Here we will show the behavior of some of q-functions. In particular we plot the q-exponential and the q-trigonometric functions. Since these functions are not generally included as software routines, a Fortran program was necessary to give them
Abstract. We describe a Mathematica package for dealing with q-holonomic sequences and power series....
This is a continuation of [19], where we presented an extension of the q-hypergeometric function wit...
We develop analogs of exponential and trigonometric functions (including the basic exponential funct...
Some properties of the q-exponential functions, standard and symmetric, are investigated for general...
For |q| ≠ 1, the integral definition of the gamma function in terms of the exponential function is g...
In the spirit of our earlier articles on $q-\omega$ special functions, the purpose of this article i...
After obtaining some useful identities, we prove an additional functional relation for $q$ exponenti...
AbstractIn Koepf (1992) it was shown how for a given holonomic function a representation as a formal...
AbstractThere are two q-analogues for the exponential function, and each of them appears naturally a...
In this thesis we explore the concept of q-calculus and its generalisation. We begin by defining q-c...
We present three q-Taylor formulas with q-integral remainder. The two last proofs require a slight r...
A Graphical Approach to Algebra and Trigonometry illustrates how the graph of a function can be used...
The book provides a comprehensive introduction to the many aspects of the subject of basic hypergeom...
By applying an integral representation for qk2, we systematically derive a large number of new Fouri...
The exponential and logarithm functions are extraordinarily important in one-variable calculus. Howe...
Abstract. We describe a Mathematica package for dealing with q-holonomic sequences and power series....
This is a continuation of [19], where we presented an extension of the q-hypergeometric function wit...
We develop analogs of exponential and trigonometric functions (including the basic exponential funct...
Some properties of the q-exponential functions, standard and symmetric, are investigated for general...
For |q| ≠ 1, the integral definition of the gamma function in terms of the exponential function is g...
In the spirit of our earlier articles on $q-\omega$ special functions, the purpose of this article i...
After obtaining some useful identities, we prove an additional functional relation for $q$ exponenti...
AbstractIn Koepf (1992) it was shown how for a given holonomic function a representation as a formal...
AbstractThere are two q-analogues for the exponential function, and each of them appears naturally a...
In this thesis we explore the concept of q-calculus and its generalisation. We begin by defining q-c...
We present three q-Taylor formulas with q-integral remainder. The two last proofs require a slight r...
A Graphical Approach to Algebra and Trigonometry illustrates how the graph of a function can be used...
The book provides a comprehensive introduction to the many aspects of the subject of basic hypergeom...
By applying an integral representation for qk2, we systematically derive a large number of new Fouri...
The exponential and logarithm functions are extraordinarily important in one-variable calculus. Howe...
Abstract. We describe a Mathematica package for dealing with q-holonomic sequences and power series....
This is a continuation of [19], where we presented an extension of the q-hypergeometric function wit...
We develop analogs of exponential and trigonometric functions (including the basic exponential funct...