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536
Motivation through the Design of Work: Test of a Theory. Organizational Behavior and Human Performance,
, 1976
"... A model is proposed that specifies the conditions under which individuals will become internally motivated to perform effectively on their jobs. The model focuses on the interaction among three classes of variables: (a) the psychological states of employees that must be present for internally motiv ..."
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Cited by 622 (2 self)
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in the management literature, in fact little is known about the reasons why "enriched" work sometimes leads to positive outcomes for workers and for their employing organizations. Even less is known about the relative effectiveness of various strategies for carrying out the redesign of work One reason
THE RIEMANN HYPOTHESIS
"... The Riemann zeta function is the function of the complex variable s, defined in the halfplane1 ℜ(s)> 1 by the absolutely convergent series ∞ ∑ 1 ζ(s): =, ns and in the whole complex plane C by analytic continuation. As shown by Riemann, ζ(s) extends to C as a meromorphic function with only a sim ..."
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Cited by 3 (0 self)
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The Riemann zeta function is the function of the complex variable s, defined in the halfplane1 ℜ(s)> 1 by the absolutely convergent series ∞ ∑ 1 ζ(s): =, ns and in the whole complex plane C by analytic continuation. As shown by Riemann, ζ(s) extends to C as a meromorphic function with only a
The Equivalence of the Riemann Hypothesis and the Density Hypothesis
, 2008
"... The Riemann zeta function is defined as ζ(s) = ∑∞ n=1 1 ns for ℜ(s)> 1 and extended to a regular function on the whole complex plane deleting its unique pole at s = 1 with the residue 1. The Riemann hypothesis asserts that all nontrivial zeros for ζ(s) lie on the line ℜ(s) = 1/2. The density h ..."
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Cited by 1 (1 self)
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The Riemann zeta function is defined as ζ(s) = ∑∞ n=1 1 ns for ℜ(s)> 1 and extended to a regular function on the whole complex plane deleting its unique pole at s = 1 with the residue 1. The Riemann hypothesis asserts that all nontrivial zeros for ζ(s) lie on the line ℜ(s) = 1/2. The density
Constructing nonresidues in finite fields and the extended Riemann hypothesis
 Math. Comp
, 1991
"... Abstract. We present a new deterministic algorithm for the problem of constructing kth power nonresidues in finite fields Fpn,wherepis prime and k is a prime divisor of pn −1. We prove under the assumption of the Extended Riemann Hypothesis (ERH), that for fixed n and p →∞, our algorithm runs in pol ..."
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Cited by 12 (0 self)
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Abstract. We present a new deterministic algorithm for the problem of constructing kth power nonresidues in finite fields Fpn,wherepis prime and k is a prime divisor of pn −1. We prove under the assumption of the Extended Riemann Hypothesis (ERH), that for fixed n and p →∞, our algorithm runs
Proposed Proof of Riemann Hypothesis
"... Proposed proof of the Riemann hypothesis showing that positive decreasing continuous function which tends to zero as t goes to infinity can’t have zeros of its Laplace transform in the right half plane, extending the result to the two sided Laplace transform and then showing that there is a represen ..."
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Proposed proof of the Riemann hypothesis showing that positive decreasing continuous function which tends to zero as t goes to infinity can’t have zeros of its Laplace transform in the right half plane, extending the result to the two sided Laplace transform and then showing that there is a
Quantum Knots and Riemann Hypothesis
, 2006
"... In this paper we propose a quantum gauge system from which we construct generalized Wilson loops which will be as quantum knots. From quantum knots we give a classification table of knots where knots are onetoone assigned with an integer such that prime knots are bijectively assigned with prime nu ..."
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function and this operator is the Virasoro energy operator with central charge c = 1 2. Our approach for proving the Riemann Hypothesis can also be extended to prove the Extended Riemann Hypothesis. We also investigate the relation of our approach for proving the Riemann Hypothesis with the Random Matrix
DISPROOFS OF RIEMANN’S HYPOTHESIS
"... As it is well known, the Riemann hypothesis on the zeros of the ζ(s) function has been assumed to be true in various basic developments of the 20th century mathematics, although it has never been proved to be correct. The need for a resolution of this open historical problem has been voiced by seve ..."
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Cited by 2 (2 self)
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As it is well known, the Riemann hypothesis on the zeros of the ζ(s) function has been assumed to be true in various basic developments of the 20th century mathematics, although it has never been proved to be correct. The need for a resolution of this open historical problem has been voiced
On Exponential Decay and the Riemann Hypothesis
"... ABSTRACT. A Riemann operator is constructed in which sequential elements are removed from a decaying set by means of prime factorization, leading to a form of exponential decay with zero degeneration, referred to as the root of exponential decay. A proportionate operator is then constructed in a sim ..."
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similar manner in terms of the nontrivial zeros of the Riemann zeta function, extending proportionately, mapping expectedly always to zero, which imposes a ratio of the primes to said zeta roots. Thirdly, a statistical oscillation function is constructed algebraically into an expression of the Laplace
A proof for the Riemann hypothesis
, 2008
"... The Riemann zeta function ζ(s) is defined by ζ(s) = ∑∞ n=1 1 ns for ℜ(s)> 1 and can be extended to a regular function on the whole complex plane deleting its unique pole at s = 1. The Riemann hypothesis is a conjecture made by Riemann in 1859 asserting that all nontrivial zeros for ζ(s) lie on ..."
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The Riemann zeta function ζ(s) is defined by ζ(s) = ∑∞ n=1 1 ns for ℜ(s)> 1 and can be extended to a regular function on the whole complex plane deleting its unique pole at s = 1. The Riemann hypothesis is a conjecture made by Riemann in 1859 asserting that all nontrivial zeros for ζ(s) lie
The Extended Riemann Hypothesis and its Application to Computation
, 2003
"... Many of Hilbert’s 23 famous problems are not of a prove or disprove nature; rather, they are openended, “of a purely investigative nature,” ..."
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Many of Hilbert’s 23 famous problems are not of a prove or disprove nature; rather, they are openended, “of a purely investigative nature,”
Results 1  10
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536