV'' is performed ''on'' the system by reversibly (quasi-statically) compressing the gas (''dV'' < 0). The sign convention of ''DW'' is such that ''DW'' and ''dV'' have the same sign
As an example of work, consider a cylinder of  volume ''V'' that may be changed by moving a piston in or out. The cylinder contains gas of [[pressure]] ''p''. A small amount of work ''pdV'' is performed ''on'' the system by reversibly (quasi-statically) moving the piston inward (''dV'' < 0). The sign convention of ''DW'' is such that ''DW'' and ''dV'' have the same sign
:<math>
:<math>
DW = p dV \, \quad dV < 0, \quad DW < 0
DW = p dV \, \quad dV < 0, \quad DW < 0
Line 32: Line 32:
dU =  -D W  = -pdV \,
dU =  -D W  = -pdV \,
</math>
</math>
Note that other forms of work than ''pdV'' are possible. For instance, ''DW'' = &minus;''HdM'', the product of an external [[magnetic field]] ''H'' with a small change in molar [[magnetization]] ''dM'', is a change in internal energy caused by an alignment of the microscopic  magnetic moments that constitute a  magnetizable material.  
Note that other forms of work than ''pdV'' are possible. For instance, ''DW'' = &minus;''HdM'', the product of an external [[magnetic field]] ''H'' with a small change in total [[magnetization]] ''dM'', is a change in internal energy caused by an alignment of the microscopic  magnetic moments that constitute a  magnetizable material.  


An important form of doing work is the reversible addition of substance,
An important form of doing work is the reversible addition of substance,
Line 44: Line 44:
dU = DQ - DW\, \qquad\qquad\qquad (1)
dU = DQ - DW\, \qquad\qquad\qquad (1)
</math>
</math>
Note that the sum of two small quantities, both not necessarily differentials, gives a differential of ''U''. The first law, equation (1), postulates the existence of a state function, ''U'', that accumulates the work done on/by the system and the heat that flows in/out the system.  
Note that the sum of two small quantities, both not necessarily differentials, gives a differential of the state function ''U''. The first law, equation (1), postulates the existence of a state function that accumulates the work done on/by the system and the heat that flows in/out the system.  


Internal energy is an extensive property&mdash;that is, its magnitude depends on the amount of substance in a given state. Often one considers the ''molar energy'', energy per amount of substance (amount expressed in [[mole]]s); this is an intensive property. Also the ''specific  energy'' (energy per kilogram) is an intensive property. The internal energy has the [[SI]] dimension [[joule]].   
Internal energy is an extensive property&mdash;that is, its magnitude depends on the amount of substance in a given state. Often one considers the ''molar energy'', energy per amount of substance (amount expressed in [[mole]]s); this is an intensive property. Also the ''specific  energy'' (energy per kilogram) is an intensive property. The (extensive) internal energy has the [[SI]] dimension [[joule]].   


Note that thus far only a ''change'' in internal energy was defined. An absolute value can be obtained by defining a zero (reference) point with ''U''<sub>0</sub> = 0 and integration
Note that thus far only a ''change'' in internal energy was defined. An absolute value can be obtained by defining a zero (reference) point with ''U''<sub>0</sub> = 0 and integration
Line 52: Line 52:
\int_0^1 dU = U_1 - U_0 = U_1
\int_0^1 dU = U_1 - U_0 = U_1
</math>
</math>
The reference point could be the zero of absolute temperature (zero kelvin).
Since ''U'' is a state function ''U''<sub>1</sub> is independent of the integration path (the choice of values of ''S'', ''V'', and ''n'' between lower  and upper  bound of the integration).
The reference point ''U''<sub>0</sub>  could be at the zero of absolute temperature (zero kelvin).


