Dual Algebras and Automatic Differentiation
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Abstract: This is a short introduction to dual algebras and their computational application for automatic differentiation.
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Abstract: This is a short introduction to dual algebras and their computational application for automatic differentiation.
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Abstract: In this article I will introduce the quantum time evolution operator drawing parallels with classical mechanics and continuous transformations.
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Abstract: The generalized Euler-Lagrange equation is derived in the context of classical mechanics and classical field theory through the principle of stationary action. The physical relevance of the formula is briefly discussed.
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Abstract: The generalized Euler-Lagrange equation is derived in the context of classical mechanics and classical field theory through the principle of stationary action. The physical relevance of the formula is briefly discussed.
Published:
Abstract: The generalized Euler-Lagrange equation is derived in the context of classical mechanics and classical field theory through the principle of stationary action. The physical relevance of the formula is briefly discussed.
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Abstract: Sequence operators on series expansions are inverted to obtain a differential equation from a recurrence relation. Common sequences are considered and their associated differential equations are calculated.
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Abstract: We present an operator formalism for the solution of ordinary differential equations using series expansion. These operators make it possible to easily map a differential equation into an algebraic equation.
Published:
Abstract: This is a short introduction to dual algebras and their computational application for automatic differentiation.
Published:
Abstract: Sequence operators on series expansions are inverted to obtain a differential equation from a recurrence relation. Common sequences are considered and their associated differential equations are calculated.
Published:
Abstract: We present an operator formalism for the solution of ordinary differential equations using series expansion. These operators make it possible to easily map a differential equation into an algebraic equation.
Published:
Abstract: In this article I will introduce the quantum time evolution operator drawing parallels with classical mechanics and continuous transformations.
Published:
Abstract: In this article I will introduce the quantum time evolution operator drawing parallels with classical mechanics and continuous transformations.