Java API Components offering refined numerical procedures to either construct a function of one or two variables from a set of points (i.e. interpolate), or solve an equation of one variable. The interpolation procedures provided include Newton polynomials, Lagrange`s formula, Burlisch-Stoer algorithm, Cubic splines (natural and free), Bicubic interpolation and procedures for find the interpolation functions coefficients.

lagrange s, java, class libraries, bicubic, interpolation, extrapolation, newton polynomials, javabeans, cubic splines, burlisch stoer, j2se

Add refined numerical procedures to either construct a function of one or two variables from a set of points (i.e. interpolate), or solve an equation of one variable; to your .NET, COM, and XML Web service Apps. Interpolate using Newton poly., Lagrange`s formula, Burlisch-Stoer algorithm, Cubic/Bicubic splines (natural and free); Solve using Newton-Raphson, Bisection, Brent, secant and false position, Ridders` Method, Delphi 3-8 & 2005 support

web service, class libraries, bicubic, interpolation, lagrange, extrapolation, newton polynomials, vb net, cubic splines, burlisch stoer, delphi

Add refined numerical procedures to either construct a function of one or two variables from a set of points (i.e. interpolate), or solve an equation of one variable; to your .NET, COM, and XML Web service Apps. Interpolate using Newton poly., Lagrange`s formula, Burlisch-Stoer algorithm, Cubic/Bicubic splines (natural and free); Solve using Newton-Raphson, Bisection, Brent, secant and false position, Ridders` Method,...

web service, class libraries, bicubic, interpolation, lagrange, extrapolation, newton polynomials, vb net, cubic splines, burlisch stoer

Arkan is designed to convert border of a raster mask (selection of an object in scene) or any closed polyline into B-spline (piecewise cubic Bezier curve) representation spread widely in vector graphics packages. Arkan chooses the best position both for node points (junctions of adjacent Bezier polynomial pieces) and for control points, which don’t lie on the curve but only affects its shape.

snake, contour tracking, outlining, spline knots and junctions, cubic bezier curve, b spline, minimum description length, mask editing

cubic splines interpolation and smoothing of derivative curves, for accurate evaluation of inflections (end-points); ii) determination of concentrations and refinement of pKa values by multiple nonlinear regression (based on the Solver supplement of Excel), essential for difficult titrations with undefined inflections, e.g., acid rain. - Generation of protonation curves and distribution diagrams of equilibrium species of acids and bases at equilibrium

base, chemical equilibrium, analytical chemistry, inflection, simulation, buffer, hydrolysis, acid, equivalence point, amino acid, electrode, protonation, potentiometry