n
(algebra) A mathematical equation in which one or both sides is an algebraic expression, such as 2x + 7y = 3.
n
(mathematics) The quality of being algebraic
adj
(mathematics, of a series) Having terms that alternate between positive and negative.
adj
(mathematics) of a surface whose Gaussian curvature is negative at all points
adj
(mathematics) Characteristic of a mapping of elements that tends toward negative infinity as the magnitude of the element tends toward positive infinity.
n
(mathematics) The condition of being antisymmetric.
n
(mathematics, physics) The condition of being asymptotic
n
(mathematics) asymptotic behavior
n
(mathematics) The dependency of the value of a variable on its value at a previous time
n
(mathematics) The adjacency of a bipartite graph
n
(mathematics) A finite automaton which arbitrarily alternates between reading the input from the left and from the right
n
(algebra) A pair (w,z) of complex numbers constructed by the Cayley–Dickson process that defines the bicomplex conjugate (w,z)^*=(w,-z), and the product of two bicomplex numbers as (u,v)(w,z)=(uw-vz,uz+vw).
n
(mathematics) The condition of being biconditional.
n
(mathematics) The quality of being biexponential.
adj
(mathematics) indexed by a pair of integers
adj
(mathematics) Both left-invariant and right-invariant.
n
(mathematics, computing) Abbreviation of bilinear interpolation.
n
(mathematics) The removal of vertices from a graph in order to make it bipartite
adj
(mathematics) reversible under the action of two linear involutions
adj
(mathematics) Having two independent variables
adj
(mathematics) Having two independent variables.
n
(mathematics) A covariant that is the catalecticant of the penultimate emanant
n
A variable whose values are ordered, that can be multiplied by a scalar, and for which the magnitude of differences in values is meaningful.
n
(mathematics) The mapped version of an action to a cogroup.
n
(calculus) The act or process of obtaining the codifferential of a function, or a function which obtains the codifferential
n
(mathematics) The difference between the dimension of a space and the dimension of a given subspace of the first one.
n
(countable, mathematics) An equation for a hyperplane in the tangent space modulo a factor that is a positive constant; cotangent direction.
adj
(mathematics, of a sheaf) Belonging to a specific class of sheaves having particularly manageable properties closely linked to the geometrical properties of the underlying space.
n
(mathematics) The condition of being cohomological
n
(mathematics) The condition of being cohyponormal
adj
(mathematics) Describing time series subject to cointegration
n
(mathematics) A multivariate form of kriging
n
(mathematics, physics) The state of being commutative.
n
(mathematics) The property of being the dual of something modernistic.
n
(mathematics) The condition of having the same curvature
n
(mathematics) A function which negates the non-real part of a complex or hypercomplex number; complex conjugation
n
(algebra) A bihomogeneous polynomial in x, y, ... and the coefficients of some homogeneous form in x, y, ... that is invariant under some group of linear transformations.
n
(mathematics, computing theory) The greatest number of times that a contiguous subsequence can be repeated.
n
(mathematics) A maximum, minimum or point of inflection on a curve; a point at which the derivative of a function is zero or undefined.
n
(mathematics) A relationship between two variables that demonstrates a cause-and-effect relationship between them
n
(mathematics) The condition of being demipositive
n
(mathematics, mathematical analysis) An operator defined as a function of the differentiation operator (the operator which maps functions to their derivatives).
n
(mathematics, calculus) The process of applying the derivative operator to a function; of calculating a function's derivative.
n
(mathematics) A point in the range of a function at which it is undefined or discontinuous.
adj
(mathematics) Pertaining to a partition into disjoint dominating sets.
adj
(mathematics) having an arity of two (taking two arguments or operands)
n
(countable, mathematics) An equivalence relation; ≡; ~
n
(mathematics) The condition of being equivariant
adj
(mathematics, physics) Of or relating to certain systems that, given enough time, will eventually return to previously experienced state.
n
(complex analysis) Formula which links complex exponentiation with trigonometric functions:
adj
(mathematics) convertible to an exponent
adj
Relating to an exponent.
