💡 Words with a Similar Meaning to "Bireversible"
Found via reverse dictionary — words that share a conceptual meaning.
| Word | Definition |
|---|---|
| bihomogeneous | (mathematics) reversibly homogeneous |
| invertible | (mathematics, especially of a function or matrix) Able to be inverted, having an inverse. |
| biprojective | (mathematics) Acting as both a projective left and right module, such that the left and right multiplications are compatible. |
| bivariant | (mathematics) Having two independent variables. |
| biinvariant | (mathematics) Both left-invariant and right-invariant. |
| involutory | (mathematics) Of a mapping or transformation: being its own inverse; being an involution. |
| nonsingular | (linear algebra, of a matrix) Invertible. |
| birational | (mathematics) Describing a rational geometric function that has a rational inverse |
| involutive | (mathematics) Being an involution. |
| quasireversible | (chemistry, mathematics) Apparently reversible |
| bijective | (mathematics, of a function) Associating to each element of the codomain exactly one element of the domain; establishing a perfect (one-to-one) correspondence between the elements of the domain and the codomain; (formally) both injective and surjective. |
| bivariably | (mathematics) In a bivariable manner |
| bivariablenoun | (mathematics) A binomial variable |
| bilinear | (linear algebra, of a function in two variables) Linear (preserving linear combinations) in each variable. |
| biaffine | (mathematics) affine in two different ways |
| antiunitary | (mathematics) Of a bijective antilinear mapping, reversing the order when applied to the arguments of a scalar product: ⟨x,y⟩=⟨f(y),f(x)⟩ |
| biregular | (geometry, of two varieties) Having a biregular map from one to the other, i.e. isomorphic as abstract varieties. |
| biuniquenoun | (mathematics, of two sets) that have a one-to-one correspondence in each direction |
| biconjugatenoun | (mathematics) conjugate in two ways |
| antipalindromic | Of a natural number, with respect to base b, being equivalent to the natural number whose digits are reversed and subtracted from b-1: ∑ᵢ₌₀ⁿa_ibⁱ is antipalindromic iff ∑ᵢ₌₀ⁿa_ibⁱ=∑ᵢ₌₀ⁿ(b-1-a_n-i)bⁱ⟺a_i=b-1-a_n-i. |
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