Fano factor explained

In statistics, the Fano factor,^[1] like the coefficient of variation, is a measure of the dispersion of a counting process. It was originally used to measure the Fano noise in ion detectors. It is named after Ugo Fano, an Italian-American physicist.

The Fano factor after a time

is defined as

F(t)=

	2
\sigma
	t

\mu_t

where

\sigma_t

is the standard deviation and

\mu_t

is the mean number of events of a counting process after some time

. The Fano factor can be viewed as a kind of noise-to-signal ratio; it is a measure of the reliability with which the waiting time random variable can be estimated after several random events.

For a Poisson counting process, the variance in the count equals the mean count, so

F=1

Definition

For a counting process

N_t

, the Fano factor after a time

t>0

is defined as,

F(t)=	\operatorname{Var
	(N

_{t)}{\operatorname{E}[N}_t]}.

Sometimes, the long-term limit is also termed the Fano factor,

F=\lim_t\toinftyF(t).

For a renewal process with holding times distributed similar to a random variable

, we have that,

F=\lim_t\toinftyF(t)=\lim_t\toinfty

	\operatorname{Var
	(N

_{t)}{\operatorname{E}[N}_t]}=

	\operatorname{Var
	(S)}{\operatorname{E}[S]

^2}.

^[2]

Since we have that the right-hand side is equal to the square of the coefficient of variation

	2=\operatorname{Var}(S)/\operatorname{E}[S]
c
	v

, the right-hand side of this equation is sometimes referred to as the Fano factor as well.^[3]

Interpretation

When considered as the dispersion of the number, the Fano factor

roughly corresponds to the width of the peak of

N_t

. As such, the Fano factor is often interpreted as the unpredictability of the underlying process.

Example: Constant Random Variable

When the holding times are constant, then

F=0

. As such, if

F ≈ 0

then we interpret the renewal process as being very predictable.

Example: Poisson Counting Process

When the likelihood of an event occurring in any time interval is equal for all time, then the holding times must be exponentially distributed, giving a Poisson counting process, for which

F=1

Use in particle detection

In particle detectors, the Fano factor results from the energy loss in a collision not being purely statistical. The process giving rise to each individual charge carrier is not independent as the number of ways an atom may be ionized is limited by the discrete electron shells. The net result is a better energy resolution than predicted by purely statistical considerations. For example, if w is the average energy for a particle to produce a charge carrier in a detector, then the relative FWHM resolution for measuring the particle energy E is:^[4]

	FWHM
	\mu

=2.35\sqrt{

	Fw
	E

}, where the factor of 2.35 relates the standard deviation to the FWHM.

The Fano factor is material-specific. Some theoretical values are:^[5]

Si:	0.115 (note discrepancy to experimental value)
Ge:	0.13 ^[6]
GaAs:	0.12 ^[7]
Diamond:	0.08

Measuring the Fano factor is difficult because many factors contribute to the resolution, but some experimental values are:

Si:	0.128 ± 0.001^[8] (at 5.9 keV) / 0.159 ± 0.002 (at 122 keV)
Ar (gas):	0.20 ± 0.01/0.02^[9]
Xe (gas):	0.13 to 0.29^[10]
CZT	0.089 ± 0.005^[11]

Use in neuroscience

The Fano factor is used in neuroscience to describe variability in neural spiking. ^[12] In this context, the events are the neural spiking events and the holding times are the Inter-Spike Intervals (ISI). Often, the limit definition of the Fano factor is used, for which,

F=\lim_t\toinfty

	\operatorname{Var
	(N

_{t)}{\operatorname{E}[N}_t]}=

	\operatorname{Var
	(ISI)}{(\operatorname{E}[ISI])

^2}=CV^2,

where

is the coefficient of variation of ISI.

Some neurons are found to have varying ISI distributions, meaning that the counting process is no longer a renewal process. Rather, a Markov renewal process is used. In the case that we have only two Markov states with equal transition probabilities

, we have that the limit above again converges,^[13]

F=2

	2
CV
	2

(\mu

	2
\mu
	2)

+\left(

	1	-1\right)
	p

(\mu

	2

	2)

1-\mu

(\mu

	2

	2)

1+\mu

where

\mu

represents the mean for the ISI of the corresponding state.

While most work assumes a constant Fano factor, recent work has considered neurons with non-constant Fano factors.^[14] In this case, it is found that non-constant Fano factors can be achieved by introducing both noise and non-linearity to the rate of the underlying Poisson process.

Notes and References

10.1103/PhysRev.72.26 . Ionization Yield of Radiations. II. The Fluctuations of the Number of Ions . 1947 . Fano . U. . Physical Review . 72 . 1 . 26–29 . 1947PhRv...72...26F .
Book: Cox, D.R.. 1962. Renewal Theory.
Shuai . J. W.. Zeng . S. . Jung . P. . 2002 . Coherence resonance: on the use and abuse of the fano factor. Fluct. Noise Lett.. 02. 3. L139–L146. 10.1142/S0219477502000749.
Book: Leo, W.R. . Techniques for Nuclear and Particle Physics Experiments: An How-to Approach . limited . 1987 . 978-3-540-17386-1 . Springer-Verlag . 109–125.
10.1103/PhysRevB.22.5565 . Scattering by ionization and phonon emission in semiconductors . 1980 . Alig . R. . Bloom . S. . Struck . C. . Physical Review B . 22 . 12 . 5565 . 1980PhRvB..22.5565A .
H.R. BilgerPhys. Rev. 163, 238 (1967)
G. Bertuccio, D. MaiocchiJ. Appl. Phys., 92 (2002), p. 1248
Kotov . I. V. . Neal . H. . O’Connor . P. . 2018-09-01 . Pair creation energy and Fano factor of silicon measured at 185 K using 55Fe X-rays . Nuclear Instruments and Methods in Physics Research Section A: Accelerators, Spectrometers, Detectors and Associated Equipment . en . 901 . 126–132 . 10.1016/j.nima.2018.06.022 . 0168-9002. free .
Kase . M. . Akioka . T. . Mamyoda . H. . Kikuchi . J. . Doke . T. . Fano factor in pure argon . 10.1016/0168-9002(84)90139-6 . Nuclear Instruments and Methods in Physics Research Section A: Accelerators, Spectrometers, Detectors and Associated Equipment . 227 . 2 . 311 . 1984 . 1984NIMPA.227..311K .
Do Carmo . S. J. C. . Borges . F. I. G. M. . Vinagre . F. L. R. . Conde . C. A. N. . Experimental Study of the
w

-Values and Fano Factors of Gaseous Xenon and Ar-Xe Mixtures for X-Rays . 10.1109/TNS.2008.2003075 . IEEE Transactions on Nuclear Science . 55 . 5 . 2637 . 2008 . 2008ITNS...55.2637D . 43581597 .
Redus. R. H.. Fano Factor Determination For CZT. MRS Proceedings. 487. Pantazis, J. A. . Huber, A. C. . Jordanov, V. T. . Butler, J. F. . Apotovsky, B. . 10.1557/PROC-487-101. 2011.
Book: Dayan. Peter. Abbott. L. F.. 2001. Theoretical Neuroscience.
Ball. F.. Milne. R. K.. 2005. Simple derivations of properties of counting processes associated with Markov renewal processes.
Charles. Adam S.. Park. Weller. Horwitz. Pillow. 2018. Dethroning the Fano Factor: A Flexible, Model-Based Approach to Partitioning Neural Variability. Neural Computation . 30 . 4 . 1012–1045 . 10.1162/neco_a_01062 . 29381442 . 6558056 .

Fano factor explained

Definition

Interpretation

Example: Constant Random Variable

Example: Poisson Counting Process

Use in particle detection

Use in neuroscience

See also

Notes and References