英文字典中文字典


英文字典中文字典51ZiDian.com



中文字典辞典   英文字典 a   b   c   d   e   f   g   h   i   j   k   l   m   n   o   p   q   r   s   t   u   v   w   x   y   z       







请输入英文单字,中文词皆可:

modeled    音标拼音: [m'ɑdəld]
pp. 形成模式

形成模式

modeled
adj 1: resembling sculpture; "her finely modeled features";
"rendered with...vivid sculptural effect"; "the
sculpturesque beauty of the athletes' bodies" [synonym:
{modeled}, {sculptural}, {sculptured}, {sculpturesque}]

modeled \modeled\ adj.
resembling sculpture; as, her finely modeled features.

Syn: sculptural, sculptured, sculpturesque.
[WordNet 1.5]


Model \Mod"el\, v. t. [imp. & p. p. {Modeled}or {Modelled}; p.
pr. & vb. n. {Modeling} or {Modelling}.] [Cf. F. modeler, It.
modellare.]
To plan or form after a pattern; to form in model; to form a
model or pattern for; to shape; to mold; to fashion; as, to
model a house or a government; to model an edifice according
to the plan delineated.
[1913 Webster]

安装中文字典英文字典查询工具!


中文字典英文字典工具:
选择颜色:
输入中英文单字

































































英文字典中文字典相关资料:


  • quantum gate - Physical Interpretation of Pauli Matrices as . . .
    I was wondering what would these matrices would represent in the physical world I know that they can measure quantum state and get certain results Would I be wrong if I assume that σx σ x measures the Diagonal polarization of a photon or σz σ z represents the measurement of vertical horizontal polarization of a photon?
  • Can arbitrary matrices be decomposed using the Pauli basis?
    Indeed, note that Therefore the complex span of Pauli matrices can be used to generate arbitrary 2 × 2 matrices This then translates into the same result for arbitrary 2n -dimensional spaces, as if V ≡ {vk} is a basis for V, then the sets of tensor products of elements of V form a basis for V ⊗ n
  • How can I decompose a matrix in terms of Pauli matrices?
    I need to see an example of how Hamiltonian, i e any Hermitian matrix, can be decomposed into a linear combination of Pauli matrices I would prefer an option to do this in larger than 2 dimension
  • textbook and exercises - How are the Pauli $X$ and $Z$ matrices . . .
    How are the Pauli X X and Z Z matrices expressed in bra-ket notation? [duplicate] Ask Question Asked 4 years, 8 months ago Modified 6 months ago
  • higher dimensional Pauli matrices? - Mathematics Stack Exchange
    Pauli matrices are essentially 4-dimensional split-complex numbers Split-complex numbers can be only 2n -dimensional Particularly, the 8-dimensional split-complex space can be represented with real matrices as:
  • Linear combination of Pauli matrices and projectors
    Premise: this is exercise 2 60 of Quantum Computation and Quantum Information, by Nielsen and Chuang, where I'm currently stuck Suppose $\\vec{v}$ is any real three-dimensional unit vector, and $\\
  • Trace of product of three Pauli matrices - Mathematics Stack Exchange
    i e the identity matrix and the three Pauli matrices For the trace of the product of any two matrices σμ one has the identity tr(σμσν) = 2δμν I was wondering if a similar identity can be derived for the product of three sigma matrices, tr(σμσνσλ) =?
  • How are arbitrary $2\\times 2$ matrices decomposed in the Pauli basis?
    This is about general decomposition of 2 × 2 2 × 2 matrices in the Pauli basis; the other question is less clear, but seems to be about decompositions in the multipartite case
  • In what sense are Pauli matrices intertwiners?
    Pauli matrices are indeed an intertwining map A quick look is by checking the indices: σiab, where i is the su(2) vector index and a, b are su(2) spin indices Similarly, the Γ matrices are also an intertwining map, σμ˙ab, where ˙ab is the standard dotted-undotted notation, and the indices run over finite-dim representations of sl(2, C) For a more precise answer we need to specify the
  • How come the Pauli Matrices are the generators of SU (2)
    The Pauli matrices are not themselves part of SU(2) S U (2) (as a Lie group), but rather they are part of its generating Lie algebra, in the sense that they form a basis from which you can write down (using a map from the algebra to the group) any element of SU(2) S U (2)





中文字典-英文字典  2005-2009