List of mathematical abbreviations
This article is a listing of abbreviated names of mathematical functions, function-like operators and other mathematical terminology.
- This list is limited to abbreviations of two or more letters. The capitalization of some of these abbreviations is not standardized – different authors use different capitalizations.
- This list is incomplete; you can help by expanding it.
- AC – Axiom of Choice.[1]
- a.c. – absolutely continuous.
- acrd – inverse chord function.
- adj – adjugate of a matrix.
- a.e. – almost everywhere.
- Ai – Airy function.
- AL – Action limit.
- Alt – alternating group (Alt(n) is also written as An.)
- A.M. – arithmetic mean.
- arccos – inverse cosine function.
- arccosec – inverse cosecant function. (Also written as arccsc.)
- arccot – inverse cotangent function.
- arccsc – inverse cosecant function. (Also written as arccosec.)
- arcexc – inverse excosecant function. (Also written as arcexcsc, arcexcosec.)
- arcexcosec – inverse excosecant function. (Also written as arcexcsc, arcexc.)
- arcexcsc – inverse excosecant function. (Also written as arcexcosec, arcexc.)
- arcexs – inverse exsecant function. (Also written as arcexsec.)
- arcexsec – inverse exsecant function. (Also written as arcexs.)
- arcosech – inverse hyperbolic cosecant function. (Also written as arcsch.)
- arcosh – inverse hyperbolic cosine function.
- arcoth – inverse hyperbolic cotangent function.
- arcsch – inverse hyperbolic cosecant function. (Also written as arcosech.)
- arcsec – inverse secant function.
- arcsin – inverse sine function.
- arctan – inverse tangent function.
- arctan2 – inverse tangent function with two arguments. (Also written as atan2.)
- arg – argument of a complex number.[2]
- arg max – argument of the maximum.
- arg min – argument of the minimum.
- arsech – inverse hyperbolic secant function.
- arsinh – inverse hyperbolic sine function.
- artanh – inverse hyperbolic tangent function.
- a.s. – almost surely.
- atan2 – inverse tangent function with two arguments. (Also written as arctan2.)
- A.P. – arithmetic progression.
- Aut – automorphism group.
- bd – boundary.
- Bi – Airy function of the second kind.
- Bias – bias of an estimator
- Card – cardinality of a set.[3] (Card(X) is also written #X, ♯X or |X|.)
- cdf – cumulative distribution function.
- c.f. – cumulative frequency.
- char – characteristic of a ring.
- Chi – hyperbolic cosine integral function.
- Ci – cosine integral function.
- cis – cos + i sin function. (Also written as expi.)
- Cl – conjugacy class.
- cl – topological closure.
- cod, codom – codomain.
- cok, coker – cokernel.
- Cor – corollary.
- corr – correlation.
- cos – cosine function.
- cosec – cosecant function. (Also written as csc.)
- cosech – hyperbolic cosecant function. (Also written as csch.)
- cosh – hyperbolic cosine function.
- cosiv – coversine function. (Also written as cover, covers, cvs.)
- cot – cotangent function. (Also written as ctg.)
- coth – hyperbolic cotangent function.
- cov – covariance of a pair of random variables.
- cover – coversine function. (Also written as covers, cvs, cosiv.)
- covercos – covercosine function. (Also written as cvc.)
- covers – coversine function. (Also written as cover, cvs, cosiv.)
- crd – chord function.
- csc – cosecant function. (Also written as cosec.)
- csch – hyperbolic cosecant function. (Also written as cosech.)
- ctg – cotangent function. (Also written as cot.)
- curl – curl of a vector field. (Also written as rot.)
- cvc – covercosine function. (Also written as covercos.)
- cvs – coversine function. (Also written as cover, covers, cosiv.)
- def – define or definition.
- deg – degree of a polynomial. (Also written as ∂.)
- del – del, a differential operator. (Also written as .)
- det – determinant of a matrix or linear transformation.
- dim – dimension of a vector space.
