Here presented is constructive generalization of exponential Euler polynomial and exponential splines based on the interrelationship between the set of concepts of Eulerian polynomials, Eulerian numbers, and Eulerian ...Here presented is constructive generalization of exponential Euler polynomial and exponential splines based on the interrelationship between the set of concepts of Eulerian polynomials, Eulerian numbers, and Eulerian fractions and the set of concepts related to spline functions. The applications of generalized exponential Euler polynomials in series transformations and expansions are also given.展开更多
We consider the congruence x1+ x2 +… + xr - c (mod m), wherem and r are positive integers and c ∈Zm := {0, 1, ..., m- 1} (m ≥ 2). Recently,W.-S. thou, T. X. He,and Peter J.-S. Shiue considered the enumerati...We consider the congruence x1+ x2 +… + xr - c (mod m), wherem and r are positive integers and c ∈Zm := {0, 1, ..., m- 1} (m ≥ 2). Recently,W.-S. thou, T. X. He,and Peter J.-S. Shiue considered the enumerationproblems of this congruence, namely, the number of solutions with the restriction x1≤~ x2≤ ... ≤ xr, and got some properties and a neat formula ofthe solutions. Due to the lack of a simple computational method for calculating the number of the solution of the congruence, we provide an algebraic and a recursive algorithms for those numbers. The former one can also give a new and simple approach to derive some properties of solution numbers.展开更多
文摘Here presented is constructive generalization of exponential Euler polynomial and exponential splines based on the interrelationship between the set of concepts of Eulerian polynomials, Eulerian numbers, and Eulerian fractions and the set of concepts related to spline functions. The applications of generalized exponential Euler polynomials in series transformations and expansions are also given.
文摘We consider the congruence x1+ x2 +… + xr - c (mod m), wherem and r are positive integers and c ∈Zm := {0, 1, ..., m- 1} (m ≥ 2). Recently,W.-S. thou, T. X. He,and Peter J.-S. Shiue considered the enumerationproblems of this congruence, namely, the number of solutions with the restriction x1≤~ x2≤ ... ≤ xr, and got some properties and a neat formula ofthe solutions. Due to the lack of a simple computational method for calculating the number of the solution of the congruence, we provide an algebraic and a recursive algorithms for those numbers. The former one can also give a new and simple approach to derive some properties of solution numbers.