==Explicit expression==
==Explicit expression==
Consider a one-component thermodynamical system that allows heat exchange ''DQ'', work  &minus;''pdV'', and matter exchange &mu;''dn''.  The [[second law of thermodynamics]] states that there exists a variable, [[entropy]] (commonly denoted by ''S'') that is given by
Consider a one-component thermodynamical system that allows heat exchange ''DQ'', work  &minus;''pdV'', and matter exchange &mu;''dn''.  The [[second law of thermodynamics]] states that there exists a variable, [[entropy (thermodynamics)|entropy]] (commonly denoted by ''S'') that is given by
:<math>
:<math>
dS = \frac{DQ}{T}.
dS = \frac{DQ}{T},
</math>
</math>
This relation holds when the heat exchange occurs reversibly. By the second law, the entropy ''S'' is a state function&mdash;''dS'' is its differential&mdash;and is size-extensive, i.e., ''S'' is linear in the size of the system.
that is, the [[integrating factor]] 1/''T'' converts the small quantity ''DQ'' into the differential ''dS''.
This relation holds when the heat exchange occurs reversibly. By the second law, the entropy ''S'' is a state variable. It is size-extensive, i.e., ''S'' is linear in the size of the system, and has dimension J/K (joule per degree kelvin).  


Since there are three forms of contact with the surroundings, the system has three independent variables. Choose the variables ''S'', ''V'', and ''n'', all three size-extensive. The differential of the internal energy is
Since there are three forms of energy contact with the surroundings, the system has exactly three independent state variables. Choose now as independent set the variables ''S'', ''V'', and ''n'', which all three are size-extensive. By results shown earlier, cf. equation (1), and use of ''DQ = TdS'', the differential of the internal energy is
:<math>
:<math>
dU = TdS - pdV + \mu dn .\,\qquad\qquad\qquad\qquad\qquad\qquad\qquad(1)
dU = TdS - pdV + \mu dn .\,\qquad\qquad\qquad\qquad\qquad\qquad\qquad(2)
</math>
</math>
The explicit expression for ''U'' central to this section is,  
It will be shown that an explicit expression for the internal energy ''U'' of the system under consideration  is,  
:<math>
:<math>
U = TS - pV + \mu n. \,\qquad\qquad\qquad\qquad\qquad\qquad\qquad\qquad(2)
U = TS - pV + \mu n. \,\qquad\qquad\qquad\qquad\qquad\qquad\qquad\qquad(3)
</math>
</math>
Before equation (2) is proved, we will first derive that it has the following consequence
 
In order to prove (3), we consider first two identical systems with the same values for the three size-extensive independent variables ''S'', ''V'', ''n'' (and hence also the same values for ''U'', ''T'', and ''p''). Clearly, the "supersystem" consisting of the two identical system has twice the  entropy, volume, and amount of substance,  and the sum of the energies of the two systems is 2''U'', or
:<math>
:<math>
\mu n  = G\,
U(2S, 2V, 2n) = 2U(S, V, n).\,
\quad\hbox{with}\quad
</math>
G \equiv U - TS + pV .\,\qquad\qquad\qquad\qquad\qquad(3)
The same kind of equation holds when we separate the original system into two equal parts, then the energy, entropy, volume and amount of substance are halved for each of the two parts. Clearly then, for an arbitrary real positive number &lambda;,
</math>.
Indeed, from (2) and (1), respectively,
:<math>
:<math>
dU = TdS + SdT -pdV - Vdp +nd\mu +\mu dn = TdS - pdV + \mu dn, \,
U(\lambda S, \lambda V, \lambda n) = \lambda U(S, V, n).\,
</math>
</math>
so that
That is, the internal energy ''U'' is a [[homogeneous function]] of order 1 of the size-extensive variables, ''S'', ''V'' and ''n''. By [[homogeneous function|Euler's theorem]],
:<math>
:<math>
SdT - VdP = - n d\mu  \,
U = \left(\frac{\partial U}{\partial S}\right)_{V,n} S  +  \left(\frac{\partial U}{\partial V}\right)_{S,n} V + \left(\frac{\partial U}{\partial n}\right)_{S,V} n .
\qquad\qquad\qquad\qquad (4)
</math>
</math>
And from the second equation (3), equation (1), and the last equation,
Since ''U'' is a  function of the three variables, ''dU'' can be written in terms of partial derivatives. When this is equated to the expression in equation (2)
:<math>
:<math>
dG = -SdT + Vdp + \mu dn = nd\mu + \mu dn = d(n\mu). \,
\begin{align}
dU &= \left(\frac{\partial U}{\partial S}\right)_{V,n} dS + \left(\frac{\partial U}{\partial V}\right)_{S,n} dV  + \left(\frac{\partial U}{\partial n}\right)_{S,V} dn \\
&= TdS - pdV + \mu dn \\
\end{align}
</math>
</math>
The quantity ''G'' = ''U'' + ''pV'' &minus; ''TS'' = ''n&mu;''  is known as the [[Gibbs free energy]], and it follows that the chemical potential, &mu; = ''G/n'', is the Gibbs free energy per mole.
it follows (since ''S'', ''V'', and ''n'' are independent) that
 
