Ternary representation of trivariate data

This paper considers representations of ternary matroids over fields other than GF(3). It is shown that a 3-connected ternary matroid representable over a finite field F has at most IFI -2 inequivalent representations over F. This resolves a special case of a conjecture of Kahn in the affirmative.

Let f be an indefinite ternary integral quadratic form and let q be a nonzero integer such that &q det( f ) is not a square. Let N(T, f, q) denote the number of integral solutions of the equation f (x)=q where x lies in the ball of radius T centered at the origin. We are interested in the asymptotic

When developing models to represent experimental data, residual plots are effective for assessing quality of fit, and these present the differences between data and reference data or a model. However, when some ordinate values are excessive, it is impossible to maintain definition for small values.