A table-based method for high-speed function approximation in single-precision floating-point format is presented in this paper. Our focus is the approximation of reciprocal, square root, square root reciprocal, exponentials, logarithms, trigonometric functions, powering (with a fixed exponent p), or special functions. The algorithm presented here combines table look-up, an enhanced minimax quadratic approximation, and an efficient evaluation of the second-degree polynomial (using a specialized squaring unit, redundant arithmetic, and multioperand addition). The execution times and area costs of an architecture implementing our method are estimated, showing the achievement of the fast execution times of linear approximation methods and the ...
Hardware implementations of complex functions regularly deploy piecewise polynomial approximations. ...
This paper presents a single precision floating point arithmetic unit with support for multiplicatio...
Piecewise polynomial interpolation is a well-established technique for hardware function evaluation....
This paper presents a method for designing linear, quadratic and cubic interpolators that compute el...
This paper presents a method for designing linear, quadratic and cubic interpolators that compute el...
This paper presents a technique for designing linear and quadratic interpolators for function approx...
This paper presents a technique for designing linear and quadratic interpolators for function approx...
Many general table-based methods for the evaluation in hardware of elementary functions have been pu...
Multipoint polynomial evaluation and interpolation are fundamental for modern algebraic and numerica...
... This article describes how exponentiation can be approximated by manipulating the components of ...
Applications in computer graphics, digital signal processing, communication systems, robotics, astro...
For purposes of evaluation and manipulation, mathematical functions f are commonly replaced by appro...
This paper describes a fast and reliable algorithm which computes smooth piecewise polynomial approx...
This paper presents a method for implementing several high-performance math functions through polyno...
Program year: 1985/1986Digitized from print original stored in HDRAn approximation scheme that uses ...
Hardware implementations of complex functions regularly deploy piecewise polynomial approximations. ...
This paper presents a single precision floating point arithmetic unit with support for multiplicatio...
Piecewise polynomial interpolation is a well-established technique for hardware function evaluation....
This paper presents a method for designing linear, quadratic and cubic interpolators that compute el...
This paper presents a method for designing linear, quadratic and cubic interpolators that compute el...
This paper presents a technique for designing linear and quadratic interpolators for function approx...
This paper presents a technique for designing linear and quadratic interpolators for function approx...
Many general table-based methods for the evaluation in hardware of elementary functions have been pu...
Multipoint polynomial evaluation and interpolation are fundamental for modern algebraic and numerica...
... This article describes how exponentiation can be approximated by manipulating the components of ...
Applications in computer graphics, digital signal processing, communication systems, robotics, astro...
For purposes of evaluation and manipulation, mathematical functions f are commonly replaced by appro...
This paper describes a fast and reliable algorithm which computes smooth piecewise polynomial approx...
This paper presents a method for implementing several high-performance math functions through polyno...
Program year: 1985/1986Digitized from print original stored in HDRAn approximation scheme that uses ...
Hardware implementations of complex functions regularly deploy piecewise polynomial approximations. ...
This paper presents a single precision floating point arithmetic unit with support for multiplicatio...
Piecewise polynomial interpolation is a well-established technique for hardware function evaluation....