n
(mathematics) The growth in the value of a quantity, in which the rate of growth is proportional to the instantaneous value of the quantity; for example, when the value has doubled, the rate of increase will also have doubled. The rate may be positive or negative.
adj
Converted to exponential form
v
(computing) To apply a mathematical exponentiation function.
n
(mathematical analysis) A dimension in which it is the most suitable to make measurements on a fractal set.
n
(arithmetic geometry) A category with some extra structure that generalizes the theory of line bundles on models of finite extensions of global fields.
adj
(mathematics) Of or pertaining to Carl Friedrich Gauss.
n
(graph theory) The property of being Hamiltonian.
n
(mathematics) The condition of being hemicontinuous
n
(mathematics) the condition of being Hermitian
n
(neuropsychology, rare) Extremely heightened mathematical talent.
n
(mathematics) A nonempty set for which the set of all subsets forms a semiring.
adj
(mathematics) of, relating to, or being an injection: such that each element of the image (or range) is associated with at most one element of the preimage (or domain); inverse-deterministic
n
(specifically) Any of several analytic formalizations of this operation: the Riemann integral, the Lebesgue integral, etc.
n
(mathematics) Any transform of the form:
adj
(mathematics) Having the properties of an inverse; said with reference to any two operations, which, when both are performed in succession upon any quantity, reproduce that quantity.
n
(mathematics, esp. of a function or matrix) The condition of being invertible.
adj
of, or relating to linear algebra
adj
Alternative spelling of lower semi-continuous [(of a real-valued function on a topological space) Such that, for each fixed number, the subspace of points whose images are at most that number is closed.]
n
(mathematics) In a dynamical system, a quantity that characterizes the rate of separation of infinitesimally close trajectories.
n
(mathematics) A generalized concept of magnitude.
adj
(mathematics, logic, of a relationship between two sets) having the property that many elements of one set may be assigned by the relationship to any element in the other set, and that a given element in the first set can also be assigned more than one member of the second set.
n
(physics) The property of exhibiting a Maxwellian distribution, especially as regards the speed of a particle.
n
(mathematics) A parameter that controls the value of one or more others
adj
Alternative form of monoexponential [(mathematics) Involving the exponent of a single variable]
adj
(of graph paper) Being normal in one direction and logarithmic in the other
adj
(mathematics) Being, or having the salient properties of, a monotone function.
n
(mathematics) A function that either never decreases or never increases as its independent variable increases.
n
(mathematics) A variable whose value changes in one direction only (gets either larger or smaller)
n
(mathematics) A generalization of standard deviation to higher orders.
n
(mathematics, obsolete) A multiple.
n
The property of being multiplicative.
n
(mathematics) Synonym of multiplier
n
(mathematics) The number of values for which a given condition holds.
n
(mathematics) A vector, each of whose elements is a variate.
adj
(mathematics) negatively bent
n
(mathematics) A standard, canonical way of presenting an object.
n
(mathematics, statistics, software engineering) The property of being orthogonal.
adj
(mathematics) Pertaining to a curve in the linear system of a canonical divisor of an irregular surface and any point on that surface.
adj
(mathematics) That makes something paracompact.
adj
(mathematics) Pertaining to a paracontrolled distribution.
n
(mathematics) The ratio of the relative change in a function's output with respect to the relative change in its input, for infinitesimal changes at a certain point.
adj
(statistics) Of or pertaining to the relationship between two latent variables, each assumed to have a normal distribution and associated with an ordinal variable.
adj
(mathematics) Consisting of multiple harmonics
v
(mathematics) To multiply (the elements of a vector or matrix) by a following factor
adj
Alternative spelling of preexponential [(mathematics) Describing any factor that multiplies an exponential function]
n
(mathematics) An ultrafilter such that every set belonging to it is the superset of some fixed singleton set.
n
(mathematics) The condition of being projective.
