Abstract

In 1924 Hasse proved a fundamental theorem concerning quadratic forms over algebraic number fields, namely that two quadratic forms with coefficients in an algebraic number field K are equivalent if and only if they are so in every completion K p of K by valuations of K.

Full Text
Published version (Free)

Talk to us

Join us for a 30 min session where you can share your feedback and ask us any queries you have

Schedule a call

Similar Papers

Paper Title
Journal
Date
Author
Algebraic Number Theory and Hamiltonian Chaos
F Vivaldi
-
F VivaldiF Vivaldi
01 Jan 1990
Integral Decomposition of Hermitian Forms
Larry J Gerstein
American Journal of Mathematics | VOL. 92
Larry J GersteinLarry J Gerstein
01 Apr 1970
On the distribition of residue classes of quadratic forms and integer-detecting sequences in number fields
C Elsner ... J W Sander
Studia Scientiarum Mathematicarum Hungarica | VOL. 36
C Elsner, et. al.C Elsner ... J W Sander
01 Jun 2000
Splitting Quadratic Forms Over Integers of Global Fields
Larry J Gerstein
American Journal of Mathematics | VOL. 91
Larry J GersteinLarry J Gerstein
01 Jan 1969
View more papers

More From: Journal of the Indian Mathematical Society

Paper Title
Journal
Date
Author
On Star-σ-Countably Compact Spaces
Sumit Singh
Journal of the Indian Mathematical Society | VOL. -
Sumit SinghSumit Singh
24 Mar 2023
Linear Differential Equations with Solutions of Finite Iterated p-Φ Order
Chinmay Ghosh ... Soumen Mondal
Journal of the Indian Mathematical Society | VOL. -
Chinmay Ghosh, et. al.Chinmay Ghosh ... Soumen Mondal
24 Mar 2023
New Bounds for the Jensen-Dragomir Functional with Applications in Analysis
Yamin Sayyari ... Mehdi Dehghanian
Journal of the Indian Mathematical Society | VOL. -
Yamin Sayyari, et. al.Yamin Sayyari ... Mehdi Dehghanian
24 Mar 2023
Multi-Indexed Whittaker Function and its Properties
Savita Panwar ... Prakriti Rai
Journal of the Indian Mathematical Society | VOL. -
Savita Panwar, et. al.Savita Panwar ... Prakriti Rai
24 Mar 2023
View more papers