Palavras em English para 'Relating to topochemistry'
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adj
noun
adj
- (chemistry) In the same state of matter.
- (ring theory, of an element of a graded ring) Belonging to one of the summands of the grading (if the ring is graded over the natural numbers and the element is in the kth summand, it is said to be homogeneous of degree k; if the ring is graded over a commutative monoid I, and the element is an element of the ith summand, it is said to be of grade i)
- (of a linear differential equation) Having its degree-zero term equal to zero; admitting the trivial solution.
- (algebra, of a polynomial) Such that all its nonzero terms have the same degree.
- Having the same composition throughout; of uniform make-up.
- (probability theory, Fourier analysis, of a distribution S on Euclidean n-space (or on ℝⁿmathbf 0)) Informally: Determined by its restriction to the unit sphere. Formally: Such that, for all real t>0 and test functions ϕ( mathbf x), the equality S[t⁻ⁿϕ( mathbf x/t)]=t^(mS)[ϕ( mathbf x)] holds for some fixed real or complex m.
- Of the same kind; alike, similar.
- (of a linear map f between vector spaces graded by a commutative monoid I) Which respects the grading of its domain and codomain. Formally: Satisfying f(V_j)⊆W_i+j for fixed i (called the degree or grade of f), V_j the jth component of the grading of f 's domain, W_k the kth component of the grading of f 's codomain, and + representing the monoid operation in I.
- (geometry, of a space equipped with a group action) Informally: Everywhere the same, uniform, in the sense that any point can be moved to any other (via the group action) while respecting the structure of the space. Formally: Such that the group action is transitively and acts by automorphisms on the space (some authors also require that the action be faithful).
- (set theory, order theory, of a relation) Holding between a set and itself; being an endorelation.
- (of a first-order differential equation) Capable of being written in the form f(x,y) mathop dy=g(x,y) mathop dx where f and g are homogeneous functions of the same degree as each other.
- (linear algebra, by specialization, of a system of linear equations) Such that all the constant terms are zero.
- (mathematics) In any of several technical senses uniform; scalable; having its behavior or form determined by, or the same as, its behavior on or form at a smaller component (of its domain of definition, of itself, etc.).
- (geometry) Of or relating to homogeneous coordinates.
- The function f(x,y)#61;x²#43;x²ʸ#43;y² is not homogeneous on all of #92;mathbb#123;R#125;² because f(2,2)#61;16#92;neq 2ᵏ#42;3#61;2ᵏf(1,1) for any k, but f is homogeneous on the subspace of #92;mathbb#123;R#125;² spanned by (1,0) because f(#92;alphax,#92;alphay)#61;#92;alphax²#61;#92;alpha²f(x,y) for all (x,y)#92;in#92;operatorname#123;Span#125;#92;#123;(1,0)#92;#125;.
- (mathematical analysis, generalizing the case of polynomial functions, of a function f) Such that if each of f 's inputs are multiplied by the same scalar, f 's output is multiplied by the same scalar to some fixed power (called the degree of homogeneity or degree of f). (Formally and more generally, of a partial function f between vector spaces whose domain is a linear cone) Satisfying the equality f(s mathbf x)=sᵏᶠ(
- (of a general differential equation) Homogeneous as a function of the dependent variable and its derivatives.
- all of the same or similar kind or nature
adj
- (chemistry) Visibly consisting of different components.
- (physics, chemistry) Having more than one phase (solid, liquid, gas) present in a system or process.
- Diverse in kind or nature; composed of diverse parts.
- (mathematics) Incommensurable because of different kinds.
- (computing) Of a network comprising different types of computers, potentially with vastly differing memory sizes, processing power and even basic underlying architecture; alternatively, of a data resource with multiple types of formats.
- originating outside the body
- consisting of elements that are not of the same kind or nature
adj
name
noun
- Initialism of continental breakfast.
- Initialism of competition best or championship best.
- (British military) Initialism of confined to barracks.
- (soccer) Initialism of centre-back, a defensive position.
- Abbreviation of citizens' band radio.
- (textiles, sewing) Initialism of center back, a line marking the center on the back side of a piece of clothing.
- (cytology) Initialism of Cajal body.
- Abbreviation of Companion of The Most Honourable Order of the Bath.
- (Singapore) Initialism of circuit breaker.
- (American football, Gaelic football, hurling) Initialism of cornerback.
