Add to ORKGA large number of infinite sums, such as , cannot be found by the methods of real analysis. However, many of them can be evaluated using the theory of residues. In this thesis we characterize several methods of summations using residues, including methods integrating residues and the Bernoulli numbers. In fact, with this technique we derive some summation formulas for particular Finite Sums and Infinite Series that are difficult or impossible to solve by the methods of real analysis
AbstractIt is well known that if a1,…, am are residues modulo n and m ⩾ n then some sum ai1 + ⋯ + ai...
the 1980s,when the introduction of public key cryptography spurred interest in modularmultiplication...
AbstractCanonical number systems are the natural generalization ofq-adic number systems to number fi...
AbstractAn algebraic theory of residues is used to evaluate summations of the form [equation] and th...
Abstract: Residues to a given modulus have been introduced to mathe-matics by Carl Friedrich Gauss w...
This expository thesis examines the relationship between finite sums of powers and a sequence of num...
For non-negative integers r we examine four families of alternating and non-alternating sign closed...
The sum-product problem of Erdos and Szemeredi asserts that any subset of the integers has many prod...
This thesis deals with the problem of representation of series in closed form, mainly by the use of ...
It is common to encounter an integral that seems impossible to evaluate. Residue theorems introduce ...
Recently, a half-dozen remarkably general families of the finite trigonometric sums were summed in c...
A binomial residue is a rational function defined by a hypergeometric integral whose kernel is singu...
Finite trigonometric sums occur in various branches of physics, mathematics, and their applications....
The residue theorem is one of the most interesting result in Complex Analysis which allows not only...
Doctor of PhilosophyDepartment of MathematicsChristopher PinnerExponential and character sums occur...
AbstractIt is well known that if a1,…, am are residues modulo n and m ⩾ n then some sum ai1 + ⋯ + ai...
the 1980s,when the introduction of public key cryptography spurred interest in modularmultiplication...
AbstractCanonical number systems are the natural generalization ofq-adic number systems to number fi...
AbstractAn algebraic theory of residues is used to evaluate summations of the form [equation] and th...
Abstract: Residues to a given modulus have been introduced to mathe-matics by Carl Friedrich Gauss w...
This expository thesis examines the relationship between finite sums of powers and a sequence of num...
For non-negative integers r we examine four families of alternating and non-alternating sign closed...
The sum-product problem of Erdos and Szemeredi asserts that any subset of the integers has many prod...
This thesis deals with the problem of representation of series in closed form, mainly by the use of ...
It is common to encounter an integral that seems impossible to evaluate. Residue theorems introduce ...
Recently, a half-dozen remarkably general families of the finite trigonometric sums were summed in c...
A binomial residue is a rational function defined by a hypergeometric integral whose kernel is singu...
Finite trigonometric sums occur in various branches of physics, mathematics, and their applications....
The residue theorem is one of the most interesting result in Complex Analysis which allows not only...
Doctor of PhilosophyDepartment of MathematicsChristopher PinnerExponential and character sums occur...
AbstractIt is well known that if a1,…, am are residues modulo n and m ⩾ n then some sum ai1 + ⋯ + ai...
the 1980s,when the introduction of public key cryptography spurred interest in modularmultiplication...
AbstractCanonical number systems are the natural generalization ofq-adic number systems to number fi...