In mathematics, a singularity is a point at which a given mathematical object is not defined, or a point where the mathematical object ceases to be well-behaved in some particular way, such as by lacking differentiability or analyticity.^[1][2][3]

For example, the reciprocal function ${\displaystyle f(x)=1/x}$ has a singularity at ${\displaystyle x=0}$, where the value of the function is not defined, as involving a division by zero. The absolute value function ${\displaystyle g(x)=|x|}$ also has a singularity at ${\displaystyle x=0}$, since it is not differentiable there.^[4]

The algebraic curve defined by ${\displaystyle \left\{(x,y):y^{3}-x^{2}=0\right\}}$ in the ${\displaystyle (x,y)}$ coordinate system has a singularity (called a cusp) at ${\displaystyle (0,0)}$. For singularities in algebraic geometry, see singular point of an algebraic variety. For singularities in differential geometry, see singularity theory.

Real analysis

In real analysis, singularities are either discontinuities, or discontinuities of the derivative (sometimes also discontinuities of higher order derivatives). There are four kinds of discontinuities: type I, which has two subtypes, and type II, which can also be divided into two subtypes (though usually is not).

To describe the way these two types of limits are being used, suppose that ${\displaystyle f(x)}$ is a function of a real argument ${\displaystyle x}$, and for any value of its argument, say ${\displaystyle c}$, then the left-handed limit, ${\displaystyle f(c^{-})}$, and the right-handed limit, ${\displaystyle f(c^{+})}$, are defined by:

${\displaystyle f(c^{-})=\lim _{x\to c}f(x)}$, constrained by ${\displaystyle x<c}$ and

${\displaystyle f(c^{+})=\lim _{x\to c}f(x)}$, constrained by ${\displaystyle x>c}$.

The value ${\displaystyle f(c^{-})}$ is the value that the function ${\displaystyle f(x)}$ tends towards as the value ${\displaystyle x}$ approaches ${\displaystyle c}$ from below, and the value ${\displaystyle f(c^{+})}$ is the value that the function ${\displaystyle f(x)}$ tends towards as the value ${\displaystyle x}$ approaches ${\displaystyle c}$ from above, regardless of the actual value the function has at the point where ${\displaystyle x=c}$ .

There are some functions for which these limits do not exist at all. For example, the function

${\displaystyle g(x)=\sin \left({\frac {1}{x}}\right)}$

does not tend towards anything as ${\displaystyle x}$ approaches ${\displaystyle c=0}$. The limits in this case are not infinite, but rather undefined: there is no value that ${\displaystyle g(x)}$ settles in on. Borrowing from complex analysis, this is sometimes called an essential singularity.

The possible cases at a given value ${\displaystyle c}$ for the argument are as follows.

• A point of continuity is a value of ${\displaystyle c}$ for which ${\displaystyle f(c^{-})=f(c)=f(c^{+})}$, as one expects for a smooth function. All the values must be finite. If ${\displaystyle c}$ is not a point of continuity, then a discontinuity occurs at ${\displaystyle c}$.
• A type I discontinuity occurs when both ${\displaystyle f(c^{-})}$ and ${\displaystyle f(c^{+})}$ exist and are finite, but at least one of the following three conditions also applies:
  • ${\displaystyle f(c^{-})\neq f(c^{+})}$;
  • ${\displaystyle f(x)}$ is not defined for the case of ${\displaystyle x=c}$; or
  • ${\displaystyle f(c)}$ has a defined value, which, however, does not match the value of the two limits.

  Type I discontinuities can be further distinguished as being one of the following subtypes:

  • A jump discontinuity occurs when ${\displaystyle f(c^{-})\neq f(c^{+})}$, regardless of whether ${\displaystyle f(c)}$ is defined, and regardless of its value if it is defined.
  • A removable discontinuity occurs when ${\displaystyle f(c^{-})=f(c^{+})}$, also regardless of whether ${\displaystyle f(c)}$ is defined, and regardless of its value if it is defined (but which does not match that of the two limits).
• A type II discontinuity occurs when either ${\displaystyle f(c^{-})}$ or ${\displaystyle f(c^{+})}$ does not exist (possibly both). This has two subtypes, which are usually not considered separately:
  • An infinite discontinuity is the special case when either the left hand or right hand limit does not exist, specifically because it is infinite, and the other limit is either also infinite, or is some well defined finite number. In other words, the function has an infinite discontinuity when its graph has a vertical asymptote.
  • An essential singularity is a term borrowed from complex analysis (see below). This is the case when either one or the other limits ${\displaystyle f(c^{-<!--\; -\; -->}}$Zdroj:https://en.wikipedia.org?pojem=Singularity_(mathematics)
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