简单汉语中“Orphism”的意思
俄耳甫斯
orphism
(orphism) 俄耳甫斯教(orphism)被定义为古希腊的一种神秘宗教,公元前6世纪后广泛传播,结合了前希腊化时期的信仰、色雷斯人对(狄奥尼修斯)扎格勒斯的崇拜等。
含义:[奥弗斯教]
Derived forms
Orphistic
_
_
形容词
orphism是一个英语单词,有几个不同的含义。 让我们用例句来解释每个的含义和用法!
For instance the rejuvenating Eros in the
Orphism
, the organising divine principle of the Universe at Empedocles, the heroic enthusiasm of G. Bruno, the unifying principle of the heaven (+) and earth (+), of the finite and infinite at the German romantics.
例如,在德国,爱欲使俄
耳甫斯主义
中的有限和无限焕发活力,而俄耳甫斯主义是恩培多克勒(Empedocles)中组织宇宙的神圣原则,G.布鲁诺的英雄热情,天(+)地合一的原则,浪漫主义。
The creation of religious sects, such as “orfikes”, the establishment of mystiriakwn religions, the establishment of an Association of “wise men”, as was the Pythagorikos, reveal in different conditions and in different circles, the same great social movement enlargement and proliferation of a sacred aristocratic tradition “The
orphism
is a religious movement that, like ALBIN LESKY observes in the HISTORY of ANCIENT GREEK LITERATURE, the importance of the was overpriced too in some seasons, to renounce following almost totally with radical skepticism. Whether this move has developed from purely Greek startups, whether it was related to the teaching of the Orient for the wandering of souls, are problems that their solution is not easy. But it is not foreign drop inside the Greek blood, but synanikei the image of the Greek world.
奥菲斯等教派的创立,神秘宗教的建立,“智慧”社会的建立,是毕达哥拉斯在不同的条件和不同的周期中出现,神圣的同一个伟大的社会运动的扩展和传播。贵族传统
奥尔弗斯
主义是一种宗教运动,阿尔宾·莱斯基在古希腊文学史上有过这样的评论,在某些时期过于自信的重要性,然后几乎完全被激进的怀疑论所抛弃,这个运动是否是从纯粹的希腊初创发展而来,是否这与东方对漂泊灵魂的教育有关,存在着不易解决的问题,但在希腊的血液中,存在并没有堕落,而是与希腊世界的形象融为一体。
The Frobenius
morphism
on A sends a to ap.
A 上的
Frobenius 映射
将 a 映射到 ap。
The absolute Frobenius
morphism
is a natural transformation from the identity functor on the category of Fp-schemes to itself.
绝对
Frobenius 映射
是从 Fp 方案上的恒等函子到其自身的自然变换。
In this context, the standard example is Cat, the 2-category of all (small) categories, and in this example, bimorphisms of
morphisms
are simply natural transformations of
morphisms
in the usual sense.
最标准的例子是 Cat,由所有(小)类别组成的 2 类别,其中函子适用于态射,函子的自然变换适用于态射。
All of these classes of orders can be cast into various categories of dcpos, using functions which are monotone, Scott-continuous, or even more specialized as
morphisms
.
所有这些类型的阶都被分配到使用单调映射、斯科特连续映射或各种更专业的映射作为
态射
的 dcpo 类别。
Morphisms
in the categories are given by the massless spectrum of open strings stretching between two branes.
范畴的
态射
是由串在两个膜之间的无质量的开弦谱给出的。
Dually, a universal
morphism
from U to X is a terminal object in (U X).
对偶而言,从 U 到 X 的全向态
射
是 (U X) 中的终结对象。
A
morphism
of diagrams of type J in a category C is a natural transformation between functors.
类别 C 上的 J 型图的
态射
指的是这些函子之间的自然变换。
If C and D are both preadditive categories (i.e. their
morphism
sets are abelian groups and the composition of
morphisms
is bilinear), then we can consider the category of all additive functors from C to D, denoted by Add(C, D).
如果C和D都是预加性范畴(即态射集合是
阿贝尔
群,
态射
的
复合
是双线性的),那么我们可以考虑从C到D所有加性函子的范畴,并将Add写成如(C,D)。
If J is directed then a diagram of type J is called a direct system of objects and
morphisms
.
当 J 有向时,J 型图
被称为
由对象和态射组成的直线
。
More generally, the cokernel of a
morphism
f: X -> Y in some category (e.g. a homomorphism between groups or a bounded linear operator between Hilbert spaces) is an object Q and a
morphism
q: Y -> Q such that the composition q f is the zero
morphism
of the category, and furthermore q is universal with respect to this property.
更一般地,
在某个范畴中,
态射 f 的
辅
核: 使得 q f 是该范畴的零
态射
,此外,q 对于该性质是通用的。
The definitions are the same (note that in definitions above we never needed to use composition of
morphisms
in J).
这种情况下的定义与上面相同(注意上面的定义根本没有使用 J 的
态射
的
复合
)。
The actual objects and
morphisms
in J are largely irrelevant; only the way in which they are interrelated matters.
J 的实际对象和
态射
没有特定的含义 – 只有它们的连接方式才有意义。
If f is a linear map from N1 to N2 such that the image of every cone of Δ1 is contained in a cone of Δ2, then f induces a
morphism
f* between the corresponding toric varieties.
如果f是从N1到N2的线性映射,使得Δ1的所有圆锥体的图像都包含在Δ2的圆锥体中,则f导致相应的复曲面流形之间的
映射
f*。
In this software, diagrams represent equations of morphisms.Users can prove an equation of
morphisms
by “paste the diagrams”.
使用该软件,您可以通过使用图表表示
态射
方程并将其粘贴来证明态射方程。
The preperiodic points of self-
morphisms
on semi-abelian varieties | Department of Mathematics Kyoto University For a rational point of algebraic variety defined over a number field, the height is an important quantity.
关于半阿贝尔
簇
的自同构伪周期点 | 京都大学数学系 对于在有理数域等数论域上定义的代数簇的有理点,一个称为高度的重要量是 be。
Another natural generalization is to replace self-maps of P1 or PN with self-maps (
morphisms
) V -> V of other affine or projective varieties.
另一种自然推广是用其他仿射簇 V -> V 或射影簇上的自映射来替换 P1 和 PN 的自映射。
Writing “f: A -> B” for a partial function from A to B is almost always an abuse of notation, but not in a category theoretic context, where f can be seen as a
morphism
in the category of sets and partial functions.
将从 A 到 B 的偏函数写为“f: A -> B”几乎总是对符号的滥用,但如果我们将 f 视为集合范畴
中的态射和偏函数的上下文,
那么这并不是一种滥用。范畴论。
In algebraic geometry, the notion of a fiber of a
morphism
of schemes must be defined more carefully because, in general, not every point is closed.
在代数几何中,必须更仔细地定义方案的
形态
纤维的概念,因为通常并非所有点都是封闭的。
听听“ orphism ”的陆地声音(发音)!
读法是【ˈɔːfɪzəm】。 听下面的视频并大声发音【ˈɔːfɪzəm】。