Unlike Paley, Behe only attempts to prove the existence of an intelligent designer, rather than the God of classical theism.

Frederick Apthorp Paley ( January 14, 1815-December 8, 1888 ), was an English classical scholar.

* Frederick Apthorp Paley ( 1815 – 1888 ), English classical scholar

* 1787 – Floyer Sydenham, English classical scholar ( b. 1710 )

The majority Arminian view accepts classical theism – the belief that God's power, knowledge, and presence have no external limitations, that is, outside of His divine nature.

André-Marie Ampère ( 20 January 1775 – 10 June 1836 ) was a French physicist and mathematician who is generally regarded as one of the main founders of the science of classical electromagnetism, which he referred to as " electrodynamics ".

Note that the above formula is only applicable to classical ideal gases and not Bose – Einstein or Fermi gases.

In 1788 Jean Jacques Barthelemy ( 1716 – 95 ), a highly esteemed classical scholar and Jesuit, published The Travels of Anacharsis the Younger in Greece, about a young Scythian descended from Anacharsis.

What they and many others of that generation in the Nordic countries had in common was that they started off from a classical education and were first designing in the so-called Nordic Classicism style – a style that had been a reaction to the previous dominant style of National Romanticism – before moving, in the late 1920s, towards Modernism.

The shift in Aalto's design approach from classicism to modernism is epitomised by the Viipuri Library ( 1927 – 35 ), which went through a transformation from an originally classical competition entry proposal to the completed high-modernist building.

Alfonso Leng ( 11 February 1894 – 11 November 1974 ) was a post-romantic composer of classical music and dentist.

The Ababda or Ababde – the Gebadei of Pliny, and possibly the Troglodytes of other classical writers – are nomads living in the area between the Nile and the Red Sea, in the vicinity of Aswan in Egypt.

Alfred Edward Housman (; 26 March 1859 – 30 April 1936 ), usually known as A. E. Housman, was an English classical scholar and poet, best known to the general public for his cycle of poems A Shropshire Lad.

In the classical limit, i. e. at large values of or at small density of states — when wave functions of particles practically do not overlap — both the Bose – Einstein or Fermi – Dirac distribution become the Boltzmann distribution.

For example in the case of anthrax, it is likely that by 24 – 36 hours after an attack, some small percentage of individuals ( those with compromised immune system or who had received a large dose of the organism due to proximity to the release point ) will become ill with classical symptoms and signs ( including a virtually unique chest X-ray finding, often recognized by public health officials if they receive timely reports ).

This classical model was then improved by Arnold Sommerfeld who incorporated the Fermi-Dirac statistics of electrons and was able to explain the anomalous behavior of the specific heat of metals in the Wiedemann – Franz law.

* Classical or Angkor Wat Style ( 1080 – 1175 ): Angkor Wat, the temple and perhaps the mausoleum of King Suryavarman II, is the greatest of the Angkorian temples and defines what has come to be known as the classical style of Angkorian architecture.

The Song Dynasty is considered by many to be classical China's high point in science and technology, with innovative scholar-officials such as Su Song ( 1020 – 1101 ) and Shen Kuo ( 1031 – 1095 ).

* Typical modern six-string classical guitars are 48 – 54 mm wide at the nut, compared to around 42 mm for electric guitars.

The modern full size classical guitar has a scale length of around 650 mm ( 25. 6 inches ), with an overall instrument length of 965 – 1016 mm ( 38-40 inches ).

* WIAA ( 88. 7 FM, Interlochen ) – classical music " IPR Music Radio "

The term " concept " is traced back to 1554 – 60 ( Latin conceptum-" something conceived "), but what is today termed " the classical theory of concepts " is the theory of Aristotle on the definition of terms.

The Viking siege of Paris ( 885 – 6 A. D .) “ saw the employment by both sides of virtually every instrument of siege craft known to the classical world, including a variety of catapults ,” to little effect, resulting in failure.

Unlike other schemes, this definition includes the objects with major semi-axis less than 39. 4 AU ( 2: 3 resonance ) – named Inner classical belt, or more than 48. 7 ( 1: 2 resonance ) – named Outer classical belt while reserving the term Main classical belt for the orbits between these two resonances.

