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searching for Multiplication operator 49 found (72 total)

alternate case: multiplication operator

Operand (1,163 words) [view diff] exact match in snippet view article find links to article

In the above expression '(3 + 5)' is the first operand for the multiplication operator and '2' the second. The operand '(3 + 5)' is an expression in itself

flexible. Similarly, a nonassociative algebra is flexible if its multiplication operator is flexible. Every commutative or associative operation is flexible

field with a decomposition into "even" and "odd" pieces and a multiplication operator that respects the grading. The prefix super- comes from the theory

μ-almost everywhere. An essentially bounded h induces a bounded multiplication operator Th on Lp(μ): ( T h f ) ( s ) = h ( s ) ⋅ f ( s ) . {\displaystyle

character set, and the asterisk * became the de facto symbol for the multiplication operator. This selection is reflected in the numeric keypad on English-language

L2(X, μ) as follows: Each f ∈ L∞(X, μ) is identified with the multiplication operator ψ ↦ f ψ . {\displaystyle \psi \mapsto f\psi .} Of particular importance

Generally, any self-adjoint operator T is unitarily equivalent to a multiplication operator; this means that for many purposes, T can be considered as an operator

the identity operator and M h {\displaystyle M_{h}} denotes the multiplication operator by the random variable h ∈ H {\displaystyle h\in {\mathcal {H}}}

an abelian group with respect to the addition operator, and the multiplication operator is associative, is distributive over the addition operation, and

\mapsto \mathrm {e} ^{\mathrm {i} nt},\quad n\geq 0,\,} is the multiplication operator Mφ with the function φ = e 1 {\displaystyle \varphi =e_{1}} . More

subclass of the games called the surreal numbers, there exists a multiplication operator that extends this group to a field. For impartial misère play games

operator ∂ {\displaystyle \partial } , and y {\displaystyle y} by the multiplication operator m f : g ↦ f g {\displaystyle m_{f}:g\mapsto fg} , we get ad ⁡ (

syntax to be context-sensitive. The syntax for expressions let the multiplication operator be omitted, e.g., 3a was treated as 3*a, and a(i+j) was treated

addition in the finite field) which is the same as the finite field's multiplication operator, i.e. i λ = ( 1 + … + 1 ) λ = λ + … + λ . {\displaystyle i\lambda

{\displaystyle D+M^{*}} where M ∗ {\displaystyle M^{*}} now denotes the multiplication operator by the logarithmic derivative G ′ G {\displaystyle {\frac {G'}{G}}}

eigenvalues with the corresponding multiplicities. Choosing a basis, the multiplication operator is represented by its coefficient matrix A, the companion matrix

measure on the line R , {\displaystyle \mathbb {R} ,} then the multiplication operator ( A f ) ( x ) = x f ( x ) {\displaystyle (Af)(x)=xf(x)} is self-adjoint

example, groups have a signature containing two operators: the multiplication operator m, taking two arguments, and the inverse operator i, taking one

compliance, some implementations interpret the x character as a multiplication operator for both block size and count option values. For example, bs=2x80x18b

{\displaystyle \ell ^{p}} and a sequence (tn) converging to zero, the multiplication operator (Tx)n = tn xn is compact. For some fixed g ∈ C([0, 1]; R), define

product of two arrays can be implemented using the native matrix multiplication operator. If a is a row vector of size [1 n] and b is a corresponding column

is the average number of sentences per 100 words. Note that the multiplication operator is often omitted (as is common practice in mathematical formulas

successor of b. Analogously, given that addition has been defined, a multiplication operator × {\displaystyle \times } can be defined via a × 0 = 0 and a ×

In Fortran, R, APL, J and Wolfram Language (Mathematica), the multiplication operator * or × apply the Hadamard product, whereas the matrix product is

with the tensor product ⊗, which is used to define the bilinear multiplication operator of the tensor algebra. The two act in different spaces, on different

orthogonal polynomials in general are no longer commutative in the multiplication operator with respect to the inner product, i.e. ⟨ x p n , p s ⟩ W n , 2

In Python 3.5 and up, it is also used as an overloadable matrix multiplication operator. In R and S-PLUS, it is used to extract slots from S4 objects.

example is that of row and column vectors under the usual matrix multiplication operator: in one order they yield the dot product, which is just a scalar

though, in the momentum basis, this operator amounts to a mere multiplication operator (by iħp). That is, to say, ⟨ r | p ^ = − i ℏ ∇ ⟨ r |   , {\displaystyle

e.g. 5**3 == 125 and 9**0.5 == 3.0; it also offers the matrix‑multiplication operator @ . These operators work as in traditional mathematics; with the

when suitably interpreted, behave like the number 3 and like the multiplication operator, q.v. Church encoding. Lambda calculus is known to be computationally

{\displaystyle \ell ^{2}\left(\mathbb {Z} \right).} Since V is usually a multiplication operator on ℓ 2 ( Z ) , {\displaystyle \ell ^{2}(\mathbb {Z} ),} we get

translates into "push four and five onto the stack, then, with the multiplication operator, pop two elements from the stack, multiply them and push the result

{\displaystyle {\Delta }_{\rho }^{2}} vanishes. If one introduces the left multiplication operator L a {\displaystyle L_{a}} as L a ( b ) := a b , {\displaystyle

obtained by shifting the spectrum of C by 1. Let H = L2([0, 1]). The multiplication operator M defined by ( M f ) ( x ) = x f ( x ) , f ∈ H , x ∈ [ 0 , 1 ]

scalar addition operator ( ⊕ {\displaystyle \oplus } ) A scalar multiplication operator ( ⊗ {\displaystyle \otimes } ) A set (or domain) Note that the

{\displaystyle \sigma (T)} , so that the self-adjoint operator becomes a multiplication operator on the space of functions on its spectrum with inner product given

111 = equality relation 212 < less than relation 112 + addition operator 236 × multiplication operator 362 ( left parenthesis 323 ) right parenthesis

left exponential YX and the right exponential XY, because the multiplication operator for matrix-to-matrix is not commutative. Moreover, If X is normal

for the first asterisk in the definition of "term", which is the multiplication operator; parentheses group objects; and an epsilon ("ε") signifies the

transform. Equivalently, T is the conjugation of the pointwise multiplication operator by the Fourier transform. Thus one can think of multiplier operators

this class became the surreal numbers. Finally, he developed the multiplication operator, and proved that the surreals are actually a field, and that it

satisfy for all functions f {\displaystyle f} (with associated multiplication operator f ^ {\displaystyle {\hat {f}}} ) is ( v ( f ) ) ( q ) = Re ⁡ (

Hilbert–Schmidt operators. Similar their commutators with the multiplication operator corresponding to a smooth function f on the circle is also Hilbert–Schmidt

for the first asterisk in the definition of "term", which is the multiplication operator; parentheses group objects; and an epsilon ("ε") signifies the

a field k of characteristic ≠ 2. For a in A define the Jordan multiplication operator on A by L ( a ) b = a b {\displaystyle \displaystyle {L(a)b=ab}}

L2(C) defined on the Fourier transform of an L2 function f as a multiplication operator: T f ^ ( z ) = z ¯ z f ^ ( z ) . {\displaystyle \displaystyle {\widehat

then ω is a square integrable continuous 1-form. Note that the multiplication operator m(φ) given by m(φ)α = φ ⋅ α for φ in Cc(X) and α in Ω1 c(X) satisfies

[\gamma ]} . The holonomy operator in the loop representation is the multiplication operator, h ^ γ Ψ [ η ] = h γ Ψ [ η ] {\displaystyle {\hat {h}}_{\gamma