- (military, historical) The United States Navy hull classification symbol for a large cruiser.
- (speedrunning) Initialism of cruise boost.
- (physics) Initialism of centre of buoyancy.
- Initialism of conduction band.
- (Singapore, Malaysia) Initialism of cheebai.
- Initialism of citizens' band.
- (military) Initialism of construction battalion.
noun
- (chemistry) The reverse of dissociation.
- (astrophysics) The process by which the plasma of electrons and protons produced after the Big Bang condensed into hydrogen, or the epoch in which this process occurred.
- (genetics) The formation of genetic combinations in offspring that are not present in the parents.
- Combination a second or subsequent time.
- (physics) a combining of charges or transfer of electrons in a gas that results in the neutralization of ions; important for ions arising from the passage of high-energy particles
- (genetics) a combining of genes or characters different from what they were in the parents
noun
- (chemistry) The branch of chemistry that is concerned with the rates of chemical reactions.
- (mechanics) The branch of mechanics concerned with motion of objects, as well as the reason i.e. the forces acting on such bodies. This, along with kinematics constitute dynamics, which is concerned purely with the effects of forces on moving bodies.
- the branch of mechanics concerned with the forces that cause motions of bodies
adj
- (chemistry) Pertaining to chemical addition.
- (mathematics, of a function, etc.) That is distributive over addition.
- (genetics) Of or pertaining to genes (or the interaction etc. of such genes) which govern the same trait and whose effects work together on the phenotype.
- (group theory, of a group, semigroup, etc.) Whose operator is identified as addition.
- (mathematics) Pertaining to addition; that can be, or has been, added.
- characterized or produced by addition
- designating or involving an equation whose terms are of the first degree
noun
prefix
- (chemistry) Deriving from multiple sources.
- Having multiple targets or effects; the root affects or involves multiple subjects.
- Secondary or auxiliary in rank or priority.
- In conjunction: the root needs another entity to take effect, or there is a one-way interaction between them.
- Gender-mixed; having men and women together for the root activity or location.
- The difference from some fixed quantity.
- During the same time period as the root.
- Mutually: the root is done in a way that is reciprocal and bidirectional.
- Equally, equal with respect to the root.
- Moving or oriented in the same direction; co-directional.
- Dual, relating to the opposite category.
- Simultaneously, done or able to do at the same time.
- (biochemistry) Referring to coenzymes.
- Coequal, equal in rank.
- Indicating a family relationship that indicates a common rank made through three degrees of separation, the middle of which is by marriage.
- (organic chemistry) Referring to copolymers.
- Having commonality, similarity with respect to the root.
- Jointly: the root verb is done in coordination between multiple actors or entities
- Along with: the root verb is done along with or in addition to others.
- Spatially located or positioned together, co-located.
- (informal) Initialism of class of. Directly precedes a full or abbreviated year.
noun
- (chemistry) The reverse of dissociation.
- (astrophysics) The process by which the plasma of electrons and protons produced after the Big Bang condensed into hydrogen, or the epoch in which this process occurred.
- (genetics) The formation of genetic combinations in offspring that are not present in the parents.
- Combination a second or subsequent time.
- (physics) a combining of charges or transfer of electrons in a gas that results in the neutralization of ions; important for ions arising from the passage of high-energy particles
- (genetics) a combining of genes or characters different from what they were in the parents
noun
- (chemistry) The branch of chemistry that is concerned with the rates of chemical reactions.
- (mechanics) The branch of mechanics concerned with motion of objects, as well as the reason i.e. the forces acting on such bodies. This, along with kinematics constitute dynamics, which is concerned purely with the effects of forces on moving bodies.
- the branch of mechanics concerned with the forces that cause motions of bodies
adj
noun
adj
- (chemistry) In the same state of matter.
- (ring theory, of an element of a graded ring) Belonging to one of the summands of the grading (if the ring is graded over the natural numbers and the element is in the kth summand, it is said to be homogeneous of degree k; if the ring is graded over a commutative monoid I, and the element is an element of the ith summand, it is said to be of grade i)
- (of a linear differential equation) Having its degree-zero term equal to zero; admitting the trivial solution.
- (algebra, of a polynomial) Such that all its nonzero terms have the same degree.
- Having the same composition throughout; of uniform make-up.
