**Electrical elastance** is the inverse of capacitance. The SI unit of elastance is the inverse farad (F^{−1}). The concept is not widely used by electrical and electronic engineers. The value of capacitors is invariably specified in units of capacitance rather than inverse capacitance. However, it is used in theoretical work in network analysis and has some niche applications at microwave frequencies.

The term *elastance* was coined by Oliver Heaviside through the analogy of a capacitor as a spring. The term is also used for analogous quantities in some other energy domains. It maps to stiffness in the mechanical domain, and is the inverse of compliance in the fluid flow domain, especially in physiology. It is also the name of the generalised quantity in bond-graph analysis and other schemes analysing systems across multiple domains.

## Usage

The definition of capacitance (*C*) is the charge (*Q*) stored per unit voltage (*V*).

Elastance (*S*) is the reciprocal of capacitance, thus,

^{[1]}

Expressing the values of capacitors as elastance is not done much by practical electrical engineers, although it is sometimes convenient for capacitors in series. The total elastance is simply the sum of the individual elastances in that case. However, it is used by network theorists in their analysis. One advantage is that an increase in elastance increases impedance. This is in the same direction as the other two basic passive elements, resistance and inductance. An example of the use of elastance can be found in the 1926 doctoral thesis of Wilhelm Cauer. On his path to founding network synthesis he formed the loop matrix **A**,

where **L**, **R**, **S** and **Z** are the network loop matrices of inductance, resistance, elastance and impedance respectively and *s* is complex frequency. This expression would be significantly more complicated if Cauer had tried to use a matrix of capacitances instead of elastances. The use of elastance here is merely for mathematical convenience, in much the same way as mathematicians use radians rather than the more common units for angles.^{[2]}

Elastance is also used in microwave engineering. In this field varactor diodes are used as a voltage variable capacitor in frequency multipliers, parametric amplifiers and variable filters. These diodes store a charge in their junction when reverse biased which is the source of the capacitor effect. The slope of the voltage-stored charge curve is called *differential elastance* in this field.^{[3]}

## Units

The SI unit of elastance is the reciprocal farad (F^{−1}). The term *daraf* is sometimes used for this unit, but it is not approved by SI and its use is discouraged.^{[4]} The term is formed by writing *farad* backwards, in much the same way as the unit *mho* (unit of conductance, also not approved by SI) is formed by writing *ohm* backwards.^{[5]}

The term *daraf* was coined by Arthur E. Kennelly. He used it from at least 1920.^{[6]}

## History

The terms *elastance* and *elastivity* were coined by Oliver Heaviside in 1886.^{[7]} Heaviside coined a great many of the terms used in circuit analysis today, such as impedance, inductance, admittance, and conductance. Heaviside's terminology followed the model of resistance and resistivity with the *-ance* ending used for extensive properties and the *-ivity* ending used for intensive properties. The extensive properties are used in circuit analysis (they are the "values" of components) and the intensive properties are used in field analysis. Heaviside's nomenclature was designed to highlight the connection between corresponding quantities in field and circuit.^{[8]} Elastivity is the intensive property of a material corresponding to the bulk property of a component, elastance. It is the reciprocal of permittivity. As Heaviside put it,

Permittivity gives rise to permittance, and elastivity to elastance.

^{[9]}— Oliver Heaviside

Here, *permittance* is Heaviside's term for capacitance. He did not like any term that suggested that a capacitor was a container for holding charge. He rejected the terms *capacity* (capacitance) and *capacious* (capacitive) and their inverses *incapacity* and *incapacious*.^{[10]} The terms current in his time for a capacitor were *condenser* (suggesting that the "electric fluid" could be condensed out) and *leyden*^{[11]} after the Leyden jar, an early form of capacitor, also suggesting some sort of storage. Heaviside preferred the analogy of a mechanical spring under compression, hence his preference for terms that suggested a property of a spring.^{[12]} This preference was a result of Heaviside following James Clerk Maxwell's view of electric current, or at least, Heaviside's interpretation of it. In this view, electric current is a flow caused by the electromotive force and is the analogue of velocity caused by a mechanical force. At the capacitor, this current causes a "displacement" whose rate of change is equal to the current. The displacement is viewed as an electric strain, like a mechanical strain in a compressed spring. The existence of a flow of physical charge is denied, as is the buildup of charge on the capacitor plates. This is replaced with the concept of divergence of the displacement field at the plates, which is numerically equal to the charge collected on the plates in the charge flow view.^{[13]}

For a period in the nineteenth and early-twentieth centuries, some authors followed Heaviside in the use of *elastance* and *elastivity*.^{[14]} Today, the reciprocal quantities *capacitance* and *permittivity* are almost universally preferred by electrical engineers. However, elastance does still see some usage by theoretical writers. A further consideration in Heaviside's choice of these terms was a wish to distinguish them from mechanical terms. Thus, he chose *elastivity* rather than *elasticity*. This avoids having to write *electrical elasticity* to disambiguate it from *mechanical elasticity*.^{[15]}

