「quadratic」の共起表現一覧(1語右で並び替え)

quadratic

1語右で並び替え

該当件数:105件

  • Mixed-integer optimizer for linear, quadratic and conic problems.
  • It is related to the quadratic assignment problem in the same way as the li
  • In mathematics, the quadratic bottleneck assignment problem (QBAP) is one
  • o compute the WF-Semantics in general, is of quadratic complexity.
  • ith room temperature NaI detectors, and QCC, Quadratic Compression Conversion, algorithms to identi
  • As predicted they enjoy faster than quadratic convergence for all distributions of zeros.
  • because it shows that (outside the region of quadratic convergence) the Newton method can be very s
  • Steffensen's method also achieves quadratic convergence, but without using derivatives a
  • onian mechanics, the dynamics of a system of quadratic degrees of freedom are controlled by a set o
  • in this case, Oswald Veblen's Invariants of Quadratic Differential Forms.
  • Calculating the determinant, this yields the quadratic equation
  • Each of those is a root of a quadratic equation in terms of the one before.
  • Solving multivariate quadratic equations (MQ) over a finite set of numbers
  • The quadratic evenly divides the polynomial when
  • try analogies are supported by the theory of quadratic extensions of finite fields, also known as G
  • of Gauss' class number problem for imaginary quadratic fields.
  • A classical result is the case of a quadratic, for example,
  • Associated with the quadratic form q is the pseudo-Euclidean inner product
  • ant is the discriminant B2 − 4AC of a binary quadratic form Ax2 + Bxy + Cy2.
  • Similarly, quadratic form x2 yields a pair of lines for the unit
  • where gtt and the quadratic form are functions only of the spatial coord
  • For example, the quadratic form x2 − y2 corresponds to a unit quasi-sph
  • omplex conjugates, which can be written as a quadratic form,
  • the idea of a conic section as a slice of a quadratic form.
  • Kaplansky's theorem on quadratic forms
  • On non-central generalized Laplacianness of quadratic forms in normal variables, Journal of Multiv
  • Containing only quadratic forms of the fermionic operators, no anti-co
  • ng rational methods such as dot products and quadratic forms), but students who are first learning
  • s and others, mirror symmetry, arithmetic of quadratic forms, Hyperbolic Kac-Moody algebras.
  • he mathematician G. L. Watson, who worked on quadratic forms, and G. Watson, a statistician.
  • on thesis dealt with the reduction theory of quadratic forms, which Gauss, Charles Hermite and Herm
  • owski theorem on the rational equivalence of quadratic forms.
  • terms of continued fractions, or in terms of quadratic forms.
  • 1st Baronet (1582-1630) - also invented the quadratic formula in the early 17th century.
  • have to switch from direct evaluation of the quadratic formula to some other method so as to limit
  • ge Dantzig's Simplex Algorithm to minimise a quadratic function.
  • transfer function, which is the ratio of two quadratic functions.
  • Lovelock action contains, among others, the quadratic Gauss-Bonnet term (i.e. the four-dimensional
  • tensor, the physicists began to discuss the quadratic Gauss-Bonnet term of Lovelock action within
  • A polynomial trend line demonstrates the quadratic growth rate.
  • A spacefiller (which also undergoes quadratic growth) may be thought of as a fifth class o
  • bove spacefiller pattern clearly showing the quadratic growth.
  • He developed a model that was quadratic in the criterion function and linear in the
  • Despite being quadratic in the Riemann tensor (and Ricci tensor), te
  • mplementation of unit propagation takes time quadratic in the total size of the set to check , whic
  • If the cost function involves quadratic inequalities it is called the quadratic assi
  • Since this is a quadratic irrational, the continued fraction must be p
  • oved the case where the exponent b is a real quadratic irrational, which was later extended to an a
  • A tensor in the theory of quadratic Lagrangians, which vanishes in four dimensio
  • ystem which is stable, even though no common quadratic Lyapunov function exists.
  • Complex quadratic map
  • period 3 buds of Mandelbrot set for complex quadratic map.
  • d for all one-dimensional maps with a single quadratic maximum.
  • rface is approximately 6371.01 km, while the quadratic mean or root mean square approximation of th
  • The rate of convergence is quadratic, meaning roughly that the number of bits of
  • he solution of linear, mixed-integer linear, quadratic, mixed-integer quadratic, quadratically cons
  • duced the costs of experimentation so that a quadratic model could be fit, which led to a (long-sou
  • The linear quadratic model is now most often used to describe the
  • proved the existence of infinitely many real quadratic number fields without a Euclidean algorithm.
  • This may be a simple quadratic, or a polynomial or rational function over a
  • KNITRO can also solve mixed integer linear, quadratic or nonlinear programming problems, i.e. prob
  • ally stated by E. Babichev, et al (3), "The ( quadratic) Pauli-Fierz theory is known to suffer from
  • Fig. 5: pulse shaper with a quadratic phase shift, generating a pulse with a negat
  • Examples of unimodal functions include Quadratic polynomial functions with a negative quadrat
  • nal space defined as the locus of zeros of a quadratic polynomial.
  • ms it is typical to have Euler products with quadratic polynomials in the denominator here.
  • of complex quadratic polynomials.
  • (mixed integer) quadratic problems
  • SqpSolvemt - Sequential quadratic programming
  • Qprog - Quadratic programming
  • It solves linear programming problems, quadratic programming problems and mixed integer progr
  • ar constrained problems using the sequential quadratic programming algorithm.
  • hese are supplemented for large problems and quadratic programming problems by interior point metho
  • but also solves linear programming problems, quadratic programming problems, and systems of nonline
  • ll-Rockafellar penalty function), sequential quadratic programming method (also called as Wilson-Ha
  • an active-set method for nonconvex quadratic programming,
  • mal-dual interior-point method for nonconvex quadratic programming,
  • strained and bound-constrained optimization, quadratic programming, nonlinear programming, systems
  • r programs and the Maros and Meszaros convex quadratic programs is possible.
  • a presolver for quadratic programs,
  • The law of quadratic reciprocity says that if p and q are odd pri
  • roducing Gauss's lemma in the third proof of quadratic reciprocity.
  • In mathematics, Somos' quadratic recurrence constant, named after Michael Som
  • This requires knowing whether t is a quadratic residue modulo N, and there are no known met
  • If t is not a quadratic residue, the p+1 method degenerates to a slo
  • uestions, for example in the distribution of quadratic residues, and in particular in the classical
  • rking on the question of the distribution of quadratic residues.
  • The quadratic sieve is a modification of Dixon's factoriza
  • in, for example, Dixon's factorization, the quadratic sieve, and the number field sieve.
  • nce is extensively used in, for example, the quadratic sieve, general number field sieve, continued
  • For a free bosonic field, the action is quadratic, so the eigenvalues tend to have the form
  • Now the field has constant quadratic spatial fluctuations at all temperatures.
  • Kadowaki-Woods ratio is the ratio of A, the quadratic term of the resistivity and γ2, the linear t
  • This is because such quadratic term is present in the low energy effective
  • When the quadratic terms cannot be neglected but all higher ord
  • o solve it in a time that is faster than the quadratic time bound for the complete graph and Delaun
  • r curves: one is isomorphic to E, one is its quadratic twist, and only the other two are really new
  • conductors, torsion subgroups, isogenous and quadratic twists of curves.