In order to prove (2) two identical systems with same values for the three size-extensive variables ''n'', ''V'', ''S'' (and hence also same values for ''U'', ''T'', and ''p'') are considered. It is clear that for the "super system" consisting of the two identical system holds
:<math>
:<math>
U_{\mathrm{super}} = U(2S, 2V, 2n) = 2U(S, V, n)\,
T = \left(\frac{\partial U}{\partial S}\right)_{V,n}, \quad p = - \left(\frac{\partial U}{\partial V}\right)_{S,n}, \quad  \mu =   \left(\frac{\partial U}{\partial n}\right)_{S,V}
</math>
</math>
The same kind of equation holds when we separate the original system into two equal parts
Insertion of this into equation (4) gives the result (3).
===Gibbs free energy===
At first sight it may look as if equations (2) and (3) are contradictory, for, when taking the differential ''dU'' of (3), the term  ''SdT'' &minus;''Vdp'' + ''n''d&mu; arises, which is absent in equation (2).  From the consistency of  equations (2) and (3) it follows that ''SdT'' &minus; ''Vdp'' + ''n''d&mu; = 0.  It is now shown that the latter expression yields an equation for the differential ''dG'' of the [[Gibbs free energy]] ''G''.
 
The Gibbs free energy, often denoted by ''G'' in honor of the American physicist [[J. Willard  Gibbs]], is defined by
:<math>
:<math>
U(\tfrac{1}{2} S, \tfrac{1}{2} V, \tfrac{1}{2}n) = \tfrac{1}{2}U(S, V, n)\,
G \equiv U -TS + pV.\,  
</math>
</math>
Clearly, for arbitrary real positive &lambda;
From equation (3) it follows immediately that ''G'' = &mu;''n'' and taking the differential gives  ''dG'' = d(&mu;''n'').
 
One can confirm that ''G'' = &mu;''n'' by means of differential expressions. From the definition of ''G'':
:<math>
:<math>
U(\lambda S, \lambda V, \lambda n) = \lambda U(S, V, n)\,
dG = dU - TdS - SdT + pdV + Vdp . \,
</math>
</math>
That is, the internal energy ''U'' is a [[homogeneous function]] of order 1 of the size-extensive variables, ''S'', ''n'' and ''V''. By [[homogeneous function|Euler's theorem]],
Using
:<math>
:<math>
dU = \left(\frac{\partial U}{\partial S}\right)_{V,n} S  + \left(\frac{\partial U}{\partial V}\right)_{S,n} V + \left(\frac{\partial U}{\partial n}\right)_{S,V} n .
-SdT + VdP = n d\mu,  \,
</math>
</math>
Since ''U'' is a (state)  function equation (1) can be written as
it follows that
:<math>
:<math>
\begin{align}
dG = dU -TdS +pdV + nd\mu = \mu dn + nd\mu = d(n\mu).\,
dU &= \left(\frac{\partial U}{\partial S}\right)_{V,n} dS + \left(\frac{\partial U}{\partial V}\right)_{S,n} dV + \left(\frac{\partial U}{\partial n}\right)_{S,V} dn \\
&= TdS - pdV + \mu dn \\
\end{align}
</math>
</math>
Integration gives  ''G'' = ''n''&mu; + ''G''<sub>0</sub>. Taking that the zero of Gibbs energy ''G''<sub>0</sub> = 0, it is confirmed that ''the chemical potential'' &mu; ''is the Gibbs free energy per mole'', &mu; = ''G''/n''.
==Statistical thermodynamics definition==
==Statistical thermodynamics definition==
Consider a system of constant [[temperature]] ''T'', constant number of molecules ''N'', and constant volume ''V''. In statistical thermodynamics one defines for such a system the [[density operator]]
Consider a system of constant [[temperature]] ''T'', constant number of molecules ''N'', and constant volume ''V''. In statistical thermodynamics one defines for such a system the [[density operator]]
Line 139: Line 147:
</math>
</math>