Heaviside carefully chose his terms to be unique to electromagnetism, most especially avoiding commonality with mechanics. Ironically, many of his terms have subsequently been borrowed back into mechanics and other domains in order to name analogous properties. For instance, it is now necessary to distinguish *electrical impedance* from *mechanical impedance* in some contexts.^{[16]} *Elastance* has also been borrowed back into mechanics for the analogous quantity by some authors, but often *stiffness* is the preferred term instead. However, *elastance* is widely used for the analogous property in the domain of fluid dynamics, especially in the fields of biomedicine and physiology.^{[17]}

## Mechanical analogy

Mechanical-electrical analogies are formed by comparing the mathematical description of the two systems. Quantities that appear in the same place in equations of the same form are called *analogues*. There are two main reasons for forming such analogies. The first is to allow electrical phenomena to be explained in terms of the more familiar mechanical systems. For instance, an electrical inductor-capacitor-resistor circuit has differential equations of the same form as a mechanical mass-spring-damper system. In such cases the electrical domain is converted to the mechanical domain. The second, and more important, reason is to allow a system containing both mechanical and electrical parts to be analysed as a unified whole. This is of great benefit in the fields of mechatronics and robotics. In such cases the mechanical domain is most often converted to the electrical domain because network analysis in the electrical domain is highly developed.^{[18]}

### The Maxwellian analogy

In the analogy developed by Maxwell, now known as the impedance analogy, voltage is made analogous to force. The voltage of a source of electric power is still called electromotive force for this reason. Current is analogous to velocity. The time derivative of distance (displacement) is equal to velocity and the time derivative of momentum is equal to force. Quantities in other energy domains that are in this same differential relationship are called respectively *generalised displacement*, *generalised velocity*, *generalised momentum*, and *generalised force*. In the electrical domain, it can be seen that the generalised displacement is charge, explaining the Maxwellians' use of the term *displacement*.^{[19]}

Since elastance is the ratio of voltage over charge, then it follows that the analogue of elastance in another energy domain is the ratio of a generalised force over a generalised displacement. Thus, an elastance can be defined in any energy domain. *Elastance* is used as the name of the generalised quantity in the formal analysis of systems with multiple energy domains, such as is done with bond graphs.^{[20]}

Energy domain | Generalised force | Generalised displacement | Name for elastance |
---|---|---|---|

Electrical | Voltage | Charge | Elastance |

Mechanical (translational) | Force | Displacement | Stiffness/elastance^{[22]} |

Mechanical (rotational) | Torque | Angle | Rotational stiffness/elastance Moment of stiffness/elastance Torsional stiffness/elastance ^{[23]} |

Fluid | Pressure | Volume | Elastance |

Thermal | Temperature difference | Entropy | Warming factor^{[24]} |

Magnetic | Magnetomotive force (mmf) | Magnetic flux | Permeance^{[25]} |

Chemical | Chemical potential | Molar amount | Inverse chemical capacitance^{[26]} |

### Other analogies

Maxwell's analogy is not the only way that analogies can be constructed between mechanical and electrical systems. There are any number of ways to do this. One very common system is the mobility analogy. In this analogy force maps to current instead of voltage. Electrical impedance no longer maps to mechanical impedance, and likewise, electrical elastance no longer maps to mechanical elastance.^{[27]}

## References

**^**Camara, p.16–11**^**Cauer, Mathis & Pauli, p.4

The symbols in Cauer's expression have been modified for consistency within this article and with modern practice**^**Miles, Harrison & Lippens, pp.29–30**^**Michell, p.168- Mills, p.17

**^**Klein, p.466**^**Kennelly & Kurokawa, p.41- Blake, p.29
- Jerrard, p.33

**^**Howe, p.60**^**Yavetz, p.236**^**Heaviside, p.28**^**Howe, p.60**^**Heaviside, p.268**^**Yavetz, pp.150–151**^**Yavetz, pp.150–151**^**See, for instance, Peek, p.215, writing in 1915**^**Howe, p.60**^**van der Tweel & Verburg, pp.16–20**^**see for instance Enderle & Bronzino, pp.197–201, especially equation 4.72**^**Busch-Vishniac, pp.17–18**^**Gupta, p.18**^**Vieil, p.47**^**Busch-Vishniac, pp.18–19- Regtien, p.21
- Borutzky, p.27

**^**Horowitz, p.29**^**Vieil, p.361- Tschoegl, p.76

**^**Fuchs, p.149**^**Karapetoff, p.9**^**Hillert, pp.120–121**^**Busch-Vishniac, p.20

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