Wiener's original construction only applied to the space of real-valued continuous paths on the unit interval, known as classical Wiener space.

Originally performed 15 February 1867 at a concert of the Wiener Männergesangsverein ( Vienna Men's Choral Association ), it has been one of the most consistently popular pieces of music in the classical repertoire.

He is more accurately described as a follower of G. H. Hardy, and can be placed in the group containing Norbert Wiener and Torsten Carleman who were moderate modernisers of classical Fourier analysis.

Hans von Hebra ( 1847 – 1902 ) wrote the classical description of the disease in a paper published in the January 1870 issue of the Wiener Medizinische Wochenschrift.

He spent several years in the early 1970s in Vienna training in a classical course in psychoanalysis at the Wiener Arbeitskreis für Tiefenpsychologie ( Viennese Association for Depth Psychology ).

Teleogenesis refers from an extension of classical cybernetics, as proposed by Norbert Wiener, Ashby and others in late 1950s.

He shifted attention from the study of individual varieties to the relative point of view ( pairs of varieties related by a morphism ), allowing a broad generalization of many classical theorems.

Compactness in this more general situation plays an extremely important role in mathematical analysis, because many classical and important theorems of 19th century analysis, such as the extreme value theorem, are easily generalized to this situation.

Examples of early theorems from classical model theory include Gödel's completeness theorem, the upward and downward Löwenheim – Skolem theorems, Vaught's two-cardinal theorem, Scott's isomorphism theorem, the omitting types theorem, and the Ryll-Nardzewski theorem.

Many theorems from classical geometry hold true for this spherical geometry as well, but many do not ( see parallel postulate ).

Also, he stated that Euclid's system of proving geometry theorems was unique to the classical Greeks and did not evolve similarly in other mathematical cultures in China, India, and Arabia.

In classical logic, both and also are theorems.

Because many classically valid tautologies are not theorems of intuitionistic logic, but all theorems of intuitionistic logic are valid classically, intuitionistic logic can be viewed as a weakening of classical logic, albeit one with many useful properties.

Most of the classical identities are only theorems of intuitionistic logic in one direction, although some are theorems in both directions.

* Reciprocity ( electromagnetism ), theorems relating sources and the resulting fields in classical electromagnetism

What follows is an incomplete list of the most classical theorems in Riemannian geometry.

Cramér knew that a radical change was needed in this field, and in a paper in 1926 said, " The probability concept should be introduced by a purely mathematical definition, from which its fundamental properties and the classical theorems are deduced by purely mathematical operations.

Generally speaking, constructive analysis can reproduce theorems of classical analysis, but only in application to separable spaces ; also, some theorems may need to be approached by approximations.

Furthermore, many classical theorems can be stated in ways that are logically equivalent according to classical logic, but not all of these forms will be valid in constructive analysis, which uses intuitionistic logic.

Some logicians, while accepting that classical mathematics is correct, still believe that the constructive approach gives a better insight into the true meaning of theorems, in much this way.

Here is a short list of global results concerning manifolds with positive Ricci curvature ; see also classical theorems of Riemannian geometry.

Several generalizations of now classical index theorems allow for effective extraction of numerical invariants from spectral triples.

For Metzinger, along with to some extent both Gleizes and Malevich, the classical vision had been an incomplete representation of real things, based on an incomplete set of laws, postulates and theorems.

With increasing level of generality, it turns out, an increasing amount of technical background is helpful or necessary to understand these theorems: the modern formulation of both these dualities can be done using derived categories and certain direct and inverse image functors of sheaves, applied to locally constant sheaves ( with respect to the classical analytical topology in the first case, and with respect to the étale topology in the second case ).

These thinkers seem to have maintained a modified observational standpoint for the introduction of natural numbers, for the principle of complete induction < nowiki ></ nowiki > For these, even for such theorems as were deduced by means of classical logic, they postulated an existence and exactness independent of language and logic and regarded its non-contradictority as certain, even without logical proof.