n
(mathematics) The condition of being pseudocompact
adj
(mathematics) Both pseudoconvex and pseudoconcave.
n
(mathematics) A distribution that can be extended to a continuous functional.
adj
(mathematics) Almost, but not entirely monotone
adj
(mathematics) relating to a point
n
Alternative form of q-analog [(mathematics) A generalization of a theorem, identity or expression that involves a new parameter q that returns the original theorem, identity or expression in the limit as q → 1. They have applications in the study of fractals and the entropy of chaotic dynamical systems.]
adj
(mathematics, physics) Having some characteristics of a continuous function, system etc
n
(mathematics) A system that behaves as a continuum in most but not all respects.
adj
Alternative form of quasi-differentiable [(mathematics) That has a quasi-derivative.]
adj
(mathematics) Relating to quasiequations
adj
Alternative form of quasi-invariant [(mathematics) Preserving a specified property under transformation.]
adj
(computing) linearithmic
n
(mathematics) A nonnegative increasing semiadditive set function defined on a ring of sets that is continuous above the origin and takes its values in the extended domain of real numbers.
adj
(mathematics) describing a generalisation of a Poisson distribution
n
Alternative spelling of quasi-probability [(physics) A concept introduced in order to apply quantum corrections to classical statistical mechanics]
adj
(mathematics, representation theory, topological algebra, of a representation) That is the result of a required adjustment of an induced representation that would, unadjusted, give rise to (only) a quasi-invariant measure.
adj
(mathematics, computing theory) Trivial in a restricted sense or to some limited extent.
n
(mathematics) Any of a class of algebraic structures generalizing the notion of variety by allowing equational conditions on the axioms defining the class.
n
(mathematics, physics) A function which specifies the average density of atoms, molecules etc in three dimensions from a given point.
adj
(mathematics) Obtained using resummation
n
(mathematical analysis) A type of integral whose computation involves dividing the interval of integration into smaller sub-intervals, summing sample values of the integrand inside those sub-intervals multiplied by their lengths, and letting the number of sub-intervals tend to infinity.
n
(mathematics) A certain operation on the order ideals (or antichains) of a finite poset.
n
Logistic growth, or a graph detailing it.
adj
(mathematics) Having magnitude but not direction.
n
(mathematics) A covariant form of a cumulant
adj
(mathematics) Partially distributive
adj
(mathematics) That converts to a semidual
n
(mathematics) A form of matrix annuler in a Petri net.
n
(mathematics) Such an object
n
(mathematics) A partially ordered set that either has a join (a least upper bound) for any nonempty finite subset (a join-semilattice or upper semilattice) or has a meet (or greatest lower bound) for any nonempty finite subset (a meet-semilattice or lower semilattice). Equivalently, an underlying set which has a binary operation which is associative, commutative, and idempotent.
adj
(statistics) Characterized by a sigmoid curve or function
n
(mathematics, linear algebra) The property of two matrices being similar.
n
(mathematics) A principle of asymptotic analysis that relies on the cancellation of sinusoids with rapidly varying phase.
adj
(mathematics, of a distribution) whose moment-generating function is bounded by that of a Gaussian
adv
(mathematics) With respect to subderivatives
adv
(mathematics) Less than exponentially.
adj
Alternative form of sub-Gaussian [(mathematics, of a distribution) whose moment-generating function is bounded by that of a Gaussian]
n
(mathematics) The condition of being a subset
n
(countable, mathematics) A surface which is a submanifold of another surface.
adj
(mathematics, physics)
n
(mathematics) The condition of being superreflexive
adj
(mathematics) Exhibiting superrigidity.
n
(mathematics) evaluation in terms of tensors
n
(mathematics) A particular method of regularization of ill-posed problems, or estimating the coefficients of multiple-regression models in scenarios where the independent variables are highly correlated.
n
(mathematics) Synonym of conjugate transpose
adj
(mathematics) Having or involving a single variable
n
(statistics) A function of the spatial dependence of variance; a graph of this function
adj
(mathematics) Relating to a zero mode
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