- div – divergence of a vector field.
- dkl – decalitre
- DNE – a solution for an expression does not exist, or is undefined. Generally used with limits and integrals.
- dom – domain of a function.[1] (Or, more generally, a relation.)
- End – categories of endomorphisms.
- Ei – exponential integral function.
- Eqn – equation.
- erf – error function.
- erfc – complementary error function.
- etr — exponent of the trace.
- exc — excosecant function. (Also written as excsc, excosec.)
- excosec — excosecant function. (Also written as excsc, exc.)
- excsc — excosecant function. (Also written as excosec, exc.)
- exs — exsecant function. (Also written as exsec.)
- exsec — exsecant function. (Also written as exs.)
- exp – exponential function. (exp x is also written as ex.)
- expi – cos + i sin function. (Also written as cis.)
- expm1 – exponential minus 1 function. (Also written as exp1m.)
- exp1m – exponential minus 1 function. (Also written as expm1.)
- Ext – Ext functor.
- ext – exterior.
- FIP – finite intersection property.
- FOL – first-order logic.
- Frob – Frobenius endomorphism.
- Gal – Galois group. (Also written as Γ.)
- gcd – greatest common divisor of two numbers. (Also written as hcf.)
- gd – Gudermannian function.
- GF – Galois field.
- GL – general linear group.
- G.M. – geometric mean.
- glb – greatest lower bound. (Also written as inf.)
- G.P. – geometric progression.
- grad – gradient of a function.
- hacover – hacoversine function. (Also written as hacovers, hcv.)
- hacovercos – hacovercosine function. (Also written as hcc.)
- hacovers – hacoversine function. (Also written as hacover, hcv.)
- hav – haversine function. (Also written as sem.)
- havercos – havercosine function. (Also written as hvc.)
- hcc – hacovercosine function. (Also written as hacovercos.)
- hcv – hacoversine function. (Also written as hacover, hacovers.)
- hcf – highest common factor of two numbers. (Also written as gcd.)
- H.M. – harmonic mean.
- HOL – higher-order logic.
- Hom – Hom functor.
- hom – hom-class.
- hot - Higher Order Term
- HOTPO - Half Or Triple Plus One
- hvc – havercosine function. (Also written as havercos.)
- iff – if and only if.
- iid – independent and identically distributed random variables.
- Im – imaginary part of a complex number[2] (Also written as ).
- im – image
- inf – infimum of a set. (Also written as glb.)
- int – interior.
- ker – kernel.
- lb – binary logarithm (log2). (Also written as ld.)
- lcm – lowest common multiple or least common multiple of two numbers.
- ld – binary logarithm (log2). (Also written as lb.)
- lerp – linear interpolation.[4]
- lg – common logarithm (log10) or binary logarithm (log2).
- LHS – left-hand side of an equation.
- Li – offset logarithmic integral function.
- li – logarithmic integral function or linearly independent.
- lim – limit of a sequence, or of a function.
- lim inf – limit inferior.
- lim sup – limit superior.
- ln – natural logarithm, loge.
- lnp1 – natural logarithm plus 1 function.
- ln1p – natural logarithm plus 1 function.
- log – logarithm. (If without a subscript, this may mean either log10 or loge.)
- logh – natural logarithm, loge.[5]
- LST – language of set theory.
- lub – least upper bound.[1] (Also written sup.)
- max – maximum of a set.
- M.I. – mathematical induction.
- min – minimum of a set.
- mod – modulo.
- mtanh – modified hyperbolic tangent function. (Also written as mth.)
- mth – modified hyperbolic tangent function. (Also written as mtanh.)
- mx – matrix.
- NAND – not-and in logic.
- No. – number.
- NOR – not-or in logic.
- NTS – need to show.
- ob – object class.
- ord – ordinal number of a well-ordered set.[3]
- pdf – probability density function.
- pf – proof.
- PGL – projective general linear group.
- pmf – probability mass function.
- Pr – probability of an event. (See Probability theory. Also written as P or .)
