Explicit Lower Bounds for Dirichlet Series of Higher Power Representation Functions

We investigate Dirichlet-type series generated by representation functions that count the number of ways an integer can be expressed as a sum of ‘k’ signed higher even powers. By combining generalized theta generating functions with a family of generalized cotangent series introduced in previous work, we derive two distinct explicit lower bounds for these series. The first estimate arises from a geometric restriction of the lattice to its diagonal, while the second utilizes Holder’s inequality on the integral representation of the series. The methods presented here avoid modular techniques and offer a flexible analytic framework for higher-power representation problems.

💡 Research Summary

The paper studies Dirichlet‑type series generated by representation functions that count the number of ways a non‑negative integer n can be written as a sum of k signed even powers of order 2m: \