Positive definite binary quadratic forms and modules over a field

2024-11-042024-11-042012-01-010129-2021https://hdl.handle.net/11452/47367There has been a connection between binary quadratic forms and modules. Given any quadratic form F, there corresponds a module M-F, and conversely given any module M, there corresponds a binary quadratic form FM. The connection between binary quadratic forms and modules was studied in [3, 4]. In this paper, we consider this connection only for positive definite primitive integral quadratic forms F(x, y) = ax(2)+bxy+cy(2) of discriminant A and modules M over an imaginary quadratic number field F = Q(root Delta).eninfo:eu-repo/semantics/closedAccessPositive definite binary quadratic formPrincipal formBase pointModuleBasisScience & technologyPhysical sciencesMathematicsPositive definite binary quadratic forms and modules over a fieldArticle000217238400011419426363