Notes:
===Notes===
* The existence of an energy operator <font style = "vertical-align: top"><math>\hat{H}</math></font> was simply assumed. The choice of energy terms to be included in this operator, is in fact equivalent to the choice of contributions adding to the internal energy ''U''. Statistical thermodynamics does not solve the problem of defining internal energy.  
* The existence of an energy operator <font style = "vertical-align: top"><math>\hat{H}</math></font> was simply assumed. The choice of energy terms to be included in this operator, is in fact equivalent to the choice of contributions adding to the internal energy ''U''. Statistical thermodynamics does not solve the problem of defining internal energy.  
* When the trace is evaluated in a basis of eigenstates of <font style = "vertical-align: top"><math>\hat{H}</math></font>, the physical meaning of the density operator becomes clearer. In fact,  Boltzmann weight factors will arise. Thus, upon writing,
* When the trace is evaluated in a basis of eigenstates of <font style = "vertical-align: top"><math>\hat{H}</math></font>, the physical meaning of the density operator becomes clearer. In fact,  Boltzmann weight factors will arise. Thus, upon writing,
::<math>
::<math>
\hat{H}| E_i \rangle = E_i\; | E_i \rangle, \quad e^{-\beta \hat{H}} | E_i \rangle =  e^{-\beta E_i} \; | E_i \rangle \quad \mathrm{Tr}(e^{-\beta \hat{H}}) = \sum_{i} \langle E_i\;|\; e^{-\beta \hat{H}}\;| E_i \rangle,
\hat{H}| E_i \rangle = E_i\; | E_i \rangle, \qquad e^{-\beta \hat{H}} | E_i \rangle =  e^{-\beta E_i} \; | E_i \rangle, \qquad \mathrm{Tr}(e^{-\beta \hat{H}}) = \sum_{i} \langle E_i\;|\; e^{-\beta \hat{H}}\;| E_i \rangle,
,
</math>  
</math>  
:the partition function becomes,
:the partition function becomes [&beta; = 1 /(kT)]:
 
::<math>
::<math>
Q = \sum_{i} e^{-E_i/ (kT)}, \qquad\hbox{(sum over eigenstates, not over energy levels)},
Q = \sum_{i} e^{-E_i/ (kT)}, \qquad\hbox{(sum over eigenstates, not over energy levels)},
</math>
</math>
:and the thermodynamic average becomes
:and the thermodynamic average becomes in a basis of energy eigenstates
::<math>
::<math>
U = \langle\langle \hat{H}\rangle\rangle = \frac{1}{Q} \sum_i \; E_i\; e^{- E_i/(kT)}, \quad\hbox{with}\quad kT = 1/\beta.  
U = \langle\langle \hat{H}\rangle\rangle = \frac{1}{Q} \sum_i \; E_i\; e^{- E_i/(kT)}.  
</math>
</math>
:The partition function normalizes the [[Boltzmann weights]], exp[&minus; E<sub>i</sub>/(kT)]. Indeed,  
:The partition function normalizes the [[Boltzmann weights]], exp[&minus; E<sub>i</sub>/(kT)]. Indeed,  
Line 161: Line 169:


==Reference==
==Reference==
<references />
<references />[[Category:Suggestion Bot Tag]]

Latest revision as of 16:01, 1 September 2024

This article is developing and not approved.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
 
This editable Main Article is under development and subject to a disclaimer.

In thermodynamics, a system is any object, any quantity of matter, any region, etc. selected for study and mentally set apart from everything else which is then called its surroundings. The imaginary envelope enclosing the system and separating it from its surroundings is called the boundary of the system.[1] In this article the boundaries will be referred to as the walls of the system.

The internal energy of a system is simply its energy. The term was introduced into thermodynamics in 1852 by W. Thomson (the later Lord Kelvin).[2] The adjective "internal" refers to the fact that some energy contributions are not considered. For instance, when the total system is in uniform motion, it has kinetic energy. This overall kinetic energy is never seen as part of the internal energy; one could call it external energy. Or, if the system is at a constant non-zero height above the surface of the Earth, it has constant potential energy in the gravitational field of the Earth. Gravitational energy is only taken into account when it plays a role in the phenomenon of interest, for instance in a colloidal suspension, where the gravitation influences the up- downward motion of the small particles comprising the colloid. In all other cases, gravitational energy is assumed not to contribute to the internal energy; one may call it again external energy.