- (probability theory, Fourier analysis, of a distribution S on Euclidean n-space (or on ℝⁿmathbf 0)) Informally: Determined by its restriction to the unit sphere. Formally: Such that, for all real t>0 and test functions ϕ( mathbf x), the equality S[t⁻ⁿϕ( mathbf x/t)]=t^(mS)[ϕ( mathbf x)] holds for some fixed real or complex m.
- Of the same kind; alike, similar.
- (of a linear map f between vector spaces graded by a commutative monoid I) Which respects the grading of its domain and codomain. Formally: Satisfying f(V_j)⊆W_i+j for fixed i (called the degree or grade of f), V_j the jth component of the grading of f 's domain, W_k the kth component of the grading of f 's codomain, and + representing the monoid operation in I.
- (geometry, of a space equipped with a group action) Informally: Everywhere the same, uniform, in the sense that any point can be moved to any other (via the group action) while respecting the structure of the space. Formally: Such that the group action is transitively and acts by automorphisms on the space (some authors also require that the action be faithful).
- (set theory, order theory, of a relation) Holding between a set and itself; being an endorelation.
- (of a first-order differential equation) Capable of being written in the form f(x,y) mathop dy=g(x,y) mathop dx where f and g are homogeneous functions of the same degree as each other.
- (linear algebra, by specialization, of a system of linear equations) Such that all the constant terms are zero.
- (mathematics) In any of several technical senses uniform; scalable; having its behavior or form determined by, or the same as, its behavior on or form at a smaller component (of its domain of definition, of itself, etc.).
- (geometry) Of or relating to homogeneous coordinates.
- The function f(x,y)#61;x²#43;x²ʸ#43;y² is not homogeneous on all of #92;mathbb#123;R#125;² because f(2,2)#61;16#92;neq 2ᵏ#42;3#61;2ᵏf(1,1) for any k, but f is homogeneous on the subspace of #92;mathbb#123;R#125;² spanned by (1,0) because f(#92;alphax,#92;alphay)#61;#92;alphax²#61;#92;alpha²f(x,y) for all (x,y)#92;in#92;operatorname#123;Span#125;#92;#123;(1,0)#92;#125;.
- (mathematical analysis, generalizing the case of polynomial functions, of a function f) Such that if each of f 's inputs are multiplied by the same scalar, f 's output is multiplied by the same scalar to some fixed power (called the degree of homogeneity or degree of f). (Formally and more generally, of a partial function f between vector spaces whose domain is a linear cone) Satisfying the equality f(s mathbf x)=sᵏᶠ(
- (of a general differential equation) Homogeneous as a function of the dependent variable and its derivatives.
- all of the same or similar kind or nature
adj
- (chemistry) Visibly consisting of different components.
- (physics, chemistry) Having more than one phase (solid, liquid, gas) present in a system or process.
- Diverse in kind or nature; composed of diverse parts.
- (mathematics) Incommensurable because of different kinds.
- (computing) Of a network comprising different types of computers, potentially with vastly differing memory sizes, processing power and even basic underlying architecture; alternatively, of a data resource with multiple types of formats.
- originating outside the body
- consisting of elements that are not of the same kind or nature
adj
name
noun
- Initialism of continental breakfast.
- Initialism of competition best or championship best.
- (British military) Initialism of confined to barracks.
- (soccer) Initialism of centre-back, a defensive position.
- Abbreviation of citizens' band radio.
- (textiles, sewing) Initialism of center back, a line marking the center on the back side of a piece of clothing.
- (cytology) Initialism of Cajal body.
- Abbreviation of Companion of The Most Honourable Order of the Bath.
- (Singapore) Initialism of circuit breaker.
- (American football, Gaelic football, hurling) Initialism of cornerback.
- (military, historical) The United States Navy hull classification symbol for a large cruiser.
- (speedrunning) Initialism of cruise boost.
- (physics) Initialism of centre of buoyancy.
- Initialism of conduction band.
- (Singapore, Malaysia) Initialism of cheebai.
- Initialism of citizens' band.
- (military) Initialism of construction battalion.
adj
- (chemistry) Pertaining to chemical addition.
- (mathematics, of a function, etc.) That is distributive over addition.
- (genetics) Of or pertaining to genes (or the interaction etc. of such genes) which govern the same trait and whose effects work together on the phenotype.
- (group theory, of a group, semigroup, etc.) Whose operator is identified as addition.
- (mathematics) Pertaining to addition; that can be, or has been, added.
- characterized or produced by addition
- designating or involving an equation whose terms are of the first degree