quadratic polynomial 
An algorithm to recover bit timing is proposed which maximises a quadratic polynomial approximation to the loglikelihood function.


Cubicspline and discretequadratic polynomial techniques are presented for reliably computing up to thirdorder derivatives of experimental information.


The interpolant is obtained patching together cubic with quadratic polynomial segments; it is comonotone and/or coconvex with the data.


The velocity of the sheet is a quadratic polynomial of the distance from the slit and the sheet is subjected to a linear mass flux.


Apparently under these assumptions the potential energy is a quadratic polynomial in q.


Afterward, we estimate the subpixel position of each depth discontinuity by fitting a quadratic polynomial to the neighboring confidence values.


A simple quadratic polynomial is a good approximation to the experimental data, as given by Equation 8.


A quadratic polynomial was used to approximate the local buckling load factor calculated by PANDA2.


A quadratic polynomial is also used in our component regression models for the ETC tracks.


As a result modifications to an initial trial quadratic polynomial can progressively compensate for nonlinear terms in the equation.


Assume that the initial averages f 0 kgwere averages of a given quadratic polynomial.


Both linear and quadratic polynomial approximations were fitted to 16 experiments as well as the base design for the 3 design variables.


Because each quadratic polynomial has six degrees of freedom, the number of nodes in s must be at least six.


Figure 4e might also be described by a quadratic polynomial.


From the FEM analytical results of 90 stacking sequences listed in Table 1, a global response surface is made using a quadratic polynomial.


For each voltage the data is well described by a quadratic polynomial.


For each ration level, a simple quadratic polynomial was fitted to es timate maximum production.


It is superior to the quadratic polynomial model for extreme illumination conditions while still being easy to invert.


It is easy to set up for any one of these cases a system of algebraic equations defining the desired quadratic polynomial.


It is well known that even iterations of a quadratic polynomial can produce very complicated fractals.