On the other hand, a contribution to internal energy that is always included is the kinetic energy of the atoms or molecules constituting the system. In a monatomic gas, it is the energy associated with translations of the atoms; in a molecular gas, translations and molecular rotations both contribute to kinetic energy and therefore to internal energy. In a solid, internal energy acquires contributions from vibrations, among other effects. Except for ideal gases, the potential energy of individual molecules in the field of the other molecules (see intermolecular forces) is also an important component of the internal energy.

In general, energies that are not changing in the processes of interest are left out of the definition of internal energy. For instance, when a system consists of a vessel filled with water and the process of interest is evaporation (formation of steam), the kinetic energy of the water molecules and the interaction between them are included in the internal energy. As long as no chemical bonds are broken, the energies contained in these bonds are not included. If the temperatures are not too high, say below 200 to 300 °C, the intramolecular vibrational energies are ignored as well. Chemists and engineers never include relativistic contributions, of the type E = mc2, or nuclear contributions (say the fusion energy of protons with oxygen-nuclei). However, a plasma physicist studying the thermodynamics of fusion reactions will include nuclear energy in the internal energy of the plasma.

First law of thermodynamics

Classical (phenomenological) thermodynamics is not concerned with the nature of the internal energy, it simply postulates that it exists and may be changed by certain processes. Further it is postulated that internal energy, usually denoted by either U or E, is a state function, that is, its value depends upon the state of the system and not upon the nature or history of the past processes by which the system attained its state. In addition, the internal energy, which henceforth will be written as U, is assumed to be a differentiable function of the independent variables that uniquely specify the state of the system. An example of such a state variable is the volume V of the system.

When the system has thermally conducting walls, an amount of heat DQ can go through the wall in either direction: if DQ > 0, heat enters the system and if DQ < 0 the system loses heat to its surroundings. The symbol DQ indicates simply a small amount of heat, and not a differential of Q. Note that, because it is not a function, Q does not have a differential. The internal energy of the system changes by dU as a consequence of the heat flow, and it is postulated that

Reiterating, the usual sign convention is such that positive DQ is the heat absorbed by the system, i.e., the heat that the system receives from its surroundings. The symbol dU indicates a differential of the differentiable function U.

Most thermodynamic systems are such that work can be performed on them or by them. When a small amount of work DW is performed by the system, the internal energy decreases,

The sign convention is such that DW is the work by the system on its surroundings, hence the minus sign in this equation.

As an example of work, consider a cylinder of volume V that may be changed by moving a piston in or out. The cylinder contains gas of pressure p. A small amount of work pdV is performed on the system by reversibly (quasi-statically) moving the piston inward (dV < 0). The sign convention of DW is such that DW and dV have the same sign

Due to the fact that the work is performed reversibly, the small amount of work DW is proportional to the differential dV. If dV > 0 (expansion), work DW > 0 is performed by the system. Hence the change in internal energy obtains indeed a minus sign:

Note that other forms of work than pdV are possible. For instance, DW = −HdM, the product of an external magnetic field H with a small change in total magnetization dM, is a change in internal energy caused by an alignment of the microscopic magnetic moments that constitute a magnetizable material.

An important form of doing work is the reversible addition of substance,

here μ (a function of thermodynamic parameters as T, p, etc.) is the chemical potential of the pure substance added to the system. The infinitesimal quantity dn is the amount (expressed in moles) of substance added. The chemical potential μ is the amount of energy that the system gains when reversibly, adiabatically (DQ = 0), and isochorically (dV = 0) a mole of substance is added to it.

When a small amount of heat DQ flows in or out the system and simultaneously a small amount of work DW is done by or on the system, the first law of thermodynamics states that the internal energy changes as follows

Note that the sum of two small quantities, both not necessarily differentials, gives a differential of the state function U. The first law, equation (1), postulates the existence of a state function that accumulates the work done on/by the system and the heat that flows in/out the system.

Internal energy is an extensive property—that is, its magnitude depends on the amount of substance in a given state. Often one considers the molar energy, energy per amount of substance (amount expressed in moles); this is an intensive property. Also the specific energy (energy per kilogram) is an intensive property. The (extensive) internal energy has the SI dimension joule.

