A classical guitar's frets, fretboard, tuners, headstock, all attached to a long wooden extension, collectively constitute its neck.

Elizabeth visited in 1566 and 1568, by which time Leicester had commissioned the royal architect Henry Hawthorne to produce plans for a dramatic, classical extension of the south side of the inner court.

" An obvious extension to classical two-valued logic is a many-valued logic for more than two possible values.

of quantization, the deformation extension from classical to quantum mechanics.

This view of the scientific revolution reduces it to a period of relearning classical ideas that is very much an extension of the renaissance, specifically relearning ideas that originated with somebody other than Aristotle and particularly those rooted in the schools of Plato and Pythagoras.

An obvious extension to classical two-valued logic is an n-valued logic for n greater than 2.

Fuzzy sets were introduced simultaneously by Lotfi A. Zadeh and Dieter Klaua in 1965 as an extension of the classical notion of set.

Historically, equations of motion initiated in classical mechanics and the extension to celestial mechanics, to describe the motion of massive objects.

By extension, outside of classical logic, one can speak of contradictions between actions when one presumes that their motives contradict each other.

Bonaventura Cavalieri's method of indivisibles led to an extension of the results of the classical authors.

Ritzer ’ s idea of McDonaldization is an extension of Max Weber ’ s ( 1864 – 1920 ) classical theory of the rationalization of modern society and culture.

From the point of view of Lie theory, the classical unitary group is a real form of the Steinberg group, which is an algebraic group that arises from the combination of the diagram automorphism of the general linear group ( reversing the Dynkin diagram A < sub > n </ sub >, which corresponds to transpose inverse ) and the field automorphism of the extension C / R ( namely complex conjugation ).

Hence, formal concept analysis is oriented towards the categories extension and intension of linguistics and classical conceptual logic.

In 1992 Huet and Coquand introduced the calculus of constructions, a type theory with an impredicative universe, thus combining Type Theory with Girard's System F. This extension is not universally accepted by Intuitionists since it allows impredicative, i. e. circular, constructions, which are often identified with classical reasoning.

An “ open dynamical system ” is an extension of classical dynamical systems theory.

By extension, the term is also used to describe, for example, Chinese literature not written in classical Chinese and Indian literature after Sanskrit.

In a classical ballet class, the Adagio portion of the lesson concentrates on slow movements to improve the dancer's ability to control the leg and increase extension ( i. e., to bring the leg into high positions with control and ease ).

The conformal field theories are also related to compact Lie group in which the classical phase consists of a central extension of the loop group.

These six visual cognates provide an extension of classical rhetoric that can be used as a starting point for analyzing images rhetorically.

Traditionally, less use has been made of extension in church organs and those designed for classical music, with authorities tending to regard borrowing in general and extension in particular as things to be avoided if possible, except in a few cases where space for pipes is limited, making extension and / or unification necessary.

Using Robert Steinberg's work on universal central extensions of classical algebraic groups, John Milnor defined the group K < sub > 2 </ sub >( A ) of a ring A as the center, isomorphic to H < sub > 2 </ sub >( E ( A ), Z ), of the universal central extension of the group E ( A ) of infinite elementary matrices over A.

In continuous time, the result can be seen as an extension of earlier work in classical physics on the Hamilton-Jacobi equation by William Rowan Hamilton and Carl Gustav Jacob Jacobi.

The Fourier transform is an extension of the Fourier series that results when the period of the represented function is lengthened and allowed to approach infinity.

The Fourier-related transforms that operate on a function over a finite domain, such as the DFT or DCT or a Fourier series, can be thought of as implicitly defining an extension of that function outside the domain.

The DFT, like the Fourier series, implies a periodic extension of the original function.

The Fourier-related transforms that operate on a function over a finite domain, such as the DFT or DST or a Fourier series, can be thought of as implicitly defining an extension of that function outside the domain.

The DFT, like the Fourier series, implies a periodic extension of the original function.

Fourier is credited by modern scholars with having originated the word féminisme in 1837 ; as early as 1808, he had argued, in the Theory of the Four Movements, that the extension of the liberty of women was the general principle of all social progress, though he disdained any attachment to a discourse of ' equal rights '.

This implies that the Fourier transform map restricted to L < sup > 1 </ sup >( R ) ∩ L < sup > 2 </ sup >( R ) has a unique extension to a linear isometric map L < sup > 2 </ sup >( R ) → L < sup > 2 </ sup >( R ).

For more details about this quantization in the case n = 1 ( and an extension using the Fourier transform to integrable (" most ") functions, not just polynomial functions ), see Weyl quantization.

However, like the Fourier Transform, the domain can be extended by a density argument to include some functions whose above integral is not finite, for example ; this extension will not be discussed in this article.

A group action is an extension to the definition of a symmetry group in which every element of the group " acts " like a bijective transformation ( or " symmetry ") of some set, without being identified with that transformation.

This also represents the beginning of the individual ’ s transformation into the greater sense of: belonging to the nation and by extension, collective humanity.

By extension, the word has also been used to mean any sort of recurring theme, ( whether or not subject to developmental transformation ) in music, literature, or ( metaphorically ) the life of a fictional character or a real person.

Let K be a field and L a finite extension ( and hence an algebraic extension ) of K. Multiplication by α, an element of L, is a K-linear transformation

Theory of functions of a complex variable: He greatly extended the theory of conformal transformation proving his theorem about the extension of conformal mapping to the boundary of Jordan domains.

Departing from the worker ’ s movement, which was central to the political aim of gaining access for the working class with the extension of citizenship and representation, new social movements such as youth culture movement concentrate on bringing about social mobilization through cultural innovations, development of new life-styles and transformation of identities.

* Easy adaptation and extension of Objecteering using MDA technology ( UML profiles, Java API and transformation wizards, model transformation, MDA components, …)

Ruwet argued that the most striking characteristic of musical syntax was the central role of repetition-and, by extension, of varied repetition or transformation ( Ruwet 1987 )" ( Middleton 1990 / 2002, p. 183 ).

Another important work is the extension of the Gothenburg City Hall building which Asplund started on 1917 and finished 1937-it shows his transformation from neo-classical to functionalist architect, a transformation in parallel with other European modernists like Erich Mendelsohn.

The garden surroundings of the Petit Trianon, of which the hameau de la Reine is an extension, began their transformation from formal pattern gardens.

Marah's powers consist of energy projection, combat techniques, shielding, flight, clothes transformation, and weapon-hand extension, martial arts skills and teleportation.

Formally, the right Kan extension of along consists of a functor and a natural transformation which is couniversal with respect to the specification, in the sense that for any functor and natural transformation, a unique natural transformation is defined and fits into a commutative diagram

:< div style =" text-align: left ;"> Image: Right Kan extension universal property diagram. PNG </ div > ( where is the natural transformation with for any object of ).

This gives rise to the alternate description: the left Kan extension of along consists of a functor and a natural transformation which are universal with respect to this specification, in the sense that for any other functor and natural transformation, a unique natural transformation exists and fits into a commutative diagram:

:< div style =" text-align: left ;"> Image: Kan extension universal property diagram. png </ div > ( where is the natural transformation with for any object of ).

Newman has written other articles on the nexus of education and culture in North India, Muslim education, Indian Jews, Hindi films, a comparison of the Vietnamese and Cambodian revolutions, the transformation of knowledge in Albania, and on extension education and approaches to agricultural development.