Draft:Brahmagupta's function

This is a draft article. It is a work in progress open to editing by anyone. Please ensure core content policies are met before publishing it as a live Wikipedia article. Find sources: Google (books · news · scholar · free images · WP refs) · FENS · JSTOR · TWL Easy tools: Citation bot (help) | Advanced: Fix bare URLs · Article logs · Draft logs. Last edited by Michael Hardy (talk | contribs) 4 months ago. (Update) Finished drafting? Submit for review or Publish now

In number theory, Brahmagupta's function is a concept developed by the ancient Indian mathematician Brahmagupta around 628 CE.^{[citation needed][dubious – discuss]}

For positive integers ${\textstyle n}$, Brahmagupta's function ${\textstyle h(n)}$ is the number of proper representations of ${\displaystyle n}$ as a sum of four squares. Mathematically, it can be expressed as ${\displaystyle h(n)=r_{4}(n)/8}$, where ${\displaystyle r_{4}(n)}$ represents the total number of solutions to the equation ${\displaystyle a^{2}+b^{2}+c^{2}+d^{2}=n}$ with ${\displaystyle a,b,c,d\in \mathbb {Z} }$. The function holds particular importance in quadratic forms and has connections to modular forms.^{[1][page needed]}

Brahmagupta's function is multiplicative, meaning that for coprime numbers ${\displaystyle m}$ and ${\displaystyle n}$, we have ${\displaystyle h(mn)=h(m)h(n)}$. For prime numbers ${\displaystyle p}$, the function follows the formula ${\displaystyle h(p)=p+1}$ when ${\displaystyle p\equiv 1{\bmod {4}}}$, and ${\displaystyle h(p)=p-1}$ when ${\displaystyle p\equiv 3{\pmod {4}}}$. This function played a crucial role in Jacobi's four-square theorem and influenced later work in arithmetic functions.^{[2][page needed]} The function's significance extends to modern applications in cryptography and algebraic number theory.

This page needs additional or more specific categories. Please help out by adding categories to it so that it can be listed with similar articles. (January 2025)