Spinor representations of positive definite ternary quadratic forms

Abstract

For a positive definite integral ternary quadratic form f, let r(k,f) be the number of representations of an integer k by f. The famous Minkowski-Siegel formula implies that if the class number of f is one, then r(k,f) can be written as a constant multiple of a product of local densities which are easily computable. In this article, we consider the case when the spinor genus of f contains only one class. In this case the above also holds if k is not contained in a set of finite number of square classes which are easily computable (see, for example, sp1 and sp2). By using this fact, we prove some extension of the results given in both cl on the representations of generalized Bell ternary forms and be on the representations of ternary quadratic forms with some congruence conditions.