Two Hornich-Hlawka-type and Gram matrix-based inequalities

Abstract

We establish two inequalities in real inner product spaces. The first is a multiplicative strengthening of the classical Hornich-Hlawka inequality: for all vectors x, y, z in a real inner product space H \[ \|x\|\,\|y\| + \|z\|\,\|x+y+z\| \;≥\; \|x+z\|\,\|y+z\|. \] We provide a complete characterization of the equality cases in terms of the linear dependence of x,y,z, and explicit conditions on their Gram matrix, showing in particular that equality occurs only in flat (at most two-dimensional) configurations. We also show that this inequality implies the classical Hornich-Hlawka inequality, thereby establishing a strict hierarchy between the two. The second result is a parametric inequality derived from the positive semidefiniteness of Gram matrices: for all x,y,z ∈ H and α, β, γ ∈ R, \[ α2\|x\|2 y,z2 + β2\|y\|2 x,z2 + γ2\|z\|2 x,y2 + 2(αβ + αγ + βγ) x,y x,z y,z \;≥\; 0. \] Optimizing over the parameters yields sharp inequalities relating the pairwise inner products and norms of three vectors, which can be viewed as reverse inequalities to the Gram determinant inequality G ≥ 0. As a special case, this recovers and strengthens the classical Cauchy-Schwarz inequality.