Add to ORKG학위논문 (석사)-- 서울대학교 대학원 : 수리과학부, 2013. 2. 김영원.The gamma function, introduced by the Swiss mathematician Leonhard Euler (1707-1783), plays a central role in modern mathematics. This remarkable brainchild was a result of generalizing the factorial to non integer values. Afterward, because of its great importance, it was discovered by great mathematicians as well as many others. The aim of this work is to give meticulous proofs of several important known properties of the gamma function. We start by defining gamma function as an integral form and it is extended by analytic continuation to all complex numbers except the non-positive integers, yielding a meromorphic function we henceforth continue to call the gamma function. After describing s...
Gamma function and its historical background will be introduced. Also known as an Euler integral of ...
This paper discusses generalizations of logarithmic and hyperbolic integrals. A new proof for an int...
AbstractSeveral sequences are derived which are related to Stirling's formula for the Gamma function...
We present new short proofs for both Stirling\u27s formula and Stirling\u27s formula for the Gamma f...
We present new short proofs for both Stirling\u27s formula and Stirling\u27s formula for the Gamma f...
We present new short proofs for both Stirling\u27s formula and Stirling\u27s formula for the Gamma f...
Abstract. We present a new short proof of Stirling’s formula for the Gamma function. Our approach is...
We present a new short proof of Stirling\u27s formula for the Gamma function. Our approach is based ...
This report attempts to explore and extend the use of Otto Hölder’s theorem on the Gamma Function, Γ...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
This paper gives an approximation for the gamma function that, while different, has the same form as...
Gamma function and its historical background will be introduced. Also known as an Euler integral of ...
This paper discusses generalizations of logarithmic and hyperbolic integrals. A new proof for an int...
AbstractSeveral sequences are derived which are related to Stirling's formula for the Gamma function...
We present new short proofs for both Stirling\u27s formula and Stirling\u27s formula for the Gamma f...
We present new short proofs for both Stirling\u27s formula and Stirling\u27s formula for the Gamma f...
We present new short proofs for both Stirling\u27s formula and Stirling\u27s formula for the Gamma f...
Abstract. We present a new short proof of Stirling’s formula for the Gamma function. Our approach is...
We present a new short proof of Stirling\u27s formula for the Gamma function. Our approach is based ...
This report attempts to explore and extend the use of Otto Hölder’s theorem on the Gamma Function, Γ...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
This paper gives an approximation for the gamma function that, while different, has the same form as...
Gamma function and its historical background will be introduced. Also known as an Euler integral of ...
This paper discusses generalizations of logarithmic and hyperbolic integrals. A new proof for an int...
AbstractSeveral sequences are derived which are related to Stirling's formula for the Gamma function...