- PSL – projective special linear group.
- QED – "Quod erat demonstrandum", a Latin phrase used at the end of a definitive proof.
- QEF – "quod erat faciendum", a Latin phrase sometimes used at the end of a construction.
- ran – range of a function.
- rank – rank. (Also written as rk.)
- Re – real part of a complex number.[2] (Also written .)
- resp – respectively.
- RHS – right-hand side of an equation.
- rk – rank. (Also written as rank.)
- RMS, rms – root mean square.
- rng – non-unital ring.
- rot – rotor of a vector field. (Also written as curl.)
- RTP – required to prove.
- RV – Random Variable. (or as R.V.)
- sec – secant function.
- sech – hyperbolic secant function.
- seg – initial segment of.[1]
- sem – haversine function. (Also written as hav.)
- SFIP – strong finite intersection property.
- sgn – signum function.
- Shi – hyperbolic sine integral function.
- Si – sine integral function.
- sin – sine function.
- sinc – sinc function.
- sinh – hyperbolic sine function.
- siv – versine function. (Also written as ver, vers.)
- SL – special linear group.
- Soln – solution.
- sp – linear span of a set of vectors. (Also written with angle brackets.)
- Spec – spectrum of a ring.
- s.t. – such that or so that.
- st – standard part function.
- STP – [it is] sufficient to prove.
- sup – supremum of a set.[1] (Also written lub.)
- supp – support of a function.
- Sym – symmetric group (Sym(n) is also written as Sn.)
- tan – tangent function. (Also written as tgn, tg.)
- tanh – hyperbolic tangent function.
- TFAE – the following are equivalent.
- tg – tangent function. (Also written as tan, tgn.)
- tgn – tangent function. (Also written as tan, tg.)
- Thm – theorem.
- Tor – Tor functor.
- Tr – trace, either the field trace, or the trace of a matrix or linear transformation.
- undef – a function or expression is undefined
- var – variance of a random variable.
- vcs – vercosine function. (Also written as vercos.)
- ver – versine function. (Also written as vers, siv.)
- vercos – vercosine function. (Also written as vcs.)
- vers – versine function. (Also written as ver, siv.)
- W^5 – which was what we wanted. Synonym of Q.E.D.
- walog – without any loss of generality.
- wff – well-formed formula.
- whp – with high probability.
- wlog – without loss of generality.
- WMA – we may assume.
- WO – well-ordered set.[1]
- wp1 - with probability 1.
- wrt – with respect to or with regard to.
- WTP – want to prove.
- WTS – want to show.
- XOR – exclusive or in logic.
- ZF – Zermelo–Fraenkel axioms of set theory.[3]
- ZFC – Zermelo–Fraenkel axioms (with the Axiom of Choice) of set theory.[3]
References
- 1 2 3 4 5 6 Goldrei, Derek (1996). Classic Set Theory. London, UK: Chapman and Hall. pp. 283–287 (Index). ISBN 0-412-60610-0.
- 1 2 3 Priestley, H. A. (2003). Introduction to Complex Analysis (2 ed.). Oxford University Press. p. 321 (Notation index). ISBN 978-0-19-852562-2.
- 1 2 3 4 Hamilton, A. G. (1982). Numbers, sets and axioms. Cambridge University Press. pp. 249–251 (Index of symbols). ISBN 0-521-24509-5.
- ↑ Raymond, Eric S. (2003), "LERP", Jargon File, 4.4.7
- ↑ Jolley, L.B.W. (1961). Summation of Series (2 (revised) ed.). New York, USA: Dover Publications, Inc. LCCN 61-65274.
See also
- Greek letters used in mathematics, science, and engineering
- ISO 31-11
- Mathematical alphanumeric symbols
- Mathematical jargon
- Mathematical notation
- Notation in probability and statistics
- Physical constants
- Roman letters used in mathematics
- Table of logic symbols
- Table of mathematical symbols
- Unicode mathematical operators
- List of mathematical functions
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