The Hill yield criterion developed by Rodney Hill, is one of several yield criteria for describing anisotropic plastic deformations. The earliest version was a straightforward extension of the von Mises yield criterion and had a quadratic form. This model was later generalized by allowing for an exponent m. Variations of these criteria are in wide use for metals, polymers, and certain composites.
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The Hillyieldcriterion developed by Rodney Hill, is one of several yield criteria for describing anisotropic plastic deformations. The earliest version...
In continuum mechanics, the maximum distortion energy criterion (also von Mises yieldcriterion) states that yielding of a ductile material begins when...
popular anisotropic yield criteria are: Hill's quadratic yieldcriterion Generalized Hillyieldcriterion Hosford yieldcriterion The yield surface of a ductile...
The Hosford yieldcriterion is a function that is used to determine whether a material has undergone plastic yielding under the action of stress. The...
In probability theory, the Kelly criterion (or Kelly strategy or Kelly bet) is a formula for sizing a bet. The Kelly bet size is found by maximizing the...
contributed to the theory of plasticity by formulating the von Mises yieldcriterion, independently of Tytus Maksymilian Huber. He is often credited for...
propagate by successive cleavage of the grains. At these low temperatures, the yield strength is high, but the fracture strain and crack tip radius of curvature...
Popper stated that his proposal was not a criterion of "meaningfulness". Popper's demarcation criterion has been criticized both for excluding legitimate...
includes the information of estimator variance and bias. This is called MSE criterion. In regression analysis, plotting is a more natural way to view the overall...
{\displaystyle \ q} (or yield stress, σ y {\displaystyle \ \sigma _{y}} , in uniaxial tension according to the von Mises yielding criterion), or specific volume...
In mathematics, the ratio test is a test (or "criterion") for the convergence of a series ∑ n = 1 ∞ a n , {\displaystyle \sum _{n=1}^{\infty }a_{n},}...
as 'the criterion of Semitisms and Palestinian background'). John P. Meier (1991) defined a 'criterion of traces of Aramaic' and a 'criterion of Palestinian...
history, Hill returned the school to a need-blind admission policy, which ensures that the financial need of an applicant will not be a criterion considered...
any given pair can be determined from the ranking. Some elections may not yield a Condorcet winner because voter preferences may be cyclic—that is, it is...
exists, is known as Condorcet consistent or as satisfying the Condorcet criterion. Such systems are referred to as Condorcet methods. However, in elections...
pressure with the notable exceptions of the von Mises yieldcriterion and the Tresca yieldcriterion which are constant for all values of pressure. The term...
and equivalent definition of Carmichael numbers is given by Korselt's criterion. Theorem (A. Korselt 1899): A positive composite integer n {\displaystyle...
mathematical criterion listed here. Criterion A is "stronger" than B if satisfying A implies satisfying B. For instance, the Condorcet criterion is stronger...