Note that thus far only a change in internal energy was defined. An absolute value can be obtained by defining a zero (reference) point with U0 = 0 and integration

Since U is a state function U1 is independent of the integration path (the choice of values of S, V, and n between lower and upper bound of the integration). The reference point U0 could be at the zero of absolute temperature (zero kelvin).

Explicit expression

Consider a one-component thermodynamical system that allows heat exchange DQ, work −pdV, and matter exchange μdn. The second law of thermodynamics states that there exists a variable, entropy (commonly denoted by S) that is given by

that is, the integrating factor 1/T converts the small quantity DQ into the differential dS. This relation holds when the heat exchange occurs reversibly. By the second law, the entropy S is a state variable. It is size-extensive, i.e., S is linear in the size of the system, and has dimension J/K (joule per degree kelvin).

Since there are three forms of energy contact with the surroundings, the system has exactly three independent state variables. Choose now as independent set the variables S, V, and n, which all three are size-extensive. By results shown earlier, cf. equation (1), and use of DQ = TdS, the differential of the internal energy is

It will be shown that an explicit expression for the internal energy U of the system under consideration is,

In order to prove (3), we consider first two identical systems with the same values for the three size-extensive independent variables S, V, n (and hence also the same values for U, T, and p). Clearly, the "supersystem" consisting of the two identical system has twice the entropy, volume, and amount of substance, and the sum of the energies of the two systems is 2U, or

The same kind of equation holds when we separate the original system into two equal parts, then the energy, entropy, volume and amount of substance are halved for each of the two parts. Clearly then, for an arbitrary real positive number λ,

That is, the internal energy U is a homogeneous function of order 1 of the size-extensive variables, S, V and n. By Euler's theorem,

Since U is a function of the three variables, dU can be written in terms of partial derivatives. When this is equated to the expression in equation (2)

it follows (since S, V, and n are independent) that

Insertion of this into equation (4) gives the result (3).

Gibbs free energy

At first sight it may look as if equations (2) and (3) are contradictory, for, when taking the differential dU of (3), the term SdTVdp + ndμ arises, which is absent in equation (2). From the consistency of equations (2) and (3) it follows that SdTVdp + ndμ = 0. It is now shown that the latter expression yields an equation for the differential dG of the Gibbs free energy G.

The Gibbs free energy, often denoted by G in honor of the American physicist J. Willard Gibbs, is defined by

From equation (3) it follows immediately that G = μn and taking the differential gives dG = d(μn).

One can confirm that G = μn by means of differential expressions. From the definition of G:

Using

it follows that

Integration gives G = nμ + G0. Taking that the zero of Gibbs energy G0 = 0, it is confirmed that the chemical potential μ is the Gibbs free energy per mole, μ = G/n.

Statistical thermodynamics definition

Consider a system of constant temperature T, constant number of molecules N, and constant volume V. In statistical thermodynamics one defines for such a system the density operator

where is the Hamiltonian (energy operator) of the total system, is the trace of the operator , β = 1/(kT), and k is Boltzmann's constant. The quantity Q is the partition function.

The thermodynamic average of is equal to the internal energy,

The internal energy is minus the logarithmic derivative of Q,

Further

Hence, the following well-known statistical-thermodynamics expression is obtained for the internal energy U,

Notes

  • The existence of an energy operator was simply assumed. The choice of energy terms to be included in this operator, is in fact equivalent to the choice of contributions adding to the internal energy U. Statistical thermodynamics does not solve the problem of defining internal energy.
  • When the trace is evaluated in a basis of eigenstates of , the physical meaning of the density operator becomes clearer. In fact, Boltzmann weight factors will arise. Thus, upon writing,
the partition function becomes [β = 1 /(kT)]:
and the thermodynamic average becomes in a basis of energy eigenstates
The partition function normalizes the Boltzmann weights, exp[− Ei/(kT)]. Indeed,
The sum over normalized weights equals unity, as a proper weight function should.

Reference

  1. Perry's Handbook for Chemical Engineers, R. H. Perry and D. W. Green (editors), McGraw-Hill Companies, 6th ed. (1984) ISBN-10: 0070494797; ISBN-13: 978-0070494794
  2. W. Thomson, On a Universal Tendency in Nature to the Dissipation of Mechanical Energy, The Proceedings of the Royal Society of Edinburgh for April 19, 1852. Scanned copy of Kelvin's collected works