invariant characteristicの例文

Absolute integral invariant

"' Hermann Vermeil "'( 1889 1959 ) was a German mathematician who produced the first published proof that the scalar curvature is the only absolute invariant among those of prescribed typ......

His theory of adiabatic invariants was important in fusion research. The conclusion was that the quantities to quantize must be adiabatic invariants. where the integral is between the two ......

Adiabatic invariant of eddy

Adiabatic invariant of vortex

"Classical " knot invariants include the knot group, which is the fundamental group of the knot complement, and the Alexander polynomial, which can be computed from the Alexander invariant......

The algebraic invariant that recovers the Riemannian structure is a spectral triple. He worked mainly on algebraic invariants, and geometry. Geometric invariants of the orbit translate int......

Each of the CCP modules consists of around 60 amino acids with four cysteine residues disulfide bonded in a 1-3 2-4 arrangement, and a hydrophobic core built around an almost invariant try......

They describe properties of analytic invariants, called local zeta functions, of the number of points on an algebraic curve or variety of higher dimension.

The Arf invariant is defined to be the product ab. The " Arf invariant " of the knot is the residue of Then the Arf invariant of this quadratic form can be used to distinguish the two extr......

The Arf invariant is particularly framing, and thus the Arf Kervaire invariant and the Arf invariant of a knot. Now we can define the Arf invariant of a knot to be 0 if it is pass-equival......

In 1997, he discovered relationships between the Fourier coefficients of derivatives of Siegel Eisenstein series and arithmetic invariants of Shimura varieties ( heights pairings of arithm......

The basic invariant of an oriented bundle is the Euler class. The basic invariant of a complex vector bundle is a Chern class. For forms of degree 12 found that in degrees up to 14 there a......

Best invariant estimator cannot always be achieved. For a given problem, the invariant estimator with the lowest risk is termed the " best invariant estimator ".

Later in his career, Coble also studied the relations between hyperelliptic theta functions, irrational binary invariants, the Weddle surface and the Kummer surface.

The singularities of a curve are not birational invariants. However, locating and classifying the singularities of a curve is one way of computing the genus, which is a birational invarian......

The Sacks property is used to control the value of certain cardinal invariants in Gerald Enoch Sacks. A "'cardinal invariant "'is a property of the real line measured by a cardinal number.......

For the quadratic Casimir invariant, this is the Laplacian. For a semisimple Lie algebra of rank there will be Casimir invariants. It resembles the Casimir invariants for Lie algebra irred......

The Rokhlin invariant of M is equal to half the Casson invariant mod 2. Given a holomorphic analogue of the Casson invariant. The Casson invariant is viewed as the "'Z "'- valued lift of t......

In nuclear physics, where he was for decades one of the leading theorists of nuclear many body problems in particle physics, he worked, for example, with Mark Bolsteri on the giant dipole ......

His main books " Chronometric Invariants " were published posthumous. Perhaps thereby his main goal in science was the mathematical apparatus of physical observable quantities in the Gener......

The class invariant is an essential component of design by contract. Other design contracts are concepts of " class invariant ". Some object oriented programming languages have a special s......

These surfaces are generalizations of classical invariant manifolds, known in dynamical systems theory, to finite-time unsteady flow data. In recent years, there has been much interest in ......

His long work " Cohomological invariants : exceptional groups and Spin groups " built on this theme. Together with J .-P . Serre he is one of the cofounders of the theory of cohomological ......

However, discrete complete invariants of multidimensional persistence modules do not exist. In fact, it is a complete invariant for knots. Glimm showed that the supernatural number is a co......