Bicycle and motorcycle geometry

A Z-channel is a communications channel used in coding theory and information theory to model the behaviour of some data storage systems.

Definition

A Z-channel (or a binary asymmetric channel) is a channel with binary input and binary output where the crossover 1 → 0 occurs with nonnegative probability p, whereas the crossover 0 → 1 never occurs. In other words, if X and Y are the random variables describing the probability distributions of the input and the output of the channel, respectively, then the crossovers of the channel are characterized by the conditional probabilities

Prob{Y = 0 | X = 0} = 1

Prob{Y = 0 | X = 1} = p

Prob{Y = 1 | X = 0} = 0

Prob{Y = 1 | X = 1} = 1−p

Capacity

The capacity ${\displaystyle {\mathsf {cap}}(\mathbb {Z} )}$ of the Z-channel ${\displaystyle \mathbb {Z} }$ with the crossover 1 → 0 probability p, when the input random variable X is distributed according to the Bernoulli distribution with probability α for the occurrence of 0, is calculated as follows.

${\displaystyle {\mathsf {cap}}(\mathbb {Z} )=}$

${\displaystyle \max _{\alpha }\{{\mathsf {H}}(Y)-{\mathsf {H}}(Y\mid X)\}=\max _{p}\left\{{\mathsf {H}}(Y)-\sum _{x\in \{0,1\}}{\mathsf {H}}(Y\mid X=x){\mathsf {Prob}}\{X=x\}\right\}=}$

${\displaystyle \max _{\alpha }\{{\mathsf {H}}((1-\alpha )(1-p))-{\mathsf {H}}(Y\mid X=1){\mathsf {Prob}}\{X=1\}\}}$

${\displaystyle \max _{\alpha }\{{\mathsf {H}}((1-\alpha )(1-p))-(1-\alpha ){\mathsf {H}}(p)\},}$

where ${\displaystyle {\mathsf {H}}(\cdot )}$ is the binary entropy function.

The maximum is attained for

${\displaystyle \alpha =1-{\frac {1}{(1-p)(1+2^{{\mathsf {H}}(p)/(1-p)})}},}$

yielding the following value of ${\displaystyle {\mathsf {cap}}(\mathbb {Z} )}$ as a function of p

${\displaystyle {\mathsf {cap}}(\mathbb {Z} )={\mathsf {H}}\left({\frac {1}{1+2^{{\mathsf {s}}(p)}}}\right)-{\frac {{\mathsf {s}}(p)}{1+2^{{\mathsf {s}}(p)}}}=\log _{2}(1{+}2^{-{\mathsf {s}}(p)})=\log _{2}\left(1+(1-p)p^{p/(1-p)}\right)\;{\textrm {where}}\;{\mathsf {s}}(p)={\frac {{\mathsf {H}}(p)}{1-p}}.}$

For small p, the capacity is approximated by

${\displaystyle {\mathsf {cap}}(\mathbb {Z} )\approx 1-0.5{\mathsf {H}}(p)\,}$

as compared to the capacity ${\displaystyle 1{-}{\mathsf {H}}(p)}$ of the binary symmetric channel with crossover probability p.

Bounds on the size of an asymmetric-error-correcting code

Define the following distance function ${\displaystyle {\mathsf {d}}_{A}(\mathbf {x} ,\mathbf {y} )}$ on the words ${\displaystyle \mathbf {x} ,\mathbf {y} \in \{0,1\}^{n}}$ of length n transmitted via a Z-channel

${\displaystyle {\mathsf {d}}_{A}(\mathbf {x} ,\mathbf {y} ){\stackrel {\vartriangle }{=}}{\Big |}\{i\mid x_{i}=0,y_{i}=1\}{\Big |}+{\Big |}\{i\mid x_{i}=1,y_{i}=0\}{\Big |}.}$

Define the sphere ${\displaystyle V_{t}(\mathbf {x} )}$ of radius t around a word ${\displaystyle \mathbf {x} \in \{0,1\}^{n}}$ of length n as the set of all the words at distance t or less from ${\displaystyle \mathbf {x} }$, in other words,

${\displaystyle V_{t}(\mathbf {x} )=\{\mathbf {y} \in \{0,1\}^{n}\mid {\mathsf {d}}_{A}(\mathbf {x} ,\mathbf {y} )\leq t\}.}$

A code ${\displaystyle {\mathcal {C}}}$ of length n is said to be t-asymmetric-error-correcting if for any two codewords ${\displaystyle \mathbf {c} ,\mathbf {c} '\in \{0,1\}^{n}}$, one has ${\displaystyle V_{t}(\mathbf {c} )\cap V_{t}(\mathbf {c} ')=\emptyset }$. Denote by ${\displaystyle M(n,t)}$ the maximum size of a t-asymmetric-error-correcting code of length n.

The Varshamov bound. For n≥1 and t≥1,

${\displaystyle M(n,t)\leq {\frac {2^{n+1}}{\sum _{j=0}^{t}{\left({\binom {\lfloor n/2\rfloor }{j}}+{\binom {\lceil n/2\rceil }{j}}\right)}}}.}$

Let ${\displaystyle A(n,d,w)}$ denote the maximal number of binary vectors of length n of weight w and with Hamming distance at least d apart.

The constant-weight code bound. For n > 2t ≥ 2, let the sequence B₀, B₁, ..., B_n-2t-1 be defined as

${\displaystyle B_{0}=2,\quad B_{i}=\min _{0\leq j<i}\{B_{j}+A(n{+}t{+}i{-}j{-}1,2t{+}2,t{+}i)\}}$ for ${\displaystyle i>0}$.

Then ${\displaystyle M(n,t)\leq B_{n-2t-1}.}$

References

• 28 year-old Aircraft Maintenance Manufacture (Avionics) Cameron Lester from Port Coquitlam, usually spends time with hobbies which include mountain biking, property developers in singapore and train collecting. Loves to discover unknown towns and spots like Athens.
  
  Here is my web page; test.wbxonline.com Error correcting codes for the asymmetric channel, Technical Report 18–09–07–81, Department of Informatics, University of Bergen, Norway, 1981.
• 28 year-old Aircraft Maintenance Manufacture (Avionics) Cameron Lester from Port Coquitlam, usually spends time with hobbies which include mountain biking, property developers in singapore and train collecting. Loves to discover unknown towns and spots like Athens.
  
  Here is my web page; test.wbxonline.com On the capacity and codes for the Z-channel, Proceedings of the IEEE International Symposium on Information Theory, Lausanne, Switzerland, 2002, p. 422.