The combinatorial nature of the trigonometric integrals (2.8) is discussed in connection to the partition of multisets with equal sums. Computational aspects are highlighted for special parameter values.
The combinatorial nature of some trigonometric integrals
Andrica, Dorin Bagdasar, Ovidiu and Marinescu, Dan Ştefan
Full PDF
creative_2023_32_2_133_139Additional Information
| Author(s) | Andrica, Dorin , Bagdasar, Ovidiu, Marinescu, Dan Ştefan |
|---|
Related Products
-
Uniqueness of Q-difference of meromorphic functions sharing a small function with finite weight
-
Statements and open problems on decidable sets
that contain informal notions and refer to the current knowledge on X -
A heuristic method for solving linear and quasi-linear first order partial differential equations
Recently posted
-
Essential Conditions for Subclasses of Spiral-Like Functions and Their Univalent Derivatives associated with Poisson distribution series
-
Bi-Univalent Functions Involving Error Function Subordinating to Limacon Domain
-
NaviSpace: A Navilogy Framework for Connecting Manifolds and Functional Spaces
-
A study on Sasakian manifolds admitting ∗-η- Ricci-Bourguignon solitons
-
Some comments on reverse derivations in rings
-
On Wiener Indices of Parikh Word Representable Graphs
-
Strong and weak ideals in BI-algebras
-
Multiple positive solutions to n-component coupled system of iterative systems on time scales
-
New Results on Existence for ψ−Hilfer Fractional Delay Differential Problem
-
On Quaternion-Gaussian Third-order Jacobsthal Polynomials