Generalizing the Cauchy-Schwarz inequality: Hadamard powers and tensor products

Abstract

We explore and generalize a Cauchy-Schwarz-type inequality originally proved in [Electronic Journal of Linear Algebra 35, 156-180 (2019)]: \|v2\|\|w2\| - v2,w2 ≤ \|v\|2\|w\|2 - v,w2 for all v,w ∈ Rn. We present three new proofs of this inequality that better illustrate "why" it is true and generalize it in several different ways: we generalize from vectors to matrices, we explore which exponents other than 2 result in the inequality holding, and we derive a version of the inequality involving three or more vectors.