Effective density of values of indefinite ternary inhomogeneous quadratic forms
Abstract
Given an inhomogeneous quadratic form Q(v)=Q(v+) with Q an indefinite Q-isotropic rational ternary form and ∈ R3 irrational, we prove an effective lower bound for the number of integer vectors v∈ Zn with \|v\| ≤ T such that |Q(v)-t|<δ that is valid for any t∈ R and all δ≥ T-, with >0 depending explicitly on the Diophantine properties of . In particular, for with algebraic entries we can take any <18.
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