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TRACES provides EU legislation covering the required field for each certificate, imposes the physical checks applicable and the reinforced checks. In case of serious threat or disease outbreak the Commission can activate via TRACES the necessary safeguard measures through a 20 May 1994 decision of the Commission 94/360/CE [ 26 ] which deals ...
One of the many difficulties of expressing Jacques Derrida's project (deconstruction) in simple terms is the enormous scale of it.Just to understand the context of Derrida's theory, one needs to be acquainted intimately with philosophers such as Socrates–Plato–Aristotle, René Descartes, Immanuel Kant, Georg Wilhelm Friedrich Hegel, Charles Sanders Peirce, Jean-Jacques Rousseau, Karl Marx ...
A trace diagram representing the adjugate of a matrix. In mathematics, trace diagrams are a graphical means of performing computations in linear and multilinear algebra. They can be represented as (slightly modified) graphs in which some edges are labeled by matrices. The simplest trace diagrams represent the trace and determinant of a matrix.
The trace of a Hermitian matrix is real, because the elements on the diagonal are real. The trace of a permutation matrix is the number of fixed points of the corresponding permutation, because the diagonal term a ii is 1 if the i th point is fixed and 0 otherwise. The trace of a projection matrix is the dimension of the target space.
Traces, Texas, US; TRACES, Trade Control and Expert System, a web-based veterinarian certification tool; Traces, a 2019 British crime drama; Traces (software), an Amiga ray trace engine written by Ton Roosendaal
When L/K is separable, the trace provides a duality theory via the trace form: the map from L × L to K sending (x, y) to Tr L/K (xy) is a nondegenerate, symmetric bilinear form called the trace form. If L/K is a Galois extension, the trace form is invariant with respect to the Galois group.
The trace operator can be defined for functions in the Sobolev spaces , with <, see the section below for possible extensions of the trace to other spaces. Let Ω ⊂ R n {\textstyle \Omega \subset \mathbb {R} ^{n}} for n ∈ N {\textstyle n\in \mathbb {N} } be a bounded domain with Lipschitz boundary.
In mathematics, a singular trace is a trace on a space of linear operators of a separable Hilbert space that vanishes on operators of finite rank. Singular traces are a feature of infinite-dimensional Hilbert spaces such as the space of square-summable sequences and spaces of square-integrable functions. Linear operators on a